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THE REPRODUCTION
OF
Geographical Forms
I. SAND- AND CLAY-MODELLING WITH
RESPECT TO GEOGRAPHICAL
FORMS
II. MAP-DRAWING AND MAP-PROJECTION
BY
JACQUES W. REDWAY
»©;c
■
BOSTON
PUBLISHED BY D. C. HEATH & CO.
1897
OTHER WORKS BY THE SAME AUTHOR.
A SERIES OF GEOGRAPHIES, DESCRIPTIVE AND PHYSICAL.
A GEOGRAPHY OF PENNSYLVANIA.
A GEOGRAPHY OF MASSACHUSETTS, CONNECTICUT, AND RHODE
ISLAND.
STUDIES IN PHYSIOGRAPHY (in Press).
A TEACHER'S MANUAL OF GEOGRAPHY.
Copyright, 1890,
By JACQUES W. REDWAY.
jCff G^^Sl. & ^^
Typography by J. S. Cushing & Co., Boston, U.S.A.
#4
FOREWORDS.
Sand- and clay-modelling with respect to topographical forms
has become a legitimate and essential part of the course of instruc-
tion in the study of geography. But while much emphasis has
been placed on the arbitrary order to do, little has been said
on the subject of how and what to model, or how to interpret
the forms when made. The moulding-board is intended not for
the creation of forms, but for the reproduction of those already
found in nature. A working plan whereby the more common
types of geographical forms may be studied in the school-room,
is therefore presented.
I have also added a few pages on the practical construction of
maps and map-projections. To project and draw a ' scientific '
map is often considered an unpardonable educational heresy. As
a matter of fact, however, the ' scientific ' projection is vastly easier,
and requires less time than the bungling, meaningless diagram
which commonly poses under the name of an ' aid ' to map-
drawing. I have therefore taken the liberty to present a few prac-
tical projections which are not beyond the comprehension of
pupils in intermediate grades. There is also presented a solu-
tion of several of the more difficult projections which appear in
school atlases.
J. W. R.
M&22503
PART I.
HINTS TO TEACHERS.
I.
PRELIMINARY ORAL WORK.
It is hardly an exaggeration to say that the average child learns
more of the science of geography in his rambles out of doors,
before beginning the study in his school course, than he learns
from the text-book after his school work in that study begins.
The reason is that, in the one case he reads geography in nature,
in the other from the printed page. No matter how well and how
faithfully the teaching may be done, the disadvantages arising from
the use of words and sentences instead of things in nature, are too
great to be easily swept away. Within a few years the importance
of this fact has been so widely recognized by primary teachers
that, in a majority of schools, text- book work has been largely
abandoned in primary grades, and oral lessons, aided by the
moulding-board and the study of natural forms, have very
properly taken its place.
The outline of the following course in oral primary geography
was furnished at the author's request by Miss Mathilde E. Coffin,
of the Millersville, Pa., State Normal School, as a basis for the
preparation of this and the following chapter. It is intended as a
list of topics for oral work rather than a systematic course of study.
Much of the work discussed must necessarily be done out of doors.
Children who like to make ' mud pies ' will take equal delight in
modelling natural forms in sand or in clay. Time ordinarily spent
in aimless rambling will be gladly devoted to the collection and
study of natural objects when once there is an incentive for it. In
ungraded country schools the wise plan of keeping primary pupils
out of doors at all times when they are not engaged in recitation
6 HINTS TO TEACHERS
is an excellent one, and these are the golden hours which the child
may devote to the study of nature. The out-of-door work should
of course be supplemented by the necessary developmental exer-
cises, and lessons in oral expression in the school-room. Bear in
mind, also, that while recitation-hearing is an easy matter, teaching
children how to study and how to observe is a qualification de-
manding the highest capabilities of the teacher.
Form. — It is well, so far as possible, to acquire a knowledge
of form from natural objects. Fruit, crystals, forms of leaves,
shells, animals, and geometric forms will all furnish instructive
lessons. At first the work must be wholly imitative, but, as skill is
acquired, objects may be modelled from memory. With the
modelling of geometric forms comes the necessary instruction in
the use of descriptive terms, such as plane, curved, level, cubic,
spherical, square, circular, slanting, vertical, angle or corner, solid,
horizontal, etc. Inculcate with every step ideas of neatness in
work and faithfulness to the copy.
Size. — Teach by actual measurement all the units of linear
measure within the comprehension of the pupil. The latter should
be taught to estimate the inch, foot, and yard with the eye. It
will be found rather more difficult to estimate vertical than hori-
zontal distances, especially if the eyesight be at all astigmatic. It
is well to have a pupil learn the length of his ordinary step, so
that he can pace either a rod or one hundred feet with reasonable
accuracy. It is not a difficult matter to estimate a distance of one
mile, but the estimate would better be made by reckoning the
time required to walk it, rather than by the number of steps. The
average adult takes about two thousand steps to the mile. Three
and one half miles per hour is a fair, four miles a brisk, and five
miles per hour a very rapid gait. Time that is spent in estimating
and measuring the dimensions of objects is by no means wasted.
The ability to estimate measurements accurately has a practical
value to which every person in active business life will testify.
The estimation of angular distance is also an excellent drill. By
subdividing an arc which measures a right angle, into halves and
PRELIMINARY ORAL WORK 7
thirds, almost any angle can be estimated to within two or three
degrees.
Color. — The proper development of the color-sense is of no
little importance to the student of nature. It is well, for many
reasons, to make a special test of the color-sense of each pupil.
About ten per cent of young children are deficient in color- vision.
Of this proportion, some are deficient through physiological causes,
others from a lack of development of the color-sense, and still
others from ignorance of the names of colors. The two latter
causes are remediable, and can be easily removed if the teacher
will take a little extra pains with each individual pupil. Select
at first, only bright, pronounced colors, and teach their names.
Afterwards exercise every pupil in selecting graduated shades of
each color. A pupil who is physiologically deficient in the color-
sense will most likely fail in distinguishing the reds and greens.
Use only well-known and standard names for the various shades
and mixtures. Such names as 'ecru,' ' faded rose,' ' crushed
strawberry,' etc., are whims of fancy only, and change with the
fashions.
In teaching the primary colors it is best to use the classification
which science has shown to be the true one, namely — red, green,
and violet}
Viewing bits of colored silk through pieces of colored glass is
in many respects a useful exercise, and will be of material service
in the development of the color-sense.
But the colors and the color-names that the pupil must familiar-
ize himself most thoroughly with are those that he finds in nature.
There are the various shades of red, as damask, crimson, and
scarlet ; the greens, as pistachio, apple-, and pea-green ; the blues,
as indigo, sky-, ultramarine, and cobalt-blue. There are also the
various shades of lilac, pink, pearl, violet, salmon, fawn, sable or
1 The old scheme of red, yellow, and blue holds true in mixing a few colors,
but fails lamentably in the majority of cases. The trouble arises from the
fact that nearly all the red, blue, and yellow pigments are mixed or impure
colors.
8 HINTS TO TEACHERS
seal-brown, chestnut-brown, russet-brown, iron-gray, silver-white,
lemon-yellow, golden-yellow, orange-yellow, straw-yellow, tan, and
a host of others, all named from objects in nature, and all standard
types of color. In the light of geography these are more impor-
tant than the bright spectrum colors which are so largely used in
the arts. If there is any doubt that many of these colors are un-
familiar save in name, let the teacher direct half a dozen pupils to
select a fawn or a pistachio shade from a collection of colors.
Besides these there are the various * lustres/ such as vitreous, pearly,
metallic, etc., all used in the description of minerals.
It may be objected that lessons on color belong to the domain
of physics rather than to that of geography. This is possibly true,
but we must also bear in mind that color is just as much a feature
of nature as is the mountain, the plain, or the valley. Moreover,
it is also a means of cultivating taste, and this of itself is quite as
important a factor in child- culture as the study of geography.
Locality. — The sense of the knowledge of position and direc-
tion, which is practically the 'homing instinct' of animals, is
rarely developed to any great extent in mankind, and it therefore
becomes a necessary part of education. Develop a knowledge of
the terms right and left, and up and down. Impress the fact that
these are terms relating respectively to the human body and the
centre of the earth. There are various schemes for developing
an idea of the position of the cardinal points, but it is well to
begin at once with the direction of the north star. The direction
of the sun's rising and setting will be worth incidental mention,
but these should be discussed as varying and not fixed points.
The direction of the shadow at noon is an excellent point to use
for illustration, and the ingenious teacher can easily manufacture
a sun-dial which will show the time between eight o'clock a.m.
and four o'clock p.m. with reasonable accuracy. This will be
found an excellent device for encouraging pupils to observe the
apparent motions of the sun, both daily and yearly.
It is an excellent plan to have the points of the compass charted
on a clear part of the school-room floor, or perhaps on the ceiling.
PRELIMINARY ORAL WORK 9
In studying the various problems under this head, the use of
the map must necessarily be taken up. Begin with a map or dia-
gram of the school-room or the school-grounds, and extend the
area mapped until it includes every part of the district with which
the pupil is familiar. The location of the principal surroundings
should be represented approximately to a scale, and the conven-
tional terms and signs used in chartography should be explained
and used. It will be a matter of surprise to the teacher who tries
the experiment, what excellent results can be obtained in these
first attempts at map -drawing.
10 HINTS TO TEACHERS
II.
OUT-OF-DOOR LESSONS FOR PRIMARY AND INTER-
MEDIATE CLASSES.
The out-of-door lessons in geography, through which the child
should receive his first knowledge of the forces of nature, will of
necessity be confined mainly to the neighborhood in which he
lives. The method in which these are conducted must depend on
the judgment of the teacher as modified by surroundings. But
one direction can be given : namely, make the most of what
physiographical features the district affords. Supplement this by
the moulding- board, and by the use of whatever pictures, models,
etc., can be obtained.
Earth- Sculpture. — If the surface of the neighborhood is
uneven, hilly, or rugged, the probabilities are that the uneven-
ness has been produced by unequal weathering or else by the
direct action of water. In many instances a hill is formed
because its substance is harder than the rock surrounding it. So,
under the action of flowing water, ice, rain, and other weathering
agents, the surface is unequally worn into hills and valleys. Often
there are strata of rock which show the corrasive action of running
ivater; or perhaps soil, masses of broken rock, etc., have been
carried down the slope, and spread over the valley below. By
a careful search one may nearly always find marks of the forces
which have thus sculptured the earth. In walking along the slope
of the hill during a hard rain, one may observe the process of
earth-sculpture in actual operation. The drops of rain that fall
on the hill-side are clear as crystal. When they reach the bottom,
however, they are loaded with fine particles taken from the soiL
OUT-OF-DOOR LESSONS 11
Direct the pupils to observe this, and develop by skilful question-
ing the effect of the process when long continued.
Cover a piece of clay with sand on the moulding- table. Incline
the latter slightly, and pour water on it from a sprinkler. The
sand is washed away, leaving a miniature hill of clay, and the
process of hill-making is thus repeated on a small scale. In
a similar manner place a small piece of slate or a thin piece of
rock on the sand, and apply the water. The sand is washed out
under the edges a little way, but the slate protects the great mass
of it, while all around the sand is carried away. In this manner
one may show the formation of cliffs and certain types of table-
lands.
The study of the hill will lead to that of the mountain- range.
The explanation of this will be a more difficult task, because the
essential feature of a mountain-range lies in the fact that it is
a fold or wrinkle made by a shrinking of the earth. The follow-
ing expedient has been used by the author for want of a better
illustration. Take a piece of cloth-covered elastic band, ten or
fifteen inches in length, and stretch it moderately. Fasten several
strips of differently colored cloth to the elastic by means of mucil-
age, and when nearly dry, allow the elastic to slowly contract.
The pieces of colored cloth will wrinkle and crumple, producing
an effect which, though not a striking resemblance to mountain-
folding, is nevertheless a good illustration of the manner in which
plication occurred. In studying the mountain, begin with the
range, as directed in p. 25.
The examples of earth-sculpture which will appeal most strongly
to the child are those which are the work of running water. The
little rain-formed rill which trickles along the road cuts a deep rut
in one place, and spreads out in a broad channel in another.
Finally it joins another rill, or else pours its current into a pool
of water, which is a miniature lake or sea. When the rivulet
reaches its goal, it possibly divides into several streams, forming
a delta, and perhaps builds a bar opposite to its mouth.
In such a stream the pupil can see the operation of all the laws
12 HINTS TO TEACHERS
which govern the conduct of the Mississippi or the Colorado.
Develop by skilful questions, inductive and deductive, why the
rill cuts a deep canon in one place, and deposits silt in another ;
building its banks and bed higher than the surrounding land, and
then breaking through them. Show why it forms a delta, a bar,
or a spit, when it reaches its outlet. The effects of rain combined
with the corrasion of running water may also be pointed out.
Develop the fact that a rapidly flowing stream in a rainless region
will cut deep canons with almost vertical walls. If, on the con-
trary, the region is one of considerable rainfall, all the sharp,
angular features will be worn and rounded in harmonious forms.
This feature of erosion can be shown on the moulding-board, with
the aid of a sprinkler.
It is well, also, to observe the effect of vegetation. The dif-
ference between the erosion of a grass-covered and a denuded
slope is so marked that it will not fail to be observed and accounted
for if the pupil's attention is called to it. Pictures of the tnauvaise
terre or ' bad-land' formation, of the Grand Canon of the Colorado
River, and of the rounded valleys of Oregon, can be made the sub-
jects of impressive lessons. Develop the fact that vegetation is
not only protective to the land, but that it also retards the collection
of water in the channels which carry it off, thereby largely prevent-
ing ' freshets,' or floods.1
Throw a ridge of sand or mud across the channel of a rill, and
make a miniature lake. By and by the basin fills, and the water
runs over the lowest part of the rim. Now let the pupils observe
carefully what occurs. At the inlet of the lake the current of the
stream is checked, and the water begins to deposit silt, forming a
little bar at the mouth. The stream issuing from the lake is like-
wise at work : it is cutting away the rim of the basin and lowering
the level of the water. From these facts two good lessons may
1 In Arizona and Nevada I have more than once seen a flood gather in a
dry ' wash ' or creek-bed so quickly, after a heavy rain, that the water rolled
down the cafion almost like a solid wall. In two minutes a dry creek-bed
would become an impetuous torrent. — J. W. R.
OUT-OF-DOOR LESSONS 13
be deduced. First, that the stream flowing into a lake is always
silting the basin. Secondly, the stream which flows from a lake
is constantly cutting the rim of the basin lower, reducing its size,
and draining the water away. These are the laws which prompted
Gilbert to say, ' Rivers are the mortal enemies of lakes.'
When excursions can be made to the seacoast, impressive truths
may be learned from the action of the waves. The water-worn
cliffs show what can be accomplished by the continuous beating
of the waves upon hard rock. The sand, examined by a magnify-
ing glass, will show the effect of the never-ceasing surf. If one
may have the fortune to visit the coast of the South Atlantic States,
the long, narrow sand-spits formed by the combined action of
rivers and waves, — one of which pushes the silt sea-ward, and the
other land- ward, — may be made the subject of a most instructive
lesson.
The different outlines of coast must not be forgotten. These
will be found at the shore of almost any pond or stream of water.
Indeed, the various types of coast outline may be profitably
moulded at the shore if they do not occur there. Occasionally it
will be necessary to obtain pictures or models of the different
types, and reproduce the forms from these. Do not neglect to
show that peninsulas are, in most instances, ranges of mountains
extending into the sea, and that frequently a chain of islands, the
partly covered summits of the range, lie beyond the point of the
peninsula.
Do not neglect to instruct pupils in the application of technical
names that pertain to a natural feature, and do not extemporize
names where good ones already exist. The abuse of this privilege
has already led to much unnecessary confusion.
Slopes. — The slopes of a body of land are commonly formed
^by mountain systems, but in many instances a low and almost im-
perceptible ridge of land separates two basins or watersheds.
Steep or abrupt slopes can always be determined by the eye, and
the positive slopes of the district should be invariably studied
when the pupil is learning his first lessons in physical geography.
14 HINTS TO TEACHERS
The gentle slopes of land, however, can be estimated naturally in
only one way ; namely, by observing the direction of the water-
courses. So helpless is the eye in this respect that the most ex-
pert surveyors and topographers are often deceived. The slopes
and hydrographic basins of large areas of land may be conven-
iently studied from both map and moulding-board. In using the
map for this purpose, the boundaries of the various basins and
slopes are found by drawing a light pencil-line so as to separate
the sources of adjacent rivers and tributaries. In doing this the
pupil will often discover the untruth of one of the oldest traditions
of geography ; namely, that the crests of mountain-ranges corre-
spond with divides. A few moments' work with the pencil will
show that the exception is true oftener than the rule.
Soil. — A knowledge of the various kinds of soil is not only
a necessary part of the study of physical geography, but it has
a practical value in education that will not be overestimated. The
varieties of greatest practical use are sand, gravel, clay, and loam.
Develop by observation and questioning that sand and gravel are
results of running of water, and lead the pupil to discover how
rough fragments of rock are converted into rounded pebbles. Do
not make the mistake of teaching that the soil of deserts is com-
posed of sand ; for it is very rarely that sand is found in desert
regions. Pure sand is composed of the mineral silica, and is a
product of the seashore. The so-called sand of the desert may
be composed of almost any kind of dry, pulverized earth.
Develop the idea that the loams are nearly always disintegrated
or * rotten ' rock, finely pulverized, and mixed with decayed vege-
table matter. In many instances loam has been deposited by
rivers, but sometimes it has been found in situ. In the former
case it is called alluvial, in the latter, sedentary soil. The forma-
tion of loam will be somewhat difficult of explanation, but it is
not beyond the understanding of even the younger pupils. The
action of the angle-, or earth-worm, which is constantly mixing
and digesting rich, loamy soils within its alimentary canal, will
make the subject of an excellent lesson.
OUT-OF-DOOR LESSONS 15
In studying the properties of clay, it will be well to call attention
to its imperviousness to water, and its extreme hardness when
dry. Illustrate its commercial value in the manufacture of brick,
pottery, etc., and its special value in holding near the surface of
the earth much of the water that falls in the form of rain and snow.
Vegetation. — The first lessons on vegetable life should be of
a very practical kind. The study of the germination of seeds,
although hardly within the domain of geography, is an excellent
exercise because it is an incentive to habits of observation.
The flower-garden may be made almost as useful as the black-
board. There is no reason why the effects of heat and moisture
on soil should not be as closely studied in the country school
as in the higher school of learning. Almost every law which
underlies the geographical distribution of plants may be illus-
trated in the school district.
Besides the grains, the fruits, and the vegetables of commercial
value, it will be well to study the large class of plants ordinarily
classed as ' weeds.' Nearly all of these have more or less value
to mankind, or else they are positively baneful. A knowledge of
the latter is just as important as that of the former ; more espe-
cially is it necessary to learn how the seeds of the latter are dis-
tributed. The ' down ' of the Canada thistle and the dandelion,
and the winged seeds of the maple may be used to illustrate this.
It is a good plan to encourage pupils to collect and prepare a
herbarium for the use of the school, arranging and classifying the
plants of the neighborhood more with reference to their commer-
cial and economic value than with respect to their botanical places.
Specimens of all the timber growing in the district may be profit-
ably collected and preserved ; one side of the specimen being left
in its natural state, the other planed, and dressed with oil.
Animals. — The study of animal life is also an important factor
in the legitimate work of geography. In many instances the study
may be made observational. The habits and characteristics of
domestic animals will furnish a fund of useful information. It
will be well also to discriminate between wild animals that are
16 HINTS TO TEACHERS
useful and those that are hurtful to the husbandman. The study
of the birds and insects with which the pupil is familiar will
be one of great utility. If the pupils are encouraged to make
a classified list of all the forms of animal life found in the district,
the extent of the list will be a matter of surprise. When the list
is discussed in detail, it will probably lead to the discovery that,
in general, insects have the various forms of grub, chrysalis, and
articulate stage.
Much may be done by reading stories about wild animals ; in
every case supplementing the story by pictures. The latter may
be obtained in colors for a very small sum of money. Perhaps
more can be done in the way of developmental work by skilful
questioning than by observation and reading. The value of the
list of questions given in Frye's ' Child and Nature,' pp. 112 and
113, will be manifest to every live teacher.
Minerals. — There are few districts which do not abound in
mineral wealth. In the prairie states the list will be found to be
surprisingly large, while in the rolling and mountainous regions
the list may easily be extended beyond the limit of utility. The
most important are, of course, the minerals of economic use. It
will be well to have a collection of from fifty to one hundred of
these, which should be labelled and mounted either on a block or
a piece of stout card. It should comprise, among others, spec-
imens of the different varieties of coal arranged in a series ; sev-
eral varieties of iron ore, notably hematite, Iimonite, magnetite,
lodestone, and pyrites. Copper, zinc, nickel, lead, quicksilver,
and tin ores may be obtained without much difficulty, and in
every case the metal yielded by the ore should be exhibited.
Native specimens of rock-salt, sulphur, gypsum, and the ochres
may be obtained at a trifling expense. Equally important are
the building stones, such as granite (syenite and gneiss), brown
sandstone, white sandstone, marble, and other limestones, slate,
clay, etc. It is best to have the pupils themselves collect or
obtain the specimens. They should be labelled and mounted in
as attractive a manner as possible.
OUT-OF-DOOR LESSONS 17
The Atmosphere. — It is well to impress the fact that the
atmosphere is just as much a part of the earth as the water or
the solid rock. Do not allow the notion to be developed that all
space is filled with air, and do not convey the idea that the earth
' floats in air.' Emphasize the fact that the air is the outer part
of the earth, and moves with it in space.
That air has weight is always more or less difficult to demon-
strate to a class, not because it may not be shown by simple
experiments, but from the very common opinion that there is a
force generally known as l suction.' The boy's toy called the
' sucker,' a piece of thick, pliable leather, with a string fastened
to the centre, is instructive as a means of illustration. When the
sucker is saturated with water, and pushed firmly against a smooth
board or a polished boulder, it requires considerable force to pull
it away. The most convincing proof of the weight of air, how-
ever, may be found in the fact that a two-gallon glass jar, when
exhausted by means of the air-pump, loses about half an ounce
in weight.
It will be well, also, to develop the fact that the column of mer-
cury in the barometer exactly balances or weighs a column of air
of equal area. A serviceable barometer may be easily constructed
by inverting a tube about thirty-six inches long, filled with quick-
silver, so that the open end rests in a small vessel half full of the
same metal. Measure the height of the quicksilver in the tube,
and fasten upon it a paper scale of inches and tenths so as to
mark the height of the column. The instrument thus constructed
will show the changes in the pressure (weight) of the atmosphere
with reasonable accuracy.
Show by any of the well-known experiments that air when
heated expands in volume, therefore becoming, bulk for bulk,
lighter than cold air. The boy's whirligig held over a hot stove
at once acquires a rapid motion because of the ascending current
of warm air. Do not allow the impression to obtain that hot
air ' rises ' because of its lightness. What really occurs is, that
heavier cold air flows in and pushes it upwards.
18 HINTS TO TEACHERS
The mutual but adverse motions of cold and warm currents of
air may be best shown by the time-worn experiment of holding
two lighted candles, one at the top, the other at the bottom of a
door which opens into a heated room. In the study of the winds,
it is not easy to find an illustration of wider application than this.
It is an excellent plan to have pupils observe daily the motions of
the winds, especially the direction of the wind which precedes
storms and that with which the storm clears.
The moisture in the atmosphere may be shown in different
ways. The ' drying up ' of pools of water after a rain, the evapora-
tion of water in an open vessel exposed to the air, and the disap-
pearance of the dew after sunrise, may be made the subjects of
extremely entertaining lessons. That moisture is present in the
dry air of a room may be shown by filling a pitcher or other vessel
with iced water. As the atmospheric moisture is condensed on
the outside of the vessel, wipe the latter, and allow it to condense
again, as a further proof. Lead, step by step, to the fact that when
the temperature is lowered quickly, much of the vapor of water is
changed to its ordinary liquid form, and appears as dew, mist, fog,
cloud, or rain.
It will be an excellent plan to have pupils make daily observa-
tions on the winds, clouds, and general condition of the weather.
Such observations may have but little worth in themselves, but
they are direct means to a very valuable end. In many instances
it will be practicable to have the daily weather indications dis-
played in the school-room, and in any case, good results will
invariably come from keeping a daily weather-record.
Seasons. — Many instructive lessons may be drawn from the
study of the astronomical side of geography. With primary pupils
these will of necessity be fragmentary and incomplete. The pupil
will, however, become familiar with many facts which will render
the study of mathematical geography far easier in after years.
Have the pupils note the position of the sun at different times
in the day, and explain to them the phenomena of its apparent
motions. Note also the change in the position of the sun at ris-
OUT-OF-DOOR LESSONS 19
ing or at setting during each month in the year. Measure the
shadow of any fixed object at noon, during the successive months
in the year. Some of these phenomena will be difficult of explana-
tion to younger pupils, and it is perhaps better to attempt none —
certainly none that will confuse. It will be practical, however, to
connect the low noon sun and its northerly position at rising and
setting, with the short days, long nights, and cold weather of win-
ter. This, at least, can be understood by the most immature
pupils.
The foregoing chapter, as is designated by its title, is intended
to suggest a certain line of out-of-door work. Some of the ideas
suggested are doubtless beyond the comprehension of very young
pupils ; others may be profitably repeated in a more systematic
order when the pupil has reached advanced work in geography.
The success of out-of-door work will depend mainly on the judg-
ment of the teacher in selecting the material for the illustration of
these object lessons. It will depend largely, also, upon the skill
in interpreting natural phenomena, for any teacher who imagines
that such work can be done without careful preparation will fail
ignominiously in accomplishing tangible results. The teacher
must not only acquaint himself with the study of physiography in
general, but also with that of the district in detail in order to im-
part lessons that carry conviction.
During the period in which the out-of-door work is carried on,
the more systematic in-door lessons should not be neglected. If
a text-book is used, supplement and illustrate it with the moulding-
board, with pictures, and with instructive stories from authentic
books of travel.1 If the mental pictures can be imprinted in the
pupil's mind, almost any means will justify the end.
With the consideration of the foregoing topics, which may em-
brace a period of two years of time, there is a certain amount of
1 Do not forget that there is much worthless literature under the name of
books of travel. The books and sketches of inexperienced tourists who make
flying trips through foreign places may be entertaining, but they are generally
incorrect with regard to geographical information.
20 HINTS TO TEACHERS
other observational work which also is included in geography;
namely, the study of people, their social life, government, re-
ligion, etc. Much of this must be done with the aid of pictures
and books of travel. Still another feature that will constantly
come to the foreground is the geography of commerce. In spite
of sentiment, the commercial idea is the one upon which all
study and mental development centres. The opinion as to ' what
ought to be ' will not change the cold facts of the case, and the
study of the commercial side will always be the practical objective
point of geography. We may as well open our eyes to the fact
that all human energy is bent to the purpose of procuring food
and shelter. The net -work of railways, the fleets of steamers and
sailing vessels, the coal and iron mines, the thousands of factories,
the entire energy of the husbandman, have but one end in view —
to allay hunger. All the mechanical energies of man are devoted
indirectly to the production and transportation of food. Is it
singular then that there are a few hard-headed, unsentimental peo-
ple who will persist in putting the study of geography on a com-
mercial basis ? A journey through a grocery store will make a sub-
ject for many excellent object lessons, and a history of the travels
of a battered coin will make a subject for many a written exercise.
A well-known teacher in Boston requires one or more pupils to
board nearly every ship arriving at that city from a foreign port, in
order to learn the character of its cargo. It is safe to affirm
that the pupils of that school know something about the geography
of commerce that cannot be learned from text-books.
In teaching younger pupils, it will be an excellent plan to dis-
play commercial products in their various stages of manufacture.
For instance, the cotton industry may be illustrated by cotton in
the boll, in the raw or unginned state, in the spun fibre, and in
various textile fabrics. A similar plan may be adopted with other
textile goods, with the common ores which yield useful metals, and
with articles of ordinary food. The various grades of sugar, tea,
coffee, etc., are well worth the acquaintance of the pupil ; and the
usual processes through which grain passes in its journey from
OUT-OF-DOOR LESSONS 21
the field to the table will be sources of instructive object lessons.
If the teacher has any doubts about the value of the commercial
importance of geography,1 follow the commercial history of an
illustrated school book from the time the raw materials employed
in its manufacture are produced, until the finished volume is placed
in the hands of the pupil. In the printer and binder's establish-
ment alone, nearly one hundred distinct processes are necessary
to produce an electrotyped book.
1 ' In considering geography we deal with a subject particularly interesting
because of its relations to man. It is the first of the elementary studies which
teaches the child that he is part of a community, that the community is part of
a nation, that the nation is part of the human race. He now learns how he
differs from his European brothers in character, politics, society; and that
these differences result from differences in the climate, the industries, and the
geography of their respective countries. He begins to realize his dependence
upon his fellow-beings. The coffee he drinks is prepared from beans gathered
by savages in South America or in the East Indies. His tea is steeped from
leaves dried by the Japanese or the Chinamen. Perhaps he sweetens his South
Carolina rice with Cuban sugar. He eats mackerel caught in the fiords of
Norway. Saginaw salt combines with India pepper to give relish to his Ken-
tuckian sweet potato. Mediterranean sardines are served on slices of Califor-
nian lemons. His dime coined from silver mined in Nevada buys dates
plucked from palms in Africa. Possibly he corks his ink bottle with a bit of
bark from a tree growing in Spain. Thus every article of commerce testifies
to the labor of his fellow-beings far and near. Distant countries are brought
nearer by handling these commodities. But this dependence upon remote
parts is due to climate; and climate depends upon altitude, latitude, forests,
winds, rains, oceanic currents. These subjects are not treated upon in descrip-
tive geography; hence to give satisfactory explanations, the teacher must
understand physical geography, which in turn must be backed by natural
philosophy. Indeed, a separation of descriptive and physical geography is
impossible.' — Miss T. E. Reul, in Wisconsin Journal of Education.
22 HINTS TO TEACHERS
III.
PICTURES AND MODELS WITH RESPECT TO
GEOGRAPHICAL FORMS.
The diversified topography of the earth's surface may be
summed up in the conventional term relief, and the study of the
various types of relief, together with the laws which underlie it,
practically comprise about all that is properly included in physical
geography. Gravitation has given the earth, as well as similar
heavenly bodies, a slightly modified spherical shape, but the relief
features of the earth's surface are due to two agents which are
continuous in operation and which are mutually opposed the one
to the other. These agents are secular cooling and solar heat.
In parting with its heat, the earth follows the same law that
governs other bodies, contracting in bulk as the loss of heat goes
on. Moreover, as the loss of heat is relatively greater in the
heated interior than in what is, for convenience, called the crust,
the contraction of the interior mass is greater than that of the
exterior crust, so that the latter, in fitting itself about a constantly
shrinking mass, must of necessity become wrinkled and cockled.
The operation of this law has raised the immense masses of land
we call continents above the level of the sea, wrinkled and
crumpled the surface into the long, corrugated folds we call
mountain- ranges, and cockled level surfaces into plateaus or
depressed them into basins. In short, all the great disturbances
of level that are even now going on, are due mainly to the secu-
lar cooling of the earth.
The effect of solar heat upon the earth's surface is just the oppo-
site. Lifting the water from the ocean as an invisible vapor, it
pours it upon the land \ and in the form of rain, frost, ice, or run-
PICTURES AND MODELS 23
ning streams, the water is constantly at work tearing away the
mountains and levelling off the various inequalities of surface.
By the action of this agent mountain-ranges are sculptured into
ridges, and their flanks are re-formed into the piedmont lands
about their bases ; while the finer detritus is carried to the sea and
cast along the shore in the form of spits, or spread over the val-
leys, forming wide alluvial plains. Canons are cut in high pla-
teaus, or, perhaps through mountain-ranges, and lake-basins are
filled and levelled. So constant and persistent is the operation of
this force that almost every passing shower leaves its visible mark
on the earth's surface.
Now these changes do not come about hap-hazard, nor is each
a law and type unto itself. On the contrary, just as we discern
types in botany or in natural history, — just as the operation of cer-
tain laws will produce typical forms and structures, — so also the
operations of the forces which most concern physical geography
may be reduced to types, and these types are reasonably constant
in form and in structure. Moreover, if we recognize physical geog-
raphy as a science, we must recognize types of earth-sculpture,
just as in the study of natural history we recognize types of
organic structure.
The study of relief may be accomplished in various ways. The
teacher may convey the concepts orally to the pupil, and if the
former has been so fortunate as to have seen something of the
world, and has the capability to vividly impart instruction, much
excellent work may be accomplished. It is perhaps natural,
under such circumstances, to resort to the use of pictures. Even
with advanced classes the live teacher will find her pictorial scrap-
book about as useful as the text-book. The various illustrated
papers, especially such as Frank Leslie's, Harper's, the Scientific
American, and the illustrated magazines, always contain a host of
excellent illustrations. Generally, those pictures are the most
valuable which present a broad stretch of country with consider-
able diversity of area. No other view of a landscape is so beau-
tiful or so instructive as that which one obtains from a great
24 HINTS TO TEACHERS
elevation. One who has not beheld this vast abyss from some
overhanging buttress of Point Sublime, cannot well comprehend
the profound depths of the Grand Canon of the Colorado j nor is
it possible to appreciate the immensity of the Rocky Mountains
without viewing the gigantic folds and sculptured peaks from some
point like Bellevue, Sierra Blanca, or Gray's Peak.
And the reason is obvious. It is not merely a matter of height
nor of depth, nor of the vast proportions of any one object. It is
the far-reaching panoramic view which enables one not only to
behold an individual feature, but also to measure and contrast it
with all other features, that so delights the mind. It goes without
saying that a well-chosen series of pictures is better than a volume
on improved methods of teaching. Perhaps it would not be going
too far to say that a skilful teacher of physical geography could
do better work with a carefully selected series of pictures and
models without the text, than by using a manual which was all
text and no pictures.
In the use of pictures, success will largely depend on the judg-
ment of the teacher in making the selections. The essential
point is to take such as shall represent types : for use in political
geography, these may be supplemented by a miscellaneous list
which shall include modes of transportation, bird's-eye views of
cities, and the various industries, and studies in -social life. With
respect to the classified types in physical geography, the following
list will be found useful.1
Coast-forms. — The high, rock-bound shore, with deep inden-
tations : The coasts of Maine, Scotland, Alaska, etc., are examples.
The cliff-girt coast with a low, sandy beach : The cliffs at New-
port are examples.
The low, sandy shore partly enclosed by long, wave-formed
islands, or sand-spits : The Jersey coast is an example.
1 Many excellent photographs representing the various types of earth-
sculpture may be procured through Messrs. D. C. Heath & Co. A large num-
ber of finely colored views may be procured from the Prang Educational
Company.
PICTURES AND MODELS 25
Capes, peninsulas, isthmuses, and islands may also be conven-
iently taught in considering the various forms of coast-outline.
Each may be represented in any of the three forms. It is well,
by all means, to obtain one or more pictures showing the effects
of wave-beating. Almost any illustration of the scenery along the
coasts of Norway, Scotland, or even the New England coast, will
furnish an example. The pictured rocks of Lake Superior are
admirable illustrations.
The various forms of littoral waters may also be studied in con-
nection with coast-forms. These are as well studied from pictures
as from the moulding-board.
Inequalities of Surface by Erosion. — A bird's-eye view of
low hills rounded off by general erosion, the result of copious
rains : The foot-hills and piedmont lands of the Alleghany Moun-
tains are good examples.
A bird's-eye view showing hills and crags with sharp, angular
outlines, the result of an arid climate : This type is finely exem-
plified in the ridges, peaks, and spires of the plateau region —
especially in that part of the canon of the Colorado River known
as the ' Land of the Standing Rocks.'
Cliff-formation, showing how a layer of hard volcanic rock
resting upon the top of softer stratified rock prevents erosion at
the upper surface, while the edges, exposed by the corrasion of
running streams, are eroded and sapped by rain : The mesas or
table-lands of the Plains of the Columbia are examples.
Mauvaise-terre, or ? bad-land ' formation, showing the effects
of running water on light sedentary soils unprotected by vege-
tation : The Bad Lands of Dakota and Nebraska are fine
examples.
A canon with terraced, or with nearly vertical walls made by a
stream flowing in an arid region : The canon of the Colorado
River and those of its tributaries are examples.
A wide valley with rounded sides and outlines. The result of a
stream flowing through a region supplied with abundant rain, there
is much general erosion and little stream-corrasion : This type of
26 HINTS TO TEACHERS
erosion may be observed in almost every stream that flows through
undulating land.
A region formerly traversed by a glacier. The surface is worn
into roches moutonnees, or ' sheep-backs/ and is strewn with rounded
boulders. Long and narrow lakes showing lineal or radial arrange-
ment are numerous : Almost any part of the New England States
or northern New Jersey will furnish a good illustration.
Inequalities from Secular Contraction, Vulcanology, etc.
A bird's-eye view of a mountain-range. (See note, p. 33.)
A bird's-eye view of a mountain-system, showing a group of
folds constituting a highland.
A peak — not as an isolated butte, but as the part of the
summit of a range, higher than the adjacent crest : Pictures of
Rocky Mountain Scenery are usually prolific with respect to
typical peaks.
A volcanic mountain as a whole : Illustrations (from photo-
graphs) of Mounts Shasta, Tacoma, or Hood will be admirable
for this purpose.
A volcano in eruption : Instantaneous photographic views of
Vesuvius in eruption may be procured. Engravings of the same
may be found in several text-books.
The crater of a volcano : Photographs of the crater of Vesuvius,
and also that of Kilauea, show the essential features of each volcano
very vividly. A telescopic photograph of Copernicus, a lunar vol-
cano, will greatly add to the value of the foregoing.
A lava flood : Photographs of this character may be easily pro-
cured ; they are useful in showing the texture of different kinds of
lava.
A series of pictures of Vesuvius between successive eruptions
will be found highly instructive. Such a series may be found in
Volcanoes and Earthquakes (Mungo Ponton, — T. Nelson 6° Co.,
London) .
A geyser in eruption : Photographs of Old Faithful, Castle Gey-
ser and others in Yellowstone Park may be readily obtained.
The travertine and sinter deposits of mineral springs : The ter-
PICTURES AND MODELS 27
raced basins of Mammoth Hot Springs, Yellowstone Park, are fine
examples.
Cracks and crevices formed by earthquakes : Instructive photo-
graphs of the Charleston earthquake may be obtained from the
U. S. Geological Survey.
Meteorology, etc. — Typical forms of clouds : Many dealers
in photographic views keep good specimens.
Forms of snowflakes : Most of the physical geographies have
suitable illustrations.
Glaciers : Photographs of various European and American gla-
ciers are readily attainable. If possible, select one that shows the
origin and termination of the glacier. It is especially desirable to
have at least one view showing the end of a glacier as the source
of a river.
A glacier terminating at the sea, showing the formation of ice-
bergs by ' calving ' : Photographs of Muir Glacier, Alaska, show
this on a small scale. It is well illustrated by profile views
in several of the manuals of geology — notably in Prestwich's
Geology.
A cyclone with l funnel-cloud ' : One or two good illustrations
may be found in the publications of the U. S. Weather Bureau.
Waterspouts : Illustrations may be found in most physical geog-
raphies.
Drainage. — A river in its upper course: Any picture of a
mountain torrent will answer.
A river in its middle course : Views along any large river will
answer, the subject being selected, as far as possible, to show that
it neither corrades its banks nor deposits silt at the ordinary stage
of water.
A river along its lower course : The illustration should, if pos-
sible, be a bird's-eye view showing the sinuous windings of the
river ; the water not being able to carry its silt must deposit it,
and thereafter flow around it.
A cataract : A photograph of Niagara, of Yosemite, or of the
Yellowstone Falls will be an admirable illustration.
28 HINTS TO TEACHERS
A variety of lake views : It would be well to have a map of the
lake district of New York, showing the salient features of glacial
lakes.
The foregoing indicate a few only of the various types of nat-
ural scenery. The miscellaneous collection should contain a goodly
assortment of commercial and industrial views, such as factories,
mines of every character, methods of transportation, plants of
economic and industrial use, — in short, take any picture that will
instruct and reject none that has a teaching value.
It is well to impress the fact that such a picture scrap-book
cannot be compiled in a day.1 On the contrary, it may require
years to select illustrations of all the types described in this chap-
ter. The teacher who compiles a book of this character must be
content with many poor and faulty illustrations at first. These
may be replaced from time to time with more suitable and better
ones as the opportunity to procure them occurs. It is well, more-
over, to have several pictures to illustrate the same type. In a
single view the salient feature may be overshadowed, or it may
not be prominently developed. But when the same feature is
common to a number of illustrations it can hardly escape notice.
Do not reject a picture because it is poorly printed or because it
is coarsely engraved. Types of earth-sculpture, and not art-speci-
mens, are the illustrations required, and a coarse, poorly- engraved
picture may often have a teaching quality that will not be found
in a beautifully engraved artist-proof. On the contrary, do not
fail to reject a view that is untruthful or one that needlessly ex-
aggerates nature. The illustrations of geographical scenery in
such publications as Harper's, the Century, and Scribner's maga-
zines are generally true to nature. In many instances they are
photogravures, and often they are what is technically known
as i bleaches,' — that is, a pen- or brush-drawing over a partly
1 I think it required about two and a half years to gather the illustrations for
my series of geographies. In all, I collected several hundred views. Some
of these were selected in Europe; some came from Asia; and many were
procured in travelling about the Western Cordilleras. — J. W. R,
PICTURES AND MODELS 29
bleached photograph. In either case the resulting picture will
be fairly correct both in treatment and in texture.
Photographs, when they can be obtained, are undoubtedly
the best guides, because of their fidelity to even the minutest
details. They are somewhat expensive, it is true ; but, on the
other hand, they are usually not so difficult to obtain as the less
expensive wood-cuts and photogravures. It is best to purchase
photographs unmounted.
It is a good plan to mount all pictures on stout card-board,
taking care to have the pieces uniform in size. In mounting,
first trim the picture to the proper size j lay it for a few moments,
face up, in a basin of water ; when fully expanded, remove the
superfluous water with blotting-paper; apply a good quality of
mucilage, and set evenly on the card-board. If not mounted on
card-board, photographs should be attached by their corners to
the leaves of the scrap-book ; under no circumstances should
they be kept rolled. Card-board mountings are in every way
preferable to scrap-books, owing to the facility with which they
can be handled and exhibited. Should it be necessary to remove
the picture from the card, soak the latter — it is not necessary to
wet the picture — for some hours until it is thoroughly softened :
the picture may then be removed without injury.
It must be kept in mind that merely exhibiting a picture is not
teaching geography. To be of material use, the picture must be
used as an object lesson, and the specific features of the type which
it illustrates should be deduced by close and careful questioning.
The picture has some points of superiority over the model, but
it also is not without demerits. It is lifelike and attractive ; it
appeals strongly to the imagination \ and each particular scene or
landscape has a harmony and an environment, giving what artists
call effect, and adding no little to its teaching value. On the con-
trary, the lack of the third 'dimension is a defect which neither
color nor effect can overcome. Even the stereoscopic view gives
an impression which is tantalizing because of its unrealness ; and,
moreover, the subject can be viewed from but one point.
30 HINTS TO TEACHERS
The Moulding-Board. — In order to supplement these
defects, the moulding-board has within a few years become a
very important auxiliary to the art of the school- room. This
piece of apparatus is essentially a shallow box four feet by three,
and about two inches in depth. It is most conveniently attached
to a table thirty inches high, in such a manner that it may be
inclined at any angle. A zinc-lined box or drawer for holding the
sand may be fastened to the under side of the table. Moulders'
sand, such as is used in iron-foundries, is the best for the purpose,
but any clean sand will answer. Moulders' sand is naturally more
or less cohesive : white sand needs to be dampened. Under all
circumstances the sand should be closely covered when not in use,
and should be sifted as occasion demands.
The moulding-board is primarily for the use of the teacher. It
bears the same relation to the study of solid forms that the black-
board does to the study of outlines and surfaces. In order to be
effective, the work must be skilfully and quickly done. Moreover,
it requires practice and careful preparation. No instructor can
hope to reproduce a form on the moulding-board without a
thorough knowledge of the structure and features which the par-
ticular form typifies j nor can one expect to reproduce the form
without practice. Without a knowledge of the subject to be
studied, any attempt by the teacher at illustration will not only
be barren of good results, but will be positively baneful to the
pupils. It is very evident that to be of positive advantage the les-
son of the teacher must be reproduced by the child. A thorough
comprehension of relief can be acquired only by the study of
relief-forms, guided by the sense of touch j at the same time one
is never too old or too wise to dispense wholly with the third
dimension. Concerning the value of the solid form, as exempli-
fied in models of the continents, perhaps the best-known living
scientist1 writes to the author, 'Your relief-maps have given me
a clearer conception of the relation of mountains to the continents
1 Professor John Tyndall.
PICTURES AND MODELS 31
whereon they lie than I had previously possessed.' If this be the
experience of a scholar trained for years to the keenest use of
the perceptive faculties, it certainly deserves emphasis in training
the faculties of the child.
With very young pupils, the use of the moulding-board' requires
the best judgment and the utmost care on the part of the teacher.
To attempt a systematic course such as is suggested in the fore-
going list of types would not only be unwise, but could have no
other result than failure. Only the simpler forms of district relief
can be safely undertaken — the hills, valleys, ravines, and water-
courses. Furthermore, these should not be taught so much for
the things themselves, as to prepare the pupil for what is to be stud-
ied in the future. The pond is a type of the large lake, or even of
the ocean. The brook is the miniature river. Any long ridge of
land will furnish an object lesson from which to study the moun-
tain-range. As is suggested in the preceding chapter, the study
of the form as it occurs in nature should be followed by its repro-
duction by the pupil. For this purpose the desk moulding-board
introduced by Professor Frye some years ago will be found of
excellent service. It is essentially a shallow pan made of tin or
thin sheet iron about twenty by fourteen inches in area, with a
rim about half an inch in height.
It is well to bear in mind that the moulding-board is intended
for the repetition of forms that actually occur in nature, and not
for the creation of those which may have a fleeting existence in
the imagination. Moreover, so far as primary work is concerned
it is easy to carry the work of moulding beyond the limit of use-
fulness. At first the pupil repeats a form found in nature, not so
much for the sake of the form itself, but mainly to acquire closer
habits of observation, and subsequently to train the imagination to
a conception of the forms which the great majority of pupils will
see in pictures only. When this is accomplished, the habitual use
of the moulding-board is no longer necessary ; it should thereafter
be called into use only when the pupil is unable to form a true
conception without it. Just as there will be occasional demands
32 HINTS TO TEACHERS
for the use of the black-board, for the map, or for any piece of
school apparatus, so also the moulding- board will now and then be
required. It may be casually added that neither expanse of mould-
ing-board, quantity of sand, nor skill in manipulation will cover
deficiency in knowledge of the subject taught, or carelessness in
preparation of the daily task. The moulding-board is only a tool,
and excellence in the tool does not necessarily imply competency
on the part of the artisan.
The first lessons that are likely to be taken up in connection
with the moulding-board are elevations of land. The origin of the
hill either by accumulation or by denudation, as explained on pp.
10 and ii, may be understood by even the youngest pupils. An
explanation of the reason for the rugged crag on the one hand and
the rounded form of the ordinary hill on the other may be dis-
cussed, — with older pupils it should not under any circumstances
be omitted. In many instances it will be necessary to resort to
the picture in order to gain a conception of the form to be
moulded. In such cases the picture and the moulded form
should be exhibited and studied together. Indeed, the picture-
studies suggested in the foregoing pages will be extremely ser-
viceable as studies for the moulding-board, to illustrate types in
physical geography. In the study of the hill, do not fail to see
that the terms top, or summit, base, side, slope, etc., are fully
understood.
The consideration of the mountain-range will probably follow
that of the hill. Do not permit the pupil to form the concep-
tion that the mountain is nothing more than a high hill. Pli-
cation or ' wrinkling' is the essential feature of mountains, and
the range, not the peak, is the unit of structure. Isolated peaks
are of rare occurrence, and in most instances they consist of the
material heaped about a volcanic vent. Begin with the range,
and teach it as a fold or wrinkle in the earth's crust, — not as a
mass of earth or rock heaped up. Do not permit the conception
that a mountain-range consists of a number of peaks ranged in
a line. In all cases avoid the exaggeration of orographic fea-
PICTURES AND MODELS 33
tures. Do not construct a range relatively fifty miles high, with
slopes of sixty or seventy degrees. The slope rarely exceeds
thirty degrees : it is seldom more than twelve. In the study of
the range discuss the terms crest or summit, peak, base, canon,
pass, ridge, etc. Show that ridges are formed by the wearing
away of strata lengthwise along the range, and that passes, canons;
and water-gaps result from erosion and corrasion across the range.
Develop, also, the fact that the peaks of a range are the higher
parts of the crest, and that they are usually formed by the unequal
erosion of the latter.
The discussion of the range leads to the study of the system.
The system comprises all the wrinkles or earth-folds which be-
long to the same series. Sometimes the folds are very nearly
parallel, and are remarkable for their regularity. In general,
however, there is *nuch irregularity, and the ranges with their
spurs extend in almost every direction.1 Recollect that an indi-
vidual range rarely extends the whole length of the system, and
that the spurs and cross-ranges are often as marked as the prin-
cipal ranges themselves. With the moulding of the mountain-
system there will necessarily arise the consideration of longi-
tudinal valleys. Longitudinal valleys, of which the Cumberland,
Shenandoah, Willamette, and San Joaquin-Sacramento valleys are
examples, are usually of wonderful fertility, and, because of their
productiveness, densely populated. The soil which fills them has
been worn by rains and snows from the adjacent mountain-slopes,
and the valley has been levelled off by the action of running
water. The mountains themselves, however, because of their
rugged surfaces and extremes of climate, are remarkable mainly
for their infertility and their sparseness of population.
1 I know of no picture that is a good illustration either of the range or of the
system. Perhaps the best are those found in the relief-maps of Warren's New
Physical, and in Swinton's, Butler's, and Monteith's descriptive geographies.
The hachured maps drawn by Mr. Russell Hinman for the Eclectic Geographies
will be found excellent guides in the moulding and modelling of mountain-
systems. These maps are contoured, and are remarkably accurate in the dis-
34 HINTS TO TEACHERS
The transverse valley, water-gap, or canon, as it is variously
called, will probably arrest the pupil's attention at some period
or other in his work at the moulding-board. Why a river rising
on one side of a mountain-system should traverse half a dozen
ranges of mountains and pour its flood into the sea on the opposite
side, will be apt to puzzle even the most thoughtful pupil. The
explanation in such cases is that the river is older than the moun-
tains, having always had the right of way there ; and when the up-
lift of the system took place, the stream carved its channel through
the mountain-mass in just the same manner that the saw cuts its
way through the log that is moved against it.1 The Rocky, Sierra
Nevada, Appalachian, Andes, and Himalaya Mountains are all
pierced by streams which have thus cut their masses in twain.
It may be somewhat difficult for pupils to grasp this conception
at first, especially when the ridiculous notion that range-summits
are continental divides has been systematically inculcated. In
the construction of such problems on the moulding-board, the
difficulties may be considerably lessened by forming the general
slope first, and then moulding the range or system on the slope.
This method of procedure must not be considered a subterfuge
to enable one to creep out of a difficulty : it is in a similar way
that nature has solved the problem.
In the consideration of volcanoes, it may be well to impress
the fact that the volcano is not necessarily a mountain. It may
be, and it usually is, in or near a mountain-range, or it may be
on a plain. Even when it occurs in a mountain-range, it is not per
se a part of the range, although built upon it. The volcanic peak
is commonly called a 'cinder-cone,' and it is composed of the sub-
position of topographical features. Mr. Hinman's system of hachures is an
admirable one in giving character to mountains. — J. W. R.
1 In a few instances, it is possible that the head-waters of a stream rising
in an abrupt slope may have carved a channel backwards until it has reached
the opposite slope, even tapping and diverting the tributaries of rivers flowing
in an opposite direction. This, however, could hardly have been the case
with such streams as the Susquehanna and Green Rivers.
PICTURES AND MODELS 35
stances which, thrown out of the volcano, are piled around it. It
will be an excellent plan to mould the volcanic peak with its crater
and monticules on an enlarged scale. For this purpose Vesuvius
perhaps is the best type. Several text-books of geography have
illustrations of the Vesuvian eruption of 1872, reproduced from
instantaneous photographs. These will be serviceable in showing
the proper angular slope for the model j but the cuts on p. 88 of
Le Conte's Geology will be found the best for illustrating the gen-
eral structure of the peak, as these show the broken-down crater
ramparts of former eruptions. A photograph of the crater of this
volcano ! will be an excellent guide in showing the texture of the
crater, with its lava-cones, etc. In studying the volcano, see that
the pupils understand the proper application of such terms as
' crater,' * cinder-cone,' 'lava,' 'lava-cone,' 'rampart,' 'flow of lava,'
' eruption,' ' extinct,' ' active,' etc. Impress the fact that the real
volcano is the channel opening from the reservoir of heated or
molten matter, and that the mountain itself, which is commonly
called the volcano, is composed of the materials ejected. In dis-
cussing volcanoes keen judgment must be used in order to avoid
going beyond the comprehension of younger pupils. With young
pupils the pardonable expedient of igniting at the crater of the
moulded form an ounce or two of strontium or Bengal fire may
possibly make the lesson more impressive.
Other hints concerning the nature of volcanoes will be found in
Part II. of this book. After discussing their nature and structure,
the distribution of volcanoes should be closely studied. When
an extensive region, as a grand division, is to be moulded, it will
be difficult to make any distinction between volcanic and other
peaks.
In the study of coast- forms, land and water are necessarily to
be studied together. Unfortunately, the elevations of coast de-
scribed on p. 24 cannot be well reproduced in sand : it requires
a finely executed clay model to show the details properly. The
1 From • The Moon.' Nasmyth and Carpenter.
36 HINTS TO TEACHERS
low, sandy coast with its bordering wave-formed islands may be
readily shown, and between picture, moulding-board, and imagina-
tion, the other vertical forms may be studied.
Horizontal forms of coast may be readily reproduced on the
moulding-board. If there are no natural forms to study, the pic-
ture scrap-book may be called upon to furnish models. As has
been suggested on a previous page, the horizontal forms of coast
may be represented in either of the three vertical types. Pupils
who have been taught the conventionalities of maps may pursue
the investigation of coast-forms still further. An inspection of
any good map will show that a peninsula is frequently a range of
mountains extending a considerable distance out into the sea, as,
for instance, Italy, Aliaska, and Malacca. The same is true of the
isthmus. Still better, the pupils may be led to observe that such
chains of islands as occur in the Caribbean Sea, and along the
eastern coast of Asia, consist of the higher summits of partly sub-
merged mountain-ranges. The various forms of littoral waters
will scarcely fail to obtrude themselves upon the pupil's notice.
With younger pupils it will not be wise to attempt the finely drawn
distinctions between gulf and bay, or inland sea and lake. A
small fragment of glass, or, better still, a mirror, makes a very tak-
ing device whereby to illustrate inland lakes. The surface of the
mirror represents the surface of the water, and the sand may be
modelled about it to represent the shore. In case it is desirable
to show an enlarged representation of a lake, the bottom of the
latter may be first modelled to the proper form and depth. A
sheet of glass placed upon the model will represent the surface of
the water, and the sand may then be worked on the upper surface
of the glass so as to represent the shore-line and the unfilled part
of the basin.
The moulding-board is hardly suitable for the reproduction of
the various types of inequalities of land produced by erosion and
corrasion. Such forms are imperfectly reproduced at best by
clay models, except when the latter are on an inconveniently large
scale ; even then the finer details of photography are necessary to
PICTURES AND MODELS 37
study them closely. The moulding-board is to the finished model
or relief what the off-hand sketch-map is to the finely engraved
reproduction. In general, a relief surface that can be made in
three minutes is the problem for the teacher to solve, and this can
be done more readily by sand on the moulding- table than in any
other way. Working with clay is too slow for the needs of class
illustration, and the clay once dry must go through the tedious
process of ' tempering ' before it can again be used. The same
objections will apply to putty, papier- mach^, and similar sub-
stances.
For use in class demonstration, general form and not finish of
detail is required, and the substance used must be clean, quickly
manipulated, and always ready. The sand used by iron- moulders
possesses all these qualities, and for easy, rapid work, nothing has
yet been found that surpasses it.
For pupils' work, circumstances and occasions must govern the
plans of the teacher. Usually the latter must compromise between
what she wants and what she can get ; and instances are not few
where a teacher has purchased at personal expense, out of a starv-
ation salary, materials that an over-conscientious board of direc-
tors has refused to provide. Where they can be procured, the
modelling-pans recommended by Professor Frye will be of good
service. Wet papier-mache is another excellent substance, and
when it is available, the pupils' slates may be used as base-boards.
Moreover, the reliefs when dry are stout and cohesive enough to
bear rough handling. The pulp may be procured in almost any
quantity from the paper mills. A fair substitute may be made by
soaking old newspaper for several days and then ' shredding ' until
it is reduced to pulp.
The teacher of the country district school has undoubtedly the
best facilities for sand-modelling, and, as the younger pupils are
usually permitted to be out of doors when not at recitation, there
are abundant opportunities for work of this character. They will
need but little encouragement to reproduce a miniature relief of
all the little world that environs them. Hills, valleys, streams, and
38 HINTS TO TEACHERS
forests will take shape ; and roads, farms, and miniature fences
will give rise to ideas from which the first ideas of political geog-
raphy may be deduced.
Clay-Modelling. — Modelling in clay1 or other similar plastic
substance has become a recognized factor and part of modern
school-work. The average individual possesses hands as well as
brain. Moreover, it is conceded that while the brain controls and
directs, its integral existence and development depend in no small
degree on the skill of the hands. Singularly, however, there are
many educators who are aghast at the idea of the co-education
of the hands and the brain. It is not the proper place, within
these pages, to discuss the merits and demerits of manual train-
ing. The stereotyped objection that the public schools are not
the place for teaching trades, is an objection easily disposed of.
In the school, the training of the hands is not for the purpose of
fitting an individual to be a servant of another, but to make him
the master of himself. The object of clay-modelling in school-
work is not to make sculptors, but to train pupils to habits of close
observation in form and details of structure ; and inasmuch as
these are intimately connected with the science of geography, a
limited amount of training in work of this character will amply
repay for the time devoted to it.
For all ordinary purposes clay is perhaps preferable for model-
ling to any other material. Usually, the clay purchased for this
purpose is ready for use after a slight moistening. The ' temper-
ing ' of the clay, upon which its quality largely depends, is pro-
duced by permitting it to remain covered with water for a day
or more. By this treatment, dry clay which has not been baked
will become cohesive. Modelled articles that are not to be pre-
served may be thus tempered, and the clay used a second time.
In tempering clay do not stir or mix it — on the contrary, it should
1 An extensive series of topographical models* classifying the various types
of earth-sculpture, will be shortly published by the Prang Educational Co.
These models and relief-maps will consist of a reproduction of such forms,
the knowledge of which largely makes the science of physical geography.
PICTURES AND MODELS 39
be ' wedged ' or made as compact as possible. After tempering,
pour off the water and allow the clay to dry somewhat on the sur-
face. It may then be kneaded, and wrapped in wet cloths until
used. It should not be too soft to retain its form when worked
into shape, nor should it be so hard that it cannot be readily
manipulated. A small ball held between the thumb and ringer
should yield readily without adhering to the hand.
All natural clays, however, are sticky, and it is best and cheap-
est in the long run to purchase prepared modelling clay, a mixture
of tempered clay and sand. This preparation is sufficiently cohe-
sive without being sticky, and it is not liable to crack and seam.
Putty is sometimes used in modelling. It is easy to manipulate
and does not harden so quickly as clay. It has the disadvantage
of being oily, and does not take so fine a finish as clay. It will
frequently be available where clay cannot be procured, and for
small relief-maps and models is an excellent substitute.
Papier-mache has already been mentioned. Its use is limited
mainly to relief-maps. It does not take a sharp impression, nor
can it be worked to a smooth, hard surface. Where an impres-
sion is to be taken from a metallic mould, a mixture of papier-
mach£ and plaster of Paris makes an excellent cast. The latter
does not need to be very thick, and it is much lighter and stronger
than a plaster of Paris cast, while its outlines are equally sharp.
The ingenious teacher who has decided to undertake model-
ling for supplementary school-work will not fail to find some
material for the purpose. In carrying out a course, much judg-
ment must be used as to the when, the what, and the how much.
The modelling of geographical forms cannot take the place of the
study of geography; it can only supplement it. Sand-models
and relief-maps will not cover up any deficiency in knowledge
on the part of the teacher. None but a well-trained teacher
whose knowledge of the science of geography extends beyond
the text-book can do thorough work, and one who does not
possess this qualification will find modelling a hindrance rather
than a help.
40 , HINTS TO TEACHERS
About the only tools required are a thick board 12X16 inches
and a \ shaper.' The latter may be a very narrow druggist's
spatula, or a strip of flat steel T\ of an inch wide, with one end
square and the other diagonally cut. An old case-knife may be
ground into the required shape.
With younger pupils it is well to spend some little time in
preliminary work before attempting difficult geographical forms.
Modelling fruit, leaves, the various forms the child sees in na-
ture, and lastly crystals and geometric forms, are exercises that
will of necessity suggest themselves.1 At first, the model should
be made with the natural form as a guide ; after a little experience
it maybe repeated from memory. Recollect, also, that the object
should be moulded into general shape by the hands, the shaper
being used only in finishing those details which cannot be readily
accomplished with the fingers. Keep in mind that a knowledge of
form, dimension, and proportion must be acquired through the
senses of touch and sight. Cutting a lump of clay by the use of a
straight-edge and an inch rule is not modelling : it has no more
disciplinary effect or developmental force than ingesting plaster of
Paris into a hollow mould. It would be well to blindfold the
modeller occasionally and thus test the development of the sense
of touch unaided by that of sight. Bear in mind, also, that close
observation, and correct judgment of form, constitute the end
sought in work of this kind. The pupil who studies modelling
and sculpture as an art will find the course of instruction in a
technical school more advantageous for his purpose.
In the practical manipulation of the clay it is well to bear in
mind that modelling is a somewhat broader art than sculpture.
In many instances it will be necessary to model a study in sepa-
rate parts and then arrange the latter in their proper positions.
In topographical modelling this is especially essential. Topo-
graphical features cannot be easily sculptured from a flat surface
1 Thompson's Manual Training, Part II., D. C. Heath &° Co., will be
found an excellent guide to the modelling of geometrical forms, decorative
work, etc.
PICTURES AND MODELS 41
of clay as a base. It is true that this is mainly nature's method of
making topography, but it is equally true that the modeller will
economize time by adopting the plan of building up the details,
putting bits of clay here and there and working them to the proper
form with the finger and the shaper.
In modelling forms in clay the same directions should be observed
as have been mentioned in speaking of sand-modelling. The clay
model, however, requires more skill and finer finish of details.
It will be necessary to work directly from the copy, and it will
often be more convenient to work from a picture, photograph, or
reduced model, than from nature. Usually work of this kind can-
not be done in school hours, nor at the school-building. More-
over, although a most excellent discipline to the pupil, it is not
essential to his progress in the study of geography. The comple-
tion of an artistically finished model may require all the spare
time for several days, but if the time can be spared, the end will
justify the means. Accuracy to nature is, of course, the first aim ;
artistic effect, the second. The former is a testimonial to the
knowledge and energy of the pupil ; the latter will be a source of
delight to all who may see the finished work. But whether or not
time can be spent in clay-modelling by the pupils, it may be safely
asserted that the teacher should be able to do work of this kind
skilfully and understandingly. No other study in the curriculum
of common school-work is being so completely revolutionized and
modernized as that of geography ; and a few years hence ability
to model geographical forms will be to the teacher, not an ac-
complishment, but an essential — a question, not of may, but of
must. Throughout the whole course in modelling, faithfulness to
nature is the one thing to be kept in view. A model untrue in
this respect, no matter how artistic it may be, is worthless as a
means of mental discipline. Reproduction, and not creation,
should be the watchword. The model is the expression of form
as it occurs in nature, and when the form and the reasons there-
for are indelibly photographed upon the mind, the model and
the moulding-board may be put aside.
42 HINTS TO TEACHERS
Relief -Maps. — The relief-map is the outgrowth of the mould-
ing-board. It is designed to illustrate what cannot possibly be
shown on a flat surface. It naturally precedes the printed map
for the same reason that we must study the physical geography of
a region before we can properly comprehend its political, social,
and industrial features. But the relief-map and the political map
are the complements of each other j each displays features that
cannot be well shown on the other. The black outlines of the
political map give no conception of sandy shores or wave-beaten
cliffs ; the clumsy hachure-lines, especially those appearing on
cheaply prepared maps, are equally inefficient in depicting topog-
raphy. On the other hand, the relief-map, whether a stereo-
graphic model or a photogravure thereof, is useless in showing
political divisions or the grouping of population, and unless it is a
large and highly finished model it shows drainage very imperfectly.
At the best, it shows little else besides topography ; but even with
respect to climate, population, life, and natural resources, it may
be far more valuable than the flat political maps. So far as it is
useful, there is no other device that can be substituted for it ; but
the success in this branch of science of a teacher whose resources
in geography consist only of a method and a moulding-board will
not be brilliant.
When the pupil has become acquainted with the more common
forms of relief, it will be well to undertake the construction, in
sand, of a relief-map of the district, or of some other area whose
topography is well known. Usually this will be a rather more
difficult task than it seems at first. It is not so easy a matter to
group a number of different forms, even though roughly moulded,
as it is to reproduce a single one minutely. In order to arrange
the topographical features in their relative positions, it will be well
first to construct a rough outline map of the district, indicating
the positions of the various features. Then fix a number of pins,
pegs, or similar devices as guide-marks to indicate the relative
altitudes. The surface features may then be moulded to corre-
spond to these.
PICTURES AND MODELS 43
The quickly prepared relief, moulded in sand, should always be
used by the teacher to illustrate the general topography and
physiography of a country, region, or grand division. It should
always be moulded in the presence of the class, and each feature
discussed, pro and con, as it is formed. There should be no
attempt to show minute details — nothing but general and essen-
tial features : everything beyond this leads to confusion rather
than to clearness.
But the finished relief-map is quite another thing. It should
depict topography as truthfully as knowledge of the region will
permit. The making of such a model, though not an essential
part of the pupil's course, is nevertheless an accomplishment that
the teacher should be master of, and the use to which it is put
must depend on his judgment and common sense.
The making of such a map is a work requiring much labor and
time ; and if a finely finished, attractive model is desired, the
modeller must possess not only good judgment and knowledge
but skill and artistic taste as well. .To such of the more advanced
pupils as show aptitude in this work, the discipline and skill
acquired in the construction of a relief-map will more than repay
the expenditure of time and labor. The following directions will
enable one to plan the work; the successful execution will de-
pend on the skill, perseverance, and artistic taste of the modeller.
Let us suppose a relief-map of the United States is to be con-
structed. Draw an outline map of the United States on very thick
paper, of such dimensions that the width east and west shall be
about three feet. Enter with pencil line the position and trend of
all the principal highlands, mountain- ranges, and divides. Pro-
cure from the United States Geological Survey a copy of Gannet's
Dictionary of Altitudes, and pencil upon the map at equal or
nearly equal distances the altitudes of the various localities.
These bench marks may be about an inch and a half or two
inches apart in the open plain regions, but will be necessarily
closer in the highland regions. The map thus prepared is used
as a memorandum for the relief work.
44 HINTS TO TEACHERS
The base of the map should be made of i^-inch boards
matched closely and securely cleated on the under side to pre-
vent warping. Lay the map on the surface of a large vessel of
water, or else sponge the under side of the paper until the latter
is thoroughly saturated, having previously cut away every part of
the paper outside of the outline. When the paper is saturated,
remove it from the water, place it face downwards on a large
sheet of blotting-paper, and give it a coating of mucilage or book-
binder's paste. The surface of the board should be dampened,
or, what is better, should receive a coating of paste on that part
which will be covered by the map. Next, transfer the map to
the board. Be careful that no air-bubbles are left between the
paper and the board, and use the utmost care that no part of the
paper is pulled out of shape. After transferring, place the board
face down on a sheet of paper and allow it to dry for a day
or two.
The next part of the process is to fix guiding pins for the alti-
tudes. On a relief-map of the horizontal scale adopted, 20,000
feet to the inch will be found convenient for the vertical scale.
Procure a paper of small pins, and set a pin vertically at each
bench mark, the length of the pin above the surface being meas-
ured so as to represent the proportionate height of the surface.
The clay, wet just enough to be cohesive, may then be worked
upon the map, building it up to the level of the tops of the pins.
Run narrow cylindrical rolls of clay along the mountain-ranges.
Force them into shape with the fingers first, and work the ridges
into shape with the shaper. Make the crests notched and irreg-
ular, and score the sides so as to break the regularity of the
slopes. The weather-worn summits of the highlands are difficult
of reproduction, but the views of Western scenery published by
the various trans-continental railway companies will be of great
service in suggesting the topographical features.
When the modelling is at last completed and the model is dry,
there remain only the coloring and the finishing details of chart-
ing the watercourses, etc. If the color of the clay is not a pure
PICTURES AND MODELS 45
white, it may be modified by carefully dusting finely ground
plaster of Paris over the surface, any excess of material being
blown off with a pair of small hand-bellows. The rivers may be
most conveniently put in with a fine brush, using cobalt or ultra-
marine blue ground in oil. That part of the board which repre-
sents the sea-level should be sized, dusted with plaster of Paris,
and, when dry, also colored blue.
Whenever contour maps can be procured, the work of model-
ling is made much easier. The contour lines being lines of equal
elevation, it greatly reduces the work of establishing bench marks,
and does away with the use of pins to mark altitudes. Sheets of
pasteboard of uniform thickness are procured, each thickness
of the board representing a certain number of feet. If the con-
tours are 200 feet apart, the thickness of the pasteboard will repre-
sent a relief of 200 feet. The contour lines are first traced on
thin paper, and afterwards transferred to the pasteboard. The
latter is cut along the line, and, beginning with the lowest altitude,
the contours are fastened to the base-board. The successive ele-
vations are built on this step by step, as the contour lines follow
one another, until the work is finished. The clay may now be
moulded over this form, and finished as before. This method
was followed by Mr. Cosmos Mindeleff, who made a series of
models for the author a few years since. It is by far the most
satisfactory way whenever a contour map can be procured.
'The filling-in process,' says Mr. Mindeleff, 'is the most im-
portant one in relief-map making j for it is here that the model-
ler must show his knowledge of, and feeling for, topographical
forms. Some models seem to have been constructed with the
idea that when the contours have been placed, the work of the
modeller is practically done. This is a great mistake. The
card-board contours are only a means of control, occupying some-
what the same relation to the relief-map that a core or base of
bricks or a frame of wood does to other constructions, as, for
example, an architectural ornament or a bust. It is sometimes
necessary to cut away the contour card ; for, as has already been
46 HINTS TO TEACHERS
explained, a map is more or less generalized, and a contour is fre-
quently carried across a ravine instead of following it up as it
would do if the map were on a larger scale. Such generalizing is
of course perfectly proper in a map, but, with the same scale, we
must expect more detail in a model. The modeller must have
judgment enough and skill enough to read between the lines and
to undo the generalizing of the topographer and draughtsman,
thus supplying the material omitted from the map. This can be
done without materially affecting the accuracy of the model, con-
sidered even as a copy of the contoured map.' l
In every case the vertical scale should be exaggerated as little
as possible. If the area to be modelled is a country, or even a
state, there need be no exaggeration whatever, or at the most
it need not exceed 3:1. In the case of a grand division, the
vertical scale may be raised as high as 10: 1. Mr. Mindeleff's
model of Europe, one of the finest works of the kind extant, has
a scale of only 5:1. In a relief-map of a large area some
vertical exaggeration is absolutely necessary, but to raise the scale
to -i 00 : 1 or 500 : i, as is often done in profiles and cheap relief-
maps, is a gross abuse, for which there is no cause whatever.
The relief-map is intended as a reproduction, not a caricature, of
nature, and it is questionable whether one is justified in attempting
to teach truth by the agency of a grave error.
1 From a lecture delivered before the National Geographical Society, Wash-
ington, D.C.
MAP-DRAWING AND MAP-MAKING 47
IV.
MAP-DRAWING AND MAP-MAKING.
Whenever we wish to learn the position of a place of which we
know but little, the first impulse is always to consult the map.
This we do, because in long years of time we have learned the
true use of the map. The map not only tells us the position of
the particular locality on the earth's surface, but also its position
with relation to other places. In early life we seek the picture of
the thing if we cannot have access to the thing itself ; in many in-
stances the picture is often more graphic than the thing — because
it enables the mind to view a wider horizon. Thus, even in mature
years, one can get a better idea of a city or a large area of country
by consulting a ' bird's-eye view ' than by travelling over the extent
of country, or by wandering through the streets of the city.
Now, in the study of geography it is necessary to construct views
which shall enable the eye to take in as much as half, or even the
whole, of the earth's surface at once. This representation is the
map. The map, of necessity, is not a picture. We cannot delin-
eate as pictures any except very small areas, and have them true
to nature. So we are forced to represent nature by the use of
very arbitrary lines from which we are supposed to reproduce the
object itself in the mind's eye. In other words, we make what
we call a map to reproduce a mental image of the thing itself.
The most vigorous imagination, however, cannot see any resem-
blance between a round dot and a cluster of houses, or between
the hachure lines of the map and a range of mountains. There
may be a slight resemblance in the sinuous black line which serves
to recall the actual river, but there is nothing in the shore-line of
the maps to recall the low sandy beach or the wave-beaten cliffs
48 HINTS TO TEACHERS
that frown upon the sea. There is even less in the gaudily painted
colors of the map to suggest the beautiful landscapes of nature.
But the map, notwithstanding its innate ugliness and convention-
alities, has a practical side to it which makes it intrinsically more
valuable than all the picture-lessons we can possibly derive from
nature, for without it foreign commerce would be almost an impos-
sibility, and domestic commerce would be greatly crippled.
It goes without saying, that before the child sees or studies the
map he should become acquainted with the things which the con-
ventional lines on the map represent. The various forms and
elevations of the earth's surface, such as mountains, islands, capes,
bays, peninsulas, straits, etc., should be studied first from nature.
Where this is not possible the moulding-board and the picture
furnish the next best means. Simultaneously with these, the con-
ventional outline may be drawn on the slate or on the blackboard,
and thus the pupil takes his first lessons in map-drawing.
In the class-room, perhaps the most practical map-drawing is
the hasty off-hand sketching of an area which the needs of the
recitation demand. In such sketch-map only a general accuracy
of outline is required, and not more than two or three minutes
should be permitted in making it. If the pupil has been habitually
trained to such work in the oral lessons on the moulding-board,
there will be no difficulty in doing it quickly and with reasonable
accuracy. The ability to make a rough sketch-map of a given
area consistently and rapidly implies a great deal. It shows not
only that the pupil has the outline photographed in his mind, but
it is also proof positive of a kind of knowledge that is not readily
forgotten. Beyond the disciplinary value of such work the out-
line itself is more valuable in its way than the wall- or the atlas-
map. A few lines drawn in their proper places will show the
continental divides which separate the great slopes and basins.
On such a map these can be seen more clearly than on the atlas-
map because there is no confusion of details to distract the atten-
tion from the particular features. There is a score of similar uses
to which such a sketch-map may be put, any one of which will
MAP-DRAWING AND MAP-MAKING 49
enable both teacher and pupil to do graphically and vividly what
must otherwise be imperfectly done. One who has tried this ex-
pedient will not fail to acknowledge how much time and explana-
tory talk may be thereby saved.
The production of finished and artistically drawn maps is an art
— and a science as well — which the majority of teachers look on
with disfavor. It certainly is not an essential element in the edu-
cation of the average pupil, and if such work is done, it would be
better if done mainly out of school hours. But whatever may be
the value of a knowledge of chartography to the pupil, it is a neces-
sity to the teacher. The clumsy, unskilful devices commonly rec-
ommended as 'aids to map-drawing,' although they often reflect
credit upon the ingenuity of the teacher, are not testimonials to
his training in the study of geography.
Most likely the majority of teachers use a conventional system
of construction-lines upon which the outlines of the land-area are
to be drawn. This system sometimes, though rarely, serves a
good purpose, and where a map is to be hastily sketched it is
occasionally convenient. As a supplement to a correct system
of map-drawing it is frequently desirable. But if the pupil's
knowledge of the science of map-drawing is to stop at this point,
it would be better that the knowledge were never acquired ; it is
always misleading, and usually erroneous. The object and essence
of the map is that every geographical point should be in its proper
place. With the ordinary construction- diagram no attempt what-
ever is made to show anything but an outline similar to the
map copied. Neither is there anything to show the latitude and
longitude of places, or even the general position of the area
charted. For a map of a township, or even a county, such an
outline might be useful ; but for a large area, it is unscientific, in-
complete, and erroneous.
Now and then some one discovers that a construction-diagram
which answers admirably for, we will say, a map of North America
as it appears in one book, will not answer at all for the same map
as it is given in another. When such an awkward discovery is
50 HINTS TO TEACHERS
made, one of the maps (usually the one to which the construction-
diagram will not fit) is declared incorrect.
That construction-lines and diagrams are a necessity in map-
drawing is certainly true, but why not use the ones originally
designed for the purpose, and without which a map is useless ? In
other words, why not use the parallels and meridians themselves ?
They were devised for this purpose and, except in mariners' charts,
have little or no other use. The professional map-draughtsman
uses them and does not ever think of using any other device.
The advantage of using parallels and meridians is twofold. It is
fully as easy to lay them off on paper as it is to draw a meaning-
less construction- diagram. The map when thus drawn is con-
sistent, and expresses not only position, but also direction and
relative distance. Without the parallels and meridians, it shows
nothing but outline ; and if the outline were one of a country or
a region not well known, it might be difficult to decide how the
map was to be read, or in which direction were the cardinal
points.
The chief difficulty is that both teacher and pupil are afraid to
attempt drawing the parallels and meridians, for fear that they will
not have the same appearance as those of the map copied. This
fear may be dismissed with the assertion that they need not be
similar. They may be drawn as straight lines if one choqses to
draw them thus, and if they are properly numbered the map may
be charted upon them. The result will be a consistent map,
although in shape it may not absolutely resemble the one copied.
Pupils and teachers have been taught, or have imbibed the idea,
that a map must of necessity be an exact outline of the continent,
grand division, or state. This is a matter which must be unlearned.
A map cannot, of necessity, be an exact outline, because it is im-
possible to represent the outline of a convex or rounded surface
on a flat surface. The map-draughtsman must therefore be con-
tent with making the map as nearly correct as circumstances will
permit, and must lay out his parallels and meridians accordingly.
The platting of these is called 'projecting .the map.' There are
MAP-DRAWING AND MAP-MAKING
51
ISO0
L
many projections used in map-drawing, but there are four which
are very commonly used, — the Mercator, the conic, the polyconic,
and the globular projection.
The Mercator Projec-
tion. — This projection re-
ceives its name from Kauf-
mann,1 a geographer who
first employed it in the
charting of sailing-routes.
In the Mercator projec-
tion the earth is considered
a cylinder, on the convex
surface of which the out-
lines of the continents are
drawn. If, now, we con-
ceive the surface to be
unrolled and laid flat, the
/ result is a map projected
±,:_
>
on the Mercator plan.
But the north pole of the
earth, which in reality is a
point, becomes, in the Mer-
cator projection, a circle
equal in size to the circle
of the equator. The land
masses situated in high lati-
tudes appear greatly dis-
torted, therefore, in width.
In order to obviate this, the
distance between parallels
constantly increases as the
latitude increases, as will
be seen in the accompanying diagram. These distances are
not taken hap-hazard, to suit convenience, but are determined
1 Kaufmann is the German word for merchant, which in Latin is mercator. 0 g
Method by which Mercator Charts are projected
M-
y^Jtr itc f*t*~ <£^*»^ f^Tf^-
^
52 HINTS TO TEACHERS
for a purpose, and their positions calculated with mathematical
precision.
Technically speaking, the distance of each parallel from the
equator is equal to the tangent of the angle of latitude. Let us
imagine that UXYZ is a hollow cylinder of paper surrounding
a terrestrial globe PQR. From O, the centre of the globe, lay
off angles of io°, 200, 300, etc., and draw lines until they meet the
side of the paper cylinder. Now the points where these lines
meet the surface of the cylinder will be the distances of the
respective parallels from the equator. When we unroll the paper
cylinder, it will be about 3^- times the length of AB, the diameter
of the globe. For all practical purposes the maps projected on
the Mercator plan are limited to 8o° N. and 6o° S. latitude, as the
land and all the navigable waters of the earth are situated between
these parallels.
The chief objection to this plan of projecting a map is, that
where large areas are to be shown, the size of those portions situ-
ated in high latitudes is greatly exaggerated. This objection, how-
ever, fails when small areas are to be charted, and for state and
county maps it is an excellent projection. It is the only conven-
ient projection, too, in which the entire surface of the earth can
be shown on a single, continuous map.
Its greatest advantage lies in its use as a sailing-chart ; for it is in
maps of this projection only that alt directions are measured in
straight lines, and that parallel lines have the same direction in all
parts of the map. Without the Mercator chart, deep-sea sailing
would be out of the question, for any navigator who was not a good
mathematician could not calculate the complex curves which on
ordinary maps would represent straight lines on the surface of the
earth. The ' commercial ' maps of the world, which now form a
part of most common-school geographies, are excellent specimens
of the Mercator projection, although not always correctly pro-
jected.
It need not be inferred from this that the chartographer does
not know how to project them. The reason is, that a correctly
MAP-DRAWING AND MAP-MAKING 53
projected map, to include all the surface between 8o° N. to 8o° S.,
if a two-page map is required, would be about three feet in length
from top to bottom. So it is customary to reduce the distance
between parallels by any convenient but arbitrary scale, the latter
depending upon the size of the page.
The Conic Projection. — The conic projection represents a
part of the earth as drawn on the surface of a cone. Imagine a
cone (or a part of the cone) covered with paper, on which the
parallels are drawn parallel to the base of the cone, and the merid-
ians from the apex to the base. If now the paper be removed
and spread flat, we shall have a tolerably correct idea of the conic
projection. This form of projection and the various modifications
of it are much used in charting those grand divisions and areas
which lie in the northern hemisphere. Obviously, the distortion
will be the greatest towards polar and equatorial latitudes. If we
bend the paper into a cone, and place the latter over a globe
which shall just go inside of it, we can see what parts of the map
are distorted or incorrect in outline. Along the circle where the
sphere and cone touch, there will be no distortion. In polar lati-
tudes there will be a north and south exaggeration, and in equa-
torial latitudes, an east and west enlargement. Where the area to
be charted extends well into equatorial latitudes, the meridians in-
stead of being straight lines are commonly curved inwardly so as to
prevent too much lateral distortion. Maps of Asia and Europe are
usually thus conventionalized. In fact, two of the best chartog-
raphers in the United States use ship-curves for projecting the
meridians in the maps of these grand divisions. In using the
ship-curve instead of the arc of a circle, their judgment is good.
In a projection thus made, the northern regions, where there are
but few details to be charted, are slightly contracted, while the
southern parts, in which the details are numerous, are slightly
enlarged. The parallels of a conic projection are always concen-
tric arcs with the pole as a centre. The conic projection is one
of the most convenient, and in many respects the best, for pupils'
work. It is easily made, and requires no apparatus more costly
#
5-4
HINTS TO TEACHERS
than a pair of dividers with a long leg. The meridians may be
straight lines, and the parallels, arcs drawn from the apex of the
I
A Conic Projection.
cone as a centre. The outline on p. 48 conveys a practical idea
of this form of projection.
Bonne's Projection. — This projection, which, in a modified
form, is known also as Flamsteed1si is perhaps more extensively
used in the maps of school geographies than any other. In many
respects it is a difficult projection to construct, although the diffi-
culty may be practically obviated by purchasing the meridian
rules already made, or by using a flexible ruler.1 In Bonne's pro-
jection the parallels are equidistant arcs drawn from the pole
(or apex of the cone) as a centre ; in Flamsteed's, they are
straight lines. In the latter, each hemisphere (northern and south-
1 Both the meridians and the flexible ruler may be purchased of Williams &
Brown, or of the Ball-Bennett Co., Philadelphia.
MAP-DRAWING AND MAP-MAKING 55
ern) is assumed to have a shape much like that of a boy's top,
conical at the apex, but rounding off to a nearly hemispherical
shape at the base. In Bonne's modification, however, the cone
is slightly concave at the apex, resembling in form the dome of
a pagoda. A better example may be found in the illustrated
ace of spades which accompanies each pack of playing-cards, the
curves of this figure being constructed in one or the other of these
projections. The chief merit about these projections is that true
proportion of areas is preserved. The disadvantages are distor-
tion at the margin, and the very oblique angle at which the paral-
lels and meridians intersect in high latitudes. In nearly all the
school geographies, the maps of the grand divisions, and often
the state sections, are drawn on the Bonne or the Flamsteed pro-
jection. Europe, Asia, North America and South America are
generally constructed on the former ; Africa and Australia on the
latter.
Globular Projections. — The maps of the hemispheres which
are found at the beginning of most geographies are drawn on
what is commonly called a globular projection. One of these was
planned by De la Hire about two hundred years ago, and a better
one for the purpose was never made. Let us imagine a glass
globe on which the parallels and meridians have been drawn, to
be cut in two through the poles, and a sheet of half- transparent
paper fastened over the cut edges. In the accompanying cut
ABCDE is the hemisphere, and ADCE the sheet of paper. The
observer stands directly in front of the flat side at a distance a
little greater than the length of the axis of the sphere, the eye
being at O, on the level of the equator. Now as one looks at the
parallels1 with the eye in the position shown at O, they seem to
be curved lines ; and if we could have each one drawn as it seems
to fall on the flat surface ADCE, we should have a set of parallels
as seen in the next figure. The meridians are usually drawn at
equal distances apart. The expert chartographer does not need
1 The meridians are omitted in order to avoid crowding the figure with a
confusion of lines.
56
HINTS TO TEACHERS
Method by which Globular Maps are projected.
to take this trouble to locate the position or to find the curvature
of the parallels ; he can calculate either much more easily.
In a projection of this kind, the distortion is chiefly at the mar-
gin of the map. On a globe the parallels must of course be equi-
distant, but in our globular projection they are much farther apart
at the margins than along the central meridian. Not unfrequently
the question arises, ' Why is there not a scale of miles on maps of
the hemispheres ? ' Such a question is readily answered when we
recognize the fact of this marginal exaggeration. A scale of miles
which would be accurate on the central meridian would be very
inaccurate at the margin. To represent a fairly correct scale each
unit must be 1.57 as great for the marginal as for the central
meridian.
It is evident that directions north and south, or east and
west, are measured respectively along the meridians and par-
allels, no matter what may be the direction of these lines on
the map. A straight line on the map must, therefore, in nearly
every case be a curved line on the globe ; it becomes not only
a great inconvenience, but practically an impossibility for any but
an expert mathematician to use such maps for sailing-charts. But
MAP-DRAWING AND MAP-MAKING
57
inasmuch as a map projected for use as a sailing-chart has such
exaggerated outlines as to be almost worthless for everything ex-
cept rhumb lines and accuracy of direction, we must gracefully
submit to the fact that two kinds of maps are necessary, — one for
landsmen, and the other for seamen. We must also yield to the
fact that while both are consistent, neither one is accurate, and
that a perfect map cannot be made until we have a flat earth.
One of the difficulties in trying to fit a round earth to a flat
map is frequently encountered in the United States Land Office.
EQUATOR
90 SO
The Completed Projection.
According to law a township must be bounded east and west by
meridians, and must be six miles square. Now this is simply an
impossibility. If, for instance, we survey two township lines north-
ward from the 40th to the 41st parallel, we shall find that they
have approached each other and are about two -thirds of a mile
nearer at their northern than at their southern limits. In the sys-
tem of land surveys adopted by the United States, standard par-
allels are surveyed every few miles apart, and these are taken as
58
HINTS TO TEACHERS
bases for new township surveys. The parallel taken for a new
base is called a ' correction line.'
Various other globular projections are occasionally employed,
most of which, like the one just described, are perspective draw-
ings rather than true projections, inasmuch as they depend mainly
upon the position of the observer's eye.
A Polar Projection.
The Orthographic Projection 1 is one in which the eye is supposed
to be at an infinite distance from the hemisphere, and the plane
1 Any true perspective view of a globe, the eye being situated at a distance,
will be an orthographic projection.
MAP-DRAWING AND MAP-MAKING 59
of the projection perpendicular to the line of vision. The meri-
dians, which are at normal distance apart at the centre of the
map, are gradually crowded together at the edges. The parallels
are straight lines, but unequally distant. Briefly stated, this is the
form the lines of a globe would naturally take if the observer
were to stand, say, five hundred feet from the globe, with the eye
in the plane of the equator extended. The maps of the hemi-
spheres in Warren's Geographies are drawn on this projection.
An illustration in which the projection is made on the plane of
a meridian is here given. (See also p. 76.)
The Stereographic Projection differs from the foregoing mainly in
the position of the eye of the observer, which, instead of being at
an infinite distance, is on the surface of the sphere, at the pole of
a great circle. The maps of the hemispheres in the author's
Complete and Elementary Geographies are on this projection. It
makes a handsome map, but, though a very easy one to lay off, it
is rarely used. If, however, the eye of the observer be shifted to
the centre of the sphere, the resulting projection becomes Gno-
monic, and, if the plane of the projection is tangent to a pole of
the sphere, it does not differ greatly from any other polar projec-
tion. A good example of this projection may be seen in the cut
facing p. 60. Here the earth is projected on a cube tangent to
the sphere about which it is circumscribed. It will be hardly
necessary to add that the meridians of a gnomonic projection will
always be straight lines. This projection is nearly always used in
star charts and celestial maps.
A very ingeniously constructed globular projection is shown on
p. 58. Here the eye of the observer is at a slight distance above
the north pole, and the largest continuous circle is the equator.
If folded back, the rays of the star would meet at the south pole.
This is a convenient projection for showing the distribution of land
and water, and is a device much used by Mr. Russell Hinman.
Babinet's Equal-surface Projection. — This projection, as
its name implies, is so called because the surface bounded by any
given lines has an area equal to the surface bounded by the same
60
HINTS TO TEACHERS
lines on the sphere. The meridians are equidistant ; the parallels
are plotted so as to preserve the proportionality of areas as above
described. The projection readily admits being extended so as to
embrace the whole surface of the sphere, the bounding line then
becoming an ellipse. It is an excellent substitute for the Mer-
cator projection in showing the distribution of physical features,
but it is a difficult one to make. Mr. Russell Hinman has shown
a very excellent example on p. 13 of the Eclectic Geography.
This projection is, perhaps, best known as a homalographic
projection. (See p. 78.)
A Pofyconic Projection.
Polyconic Projection. — This projection was probably con-
ceived by F. R. Hassler, the first Superintendent of the U. S.
Coast Survey. It conceives the earth to have a shape like that
of a cone whose slant height is a convex instead of a straight
line, — in other words, like that of the old-time sugar-loaf or bee-
hive. Technically it employs a tangent cone for the development
MAP-DRA WING AND MAP-MAKING 61
of every parallel, and this is its chief distinction when compared
with the simple conic projection, where only one cone is em-
ployed. But in the conic projection the map is accurate only
where the sphere touches the circumscribed cone, whereas in the
polycone the map is accurate along each parallel, and distorted
only between them. The parallels are arcs of circles drawn from
different centres, each centre receding from the pole of the
sphere until, at the equator, the radius is infinitely long, and the
equator becomes a straight line. In the delineation of small
areas this is decidedly the most accurate of all projections, but
in very large areas there is considerable distortion at the east and
west margins, especially in high latitudes. A very meritorious
feature is that the meridians cut the parallels practically at right
angles. The proportionality of areas is not exactly preserved,
and in a map, say, of Eurasia, the area bounded by lines of equal
angular distance is about i \ times as great at the margin as at the
centre, along the same parallel. The polyconic projection is not
a very difficult one to lay off; it is certainly not beyond the com-
prehension of any one possessing a fair knowledge of geometry.
The curves of the meridians are scarcely more difficult to draw
than arcs of a circle, in which respect the projection differs mate-
rially from most of the others. Excellent illustrations of this pro-
jection may be found in Appleton's Geography, map of Asia. It is
also used for the maps of Asia and North America in the author's
Complete Geography. (See p. 79.)
Occasionally the cry is raised that the maps of our geographies
are objectionable because they contain too many details. Cer-
tainly the map should not contain so much matter as to be con-
fusing, and all unnecessary lines and schemes are a source of evil
rather than good. It is true that not every indentation of coast
can be accurately shown, but it is equally certain that the char-
acter of the coast may be delineated ; and if the map shows no
difference between the coast-charting of Maine and Florida, it is
not a true map. Mountains can be shown only in a conventional
way, yet the character of highlands and canons can be distinctively
62 HINTS TO TEACHERS
portrayed. If the hachure lines representing a mountain range,
a plateau, a line of cliffs, and a canon show no difference in texture,
the map is untrue. It is a mechanical impossibility to enter the
names of cities and towns on a map of a section of states, sys-
tematically, and in ratio to the population. The chartographer can
only submit to what he cannot help, and use his best judgment.
Now and then some one blindly proposes to introduce the names
of a few of the larger cities only on each section map. Such a
scheme is not only unnecessary, but misleading. It is unnecessary
because in all the standard text-books of geography the greater
centres of population are designated by larger type or by special
symbols. It is misleading because it is untruthful. There is no
more instructive lesson to be derived from the ordinary map than
that shown by the distribution of population over an area of coun-
try, and the wise teacher will not fail to recognize this feature.
Aside from this, the text-book map has a very important use as a
reference map, and if all but the salient features are removed, the
map has no value whatever beyond its class-room use.
Where maps containing only essential features are required they
would best be drawn by the pupils themselves. For this purpose
it is a good plan to take advantage of outline maps — that is, maps
which have already been projected. The details, whether physical,
political, or historical, may then be filled in progressively, using a
different sheet for each purpose.1 The plan of ' editing ' a map
will be found an invaluable discipline to the pupil. Indeed, it is
doubtful if a better plan to judge graphically of the pupil's progress
could be devised. Thus, an outline map of the world on the Mer-
cator projection may be edited to illustrate the following : —
Drainage of river-systems.
Contours of elevation of the land and depth of the sea.
Magnetic variation.
1 The progressive outline maps sold by the publishers of this book will be
found excellent for this purpose. I use them much in my private work, saving
from a few hours to several days' time for each map edited. — J. W. R.
MAP-DRAWING AND MAP-MAKING 63
Ocean currents.
Cotidal lines.
Distribution of volcanoes.
Distribution of rain-fall.
Winds.
Isothermal zones — summer and winter, each.
Distribution of life — animal and vegetable.
Commercial routes — railway and marine.
The map of any grand division or other specified area may be
treated in a similar manner. That a pupil should be taught to
project and draw at least one or two maps will certainly be admit-
ted as proper, but to compel him to draw every map he uses is
quite another thing. It is a needless waste of time, that brings
neither additional knowledge nor mental discipline. In the study
of history, outline maps are a necessity, and no amount of memo-
rizing or minute description answers as a substitute.
In most instances the ability to construct the strictly technical
projections demands a knowledge of higher mathematics which
the average pupil does not possess. In their construction an
inconveniently large drawing-board and an expensive beam-com-
pass are needed. Moreover, the student who investigates will find
that the projections used in text-books are rarely constructed
according to exact formulae ; on the contrary, they are commonly
modified arbitrarily to suit the size and proportions of the paper
on which the maps are to be printed.
The following projections will be found available for pupil's
work. That of Asia is a conic, and that of North America a
modified conic projection. The illustrations given do not differ
from the strictly mathematical projections to any greater extent
than the latter differ from one another. The only apparatus re-
quired is a pair of dividers with a long arm, a ruler or graduated
paper scale, and a well-pointed lead-pencil.
North America. — Let us suppose a projection for a map of
North America is to be made. First of all we must find its posi-
64
HINTS TO TEACHERS
o
S S/fIl\
y' / / / I I j ; i \ \ \ \ \ %%
North America — a Projection of Convergent Meridians.
There is a slight, but intentional longitudinal distortion.
MAP-DRAWING AND MAP-MAKING 65
tion on the earth. An inspection of a globe (or map) shows that
it is practically included between parallels 8o° and io° N., and
meridians 200 and 1800 W. (excepting the Aleutian Islands).
Almost the whole of its area may be included in a rectangle
having the proportions 6:5. A sheet of paper 14X12 will be
suitable for the purpose, but the lines which form the border of
the map need not be drawn until the projection is laid off. In
projecting a grand division it is conventional in the majority of
maps to lay the parallels ten and the meridians fifteen degrees
apart.
Secure the paper to the board, and draw the line OD through
the centre of the paper. At right angles to this line, and bisected
by it, draw a line about one inch from the lower margin of the
paper ; this line should be about fifteen inches from O, the apex of
the cone (practically the centre of a circle). On this line as a base,
lay off the rectangle, 12 X 10, which shall enclose the map. Divide
the lower twelve inches of the central meridian into eight equal
parts and draw the parallels, eight in number, the top and bottom
of the rectangle each forming a parallel. This division will make
the parallels ten degrees apart. At any convenient distance from
O, draw the arc AB. This arc is only for convenience in spacing
off the distance between meridians, and should be erased when it
has served the purpose for which it is drawn.
In the sketch on the opposite page there are seven meridians
on each side of the central meridian, and this will be found a con-
venient number, though a greater number would not affect the
consistency of the map. This will be obvious when we consider
that the cone which conventionally represents the earth may have
any angle of apex. The central meridian will have a longitude of
about 970. The meridians should be numbered so as to have
an assumed though arbitrary angular distance of fifteen degrees
apart.
In many of the school atlases the meridians are ten degrees
apart, every even tenth being drawn. This plan will be no more
difficult of projection than the foregoing. In this case it will be
66
HINTS TO TEACHERS
MAP-DRAWING AND MAP-MAKING 67
best after calculating the space required to draw the' 90th and
1 ooth meridians equidistant from OD. In general it is most
convenient to lay off the parallels and meridians to correspond
with those on the map to be copied.
When the projection is laid off in pencil, the coast-outlines may
then be charted, also in pencil. Where the coast is greatly
broken, it will be advisable to draw parts of the intermediate
parallels and meridians as in the projection given. Indeed,
where great accuracy is required, the chartographer may inter-
polate parallels and meridians for every even degree, or possibly
for fractional degrees.
Establish by latitude and longitude the prominent points of the
grand division, such as Point Barrow, Alaska, Cape Mendocino,
Yucatan, Cape Sable, etc., and then fill in the intermediate parts
of the coast. Next chart the islands, lakes, rivers, mountains, and
political features in the order mentioned.
The pupil should not be discouraged if his outline does not
exactly correspond in form to that in his atlas. As a matter of
fact it should not. Accuracy in a map of a large area is theoreti-
cally an impossibility, but consistency is attainable ; and if the
pupil's map has been faithfully charted, it will not differ from the
true mathematical projections any more than the latter differ from
one another. Of course the judgment of teacher and pupil must
determine as to how elaborate such a map may be : such a map
as is planned in the foregoing paragraphs may be drawn in five
minutes or in five weeks, — just as circumstances may require. If
the pupil prefers, a projection similar to that of Europe, p. 66,
may be employed for North America.
South America. — For this grand division a projection similar
to that of Africa will be found suitable. The intersection of the
20th parallel with the 60th meridian is about the geographical
centre, and from these lines as bases the other parallels and
meridians may be spaced off ten degrees apart. There will be a
slight but noticeable distortion in the southern part. If the dis-
tance between parallels be made about i-j- times that between
68
HINTS TO TEACHERS
Africa — Drawn on an arbitrarily modified Mercator Projection.
In this projection the parallels and meridians are equidistant. It is sometimes called the
' Projection of Equal Squares.'
MAP-DRAWING AND MAP-MAKING 69
meridians, the lateral distortion will be less apparent; a better
plan, however, is to make the meridians converge towards the
south.
Europe and Asia. — These divisions may be drawn singly or
together. In either case an unmodified conic projection is per-
haps preferable. If they are projected together, about all of this
area is included between the meridians of io° W. and io° E., and
between the parallels of o° and 8o° N. The intersection of the
40th parallel with the 90th meridian is practically the geograph-
ical centre. Notice that the parallels are arcs of concentric
circles. If the size of the map is to be, say, 9X12 inches, the
equator should be drawn with a radius of about twelve inches.
From the centre of the map space off ten (or twelve) meridians
on each side of the central meridian, and four parallels on each
side of the central parallel. Then sketch in the outlines in the
order as directed in North America. When a hastily drawn map
is required, the alternate parallels and meridians may be omitted.
If a sketch of Europe only is required to be drawn on the black-
board, the parallels may be drawn as straight lines.
Africa. — The Mercator projection is an excellent one for
Africa, for, on account of its position, there is but little distortion.
The intersection of the 20th meridian with the equator is about
the geographical centre. Draw meridians and parallels for every
tenth degree. It is well to include the Mediterranean Sea and
the southern shores of Europe, and also Asia Minor and the
Arabian coast. Locate the prominent coast-features first, and
then complete the outline.
Oceania. — In projecting a map of this region, the draughts-
man should first decide on how much is to be shown. A large
map of Australia will of necessity exclude the greater part of the
coral island groups ; and conversely, a map which shall show all
the groups from the Sunda to the Feejee group will show the
Australian continent on a reduced scale. Use the Mercator pro-
jection, and after deciding upon the extent of the region to be
shown, proceed as directed in the preceding cases.
70
HINTS TO TEACHERS
PROGRESSIVE OUTLINE MAPS.-Drawn by J. C. Thompson, Providence. R. I. Copyright by J. C. Thompson. 1686.
l^tLZsrri-<r*y GVVafis Name ,WOT4<n«^_t-^M^aKUafct_
North America — an 'edited' Progressive Outline Map.
MAP-DRAWING AND MAP-MAKING 71
The United States. — The United States may be drawn on a
true conic projection, or on the modified form like that of North
America. A Mercator projection, however, will not show an
excessive distortion. If the conic projection be employed, it is
necessary to use skill in preserving an approximately constant
value to the scale of miles. In most geographies the parallels
and meridians are each five degrees apart. But while the value
of a degree of longitude is very nearly 60 miles along the 30th, it
is less than 45.5 miles along the 49th parallel. That is, the con-
vergence of the meridians is such that along the northern boun-
dary of the United States the distance between meridians is only
three-fourths that along the 30th parallel. Moreover, the distance
between meridians along the 30th parallel is only five-sixths that
between adjacent parallels, and if the map is to be consistent, this
must be taken into account in the projection. It is true that
maps are sometimes constructed having one scale for latitudinal
and another for longitudinal measurements, but such maps are
rare, and when employed they do not purport to be anything
more than what they really are. For convenience to the student
a table has been prepared (p. 82) showing the value of a degree
of longitude at each degree of latitude. A brief calculation will
show the relative amount of convergence of the meridians.
State and Section Maps. — Such areas are conveniently
charted on a projection similar to that of North America, but if
the student is the fortunate possessor of a beam-compass, a true
conic projection will be better. Calculate the position of the area
to be charted, and then determine the scale and proportions of
the map. For instance, suppose a map of Colorado is to be pro-
jected. First determine its position as to latitude and longitude.
An approximate measurement shows that its proportions are about
7:5. This will be useful in determining the dimensions of the
paper, allowing, of course, for an untrimmed margin of about two
inches, and about half as much for the bordering states. By
reference to the table it will be seen that the value of a degree of
longitude on the 37th parallel is about 55 miles, and on 'the 41st,
72 HINTS TO TEACHERS
about 52 miles. This will give a proportion of about 12.1 inches
for the northern boundary to 12.8 for the southern. A similar
calculation will show that the distance between adjacent parallels
is about 1.3 times that between the meridians along the southern
boundary. Once fixing these proportions, the charting of rivers,
county boundaries, etc., will be easy to accomplish.
Every pupil should learn to sketch a map from memory, and
such a sketch placed on the blackboard should not take more than
three or four minutes' time. But to do this well requires instruc-
tion on the part of the teacher as well as practice by the pupil.
In the author's experience no better or surer method of accom-
plishing this can be devised than that of first teaching a pupil how
to project a map. With the same amount of practice on the part
of the pupil, far better results can be attained in rapid off-hand
sketching than by the use of the usual subterfuges.
The production of a highly finished map is not an essential part
of common school work. The teacher of geography, however,
should be master of the situation, and the time that may be devoted
to one or two maps of this character will repay good interest.
Furthermore, if the pupils have the time to spare, such an exer-
cise will not be barren of disciplinary results. It will inculcate a
desire for accuracy in detail, skill in handling the pen, and neat-
ness in work. The pupil may either make his own projection or
use an outline map. In either case it will be best to temporarily
interpolate additional parallels and meridians quite thickly. All
work should be first done in lead-pencil, and no ink should touch
the map until the colors have been applied.
In the application of the colors several brushes are required, one
of which should be used with clear water. A very fine, small
brush is required for coast work. Four or five colors are re-
quired, — black, Indian yellow, blue, and pink.
The remaining colors are best made by mixing. Pink and yel-
low make a very attractive buff; blue and yellow, green ; blue and
pink, the draughtsman's purple. Carmine will be required only
when railway lines are to appear on the map. All colors, except
MAP-DRAWING AND MAP-MAKING 73
as noted, should be diluted until only a very delicate shade appears
on the paper : if greater strength of tone is required, it should be
obtained by successive applications of the color. In general,
never apply a color until the surface has been wet with clear water :
by observing this direction, uniformity of shade may be insured.
First, apply the blue, which conventionally represents the water.
The color strip should not be more than a quarter of an inch
wide : half that width will be better. With the fine brush apply
the color a second time quite close to the coast-line, being careful
to keep the paper wet ahead of the work. In the same manner
color the various political and other boundaries. The black work
may then be entered in India ink, and last of all the mountains
should be hachured. For this purpose brown is the best : a good
color can be made by mixing pink and yellow of full strength.
The texture of hachure lines is somewhat difficult, and requires
much practice before it can be well done.
The lettering, unless well done, will spoil an otherwise artistically
drawn map. Do not attempt to use ordinary Roman letters.
Unless one is an expert, such letters always look bad. Except
where it is impossible, the names of towns should always be in
alignment with the parallels. Names of countries, oceans, etc.,
are best drawn in graceful curves. The following scheme of
typography will be found the least difficult, though not the
most artistic : —
COUNTRIES,. OCEANS, etc.
Capitals
Large Cities
Mountains
Smaller Bodies of Water
Rivers
Cities and Towns
In general, it is best to distribute the name of an area across its
broadest extent, so that there shall be no doubt as to the territory
74 HINTS TO TEACHERS
included. The distribution of the names requires, moreover, judg'
ment, skill, and artistic ability. It is best to have names of towns
and of areas that are regular in shape conform to the direction
of parallels. Where this is inexpedient, the name should be laid
off on a graceful curve. Clean the map first with india-rubber,
and then with moderately fresh bread-crumbs, and, last of all, trim
the margin to within about one inch of the border. The map is
then ready for inspection.
The maps in nearly all of leading geographies have been pro-
jected and drawn either by Mr. Jacob Wells of New York, or by
Mr. W. H. Holmes of Philadelphia. Both of these gentlemen
are widely known as geographers as well as trained chartographers,
and if their maps in school text-books are open to the criticism of
inconsistency, or inartistic appearance, the fault rests, not with the
chartographer, but with the employer. It is not conducive to the
personal comfort of the draughtsman to be ordered to distort a
projection in order to fit a certain size of paper, or to sacrifice
accuracy in order to harmonize a map to some one's pet theory ;
yet this has been deliberately done in more than one instance.
The charge for the original drawing of a map, such as appears in
the recent school geographies, varies from $75 to $125 per page,
and, considering the quality of the work, these prices are not un-
reasonable. Publishers, nowadays, are willing to pay well for
first-class work. The cost for engraving such maps is about $200
per page. Nearly all the maps in school geographies are engraved
and printed by Struthers & Co., New York, or by Matthews &
Northrup, Buffalo. In most instances the map requires six print-
ings, viz., black, blue, pink, yellow, brown (for the mountains),
and carmine (for railway lines). All other colors are produced
by variously combining pink, blue, and yellow in the printing.
It is no more than justice to say that the maps of American
geographies are not equalled by those in any European text-
book.
The most important thing about a map, however, is the ability
to read it correctly. Perhaps any expression of doubt concern-
MAP-DRAWING AND MAP-MAKING 75
ing this subject will provoke a smile on the part of the reader.
Nevertheless the assertion may be broadly made, that no one can
read a map correctly who has not learned to project it. Let any
one who feels inclined to smile make the following tests — upon
himself.
On the map of North America, draw a line which shall repre-
sent the shortest distance between Iceland and Bering Strait. On
a map of the Western Hemisphere draw a similar line from Cape
Farewell, Greenland, to the mouth of the Amazon. Trace similar
lines on a globe, and notice whether or not the lines pass through
the same points.
Is a straight line on a map always the shortest distance between
two points ?
Does a line drawn towards the top of the map always extend
north and south? On the map of a hemisphere can you draw
two short parallel lines, one of which shall point north and south,
the other east and west ?
On page 4 of Swinton's Geography are three maps, each show-
ing the grand division of North America. They all differ in shape,
yet each is accurately drawn. Explain the reason.
On a state map, such as is found in the supplement of most
school geographies, can you find the latitude and longitude of a
place to within three minutes of arc — or to within three statute
miles of its proper position? The map contains all the informa-
tion necessary to locate a point much more closely.
If you superimpose the map of North America in Swinton's
Geography upon the map of the same division in the author's
Complete Geography, you will find that nowhere is there coinci-
dence of outline, yet both maps are on the same scale, and each
is strictly correct. Explain why.
Can you construct a scale of miles for any ordinary map ? The
map contains all the information necessary.
Can you tell the meaning of the following ? — Nat. scale =
1 : 633,600.
Can you tell by inspecting a map whether it is possible to make
76 HINTS TO TEACHERS
a scale of miles that shall be accurate in all parts of the map?
The map will show this at a glance.
Can you tell whether the parallels and meridians are so drawn
as to preserve true proportionate distances, or whether there is
distortion in any part of the map?
Can you tell the direction of the slope of the land by an inspec-
tion of the map ? The map bears the information on its face.
Can you trace the summit of a divide that separates adjacent
river-basins ?
On a map of a grand division, can you draw at least one line
that shall pass through all places having the same level?
Unless the student of geography can do all this, — and a great
deal more, — he can read or interpret maps very imperfectly, at
the best.
TECHNICAL CONSTRUCTION OF PROJECTIONS 77
THE TECHNICAL CONSTRUCTION OF PROJECTIONS.
The teacher or pupil who wishes to undertake the construction
of any of the mathematical projections described will find the
following tables and formulae necessary. Generally speaking, the
process, aside from planning the size, extent, and scale of the map,
is wholly mechanical, and after a little practice the projection may
be easily and quickly laid off. Usually the draughtsman must choose
between true proportion of area with distortion of outline, and
true outline with distortion of area. A drawing-board, draughting-
instruments, two or three engineer's paper scales, and a flexible rule
are needed. The whole need not cost more than five or six dollars.
Mercator's Projection. — In the solution of the projection on
,y>
page 51, it is assumed that the earth is a sphere. For a spheroid
earth, it is necessary to use the following table. The length
one degree at the equator, 60 minutes of arc, is taken as the unit
of measurement. The distance of each parallel will be as follows :
A
10 . .
599
60 . .
• 45<#'
20°..
1217'
65°. •
.5158'
30°. •
1877'
7o°. •
• 5944'
40°. .
2608'
75°-.
. 6948'
50°. .
345 7'
8o°. .
• 8352'
of
J
cWi
The fact that either formula gives a projection that is contracted
in the part where, in physical maps, the details are most numer-
ous, is a very great objection. The teacher or pupil therefore who
desires a more convenient map for such purposes may use the
following plan : Draw the meridians one hour (15 degrees) apart.
Take two-thirds of this value for the distance to the 10th parallel,
<~
c-
78
HINTS TO TEACHERS
5\7S
and use this distance as a unit. Lay off the 20th parallel a a
distance of 1.25, the 30th 2.5, the 40th 3.75, the 50th 5.0, units
from the equator, etc. Of course such a projection is worthless
for sailing purposes, but it is far more practical for a map showing
the distribution of physical features.
Projection of Convergent Meridians. — A moment's inspec-
tion will show that the column of ' Radii for Parallels,' Table I, may
be used to find the common point at which the meridians will inter-
sect. Thus the line OD, page -e^ will be 325 units in length, on
the supposition that the map extends to the 10th parallel.
An Orthographic Projection.
The Orthographic Projection. — Draw a circle of the size
required. Draw the equator, and at right angles thereto, the
axis, which is also the central meridian. On the supposition that
the parallels are ten degrees apart, divide each quadrant into nine
equal parts, and draw the parallels through these points, as in the
MAP-DRAWING AND MAP-MAKING
79
cut on page 76. (It will be proper to say here that one-half of
each parallel, that is, the perpendicular distance from the end of
the arc to the central meridian, is technically the cosine of the
angle of latitude. This is usually expressed as cos <£, in which <f>
may be any given latitude.) On the equator, on each side of the
central meridian, lay off distances equal to the distance from the
equator to the successive parallels. Through each of the points
thus determined, a meridian must be passed, terminating at the
poles. Each meridian is a semi-ellipse whose major axis is the
central meridian, and whose minor axis is the distance from
the central meridian to the point through which the meridian is
to be drawn. Technically the minor axis equals 2 sin <f>.
A Stereographic Projection.
The divisions of AD and DB show the points through which the meridians are to be drawn.
The Stereographic Projection. — The above figure will illus-
trate the construction of this projection. AB is the equator of a
hemisphere. Draw any circle OED tangent to AB at its middle
point, and divide its upper semi-circumference into as many parts
as there are to be meridians. From O, the point of vision, draw
lines through these points until they cut A, B. These are points
through which the meridians pass. To construct the meridians,
with AB as a diameter, draw the circumference of the circle which
bounds the hemisphere. Draw arcs which shall pass through both
80 HINTS TO TEACHERS
poles of the hemisphere, and each through its proper point on the
equator. The centre of each arc is most quickly found by trial.
To construct the parallels, divide the arc of each quadrant into as
many parts as there are parallels required, and in the same man-
ner divide the central meridian. Draw arcs of circles with a radius
of such length that each arc shall cut the central meridian at its
proper point, and meet the circumference of the hemisphere at
corresponding points.
An arbitrary, but very serviceable modification of this projec-
tion may be made by subdividing the equator equally, and passing
the meridians through these points. This modification does not
differ greatly from De la Hire's projection.
The Babinet Homolographic Projection. — Lay off the circle,
equator, and central meridian. Then, if the parallels are ten de-
grees apart, beginning at the pole, divide each half of the central
meridian in the proportion of if, if, if, if, if, i|, if, if, 2.1
Space off, say 20, equal distances along the equator for the merid-
ians. Then each meridian will be a semi-ellipse whose major axis
is the central meridian, and whose minor axis is the distance from
the central meridian to the one to be projected.
The Conic Projection. — In laying off a conic projection the
chartographer may construct one in which the cone is tangent to
the sphere at the middle parallel of latitude, but it is better on the
whole to conceive that the cone cuts or pares off a part of the
surface of the sphere, thereby becoming an ' intersecting ' cone.
This is done practically by drawing the parallels each with a radius
slightly shorter than that given, but spacing off the longitudinal
distances, according to the table. For instance in the map of
Europe if we assume that the cone is tangent at the 50th parallel,
then (Table I.) the radius for drawing the parallels is 48.08 units ;
but if we take an intersecting cone which cuts the sphere at lat. 400,
1 This is only an approximation. The following formula gives the exact dis-
tance. Let <p = the latitude of the parallel to be determined, h = the distance
from the equator, and ir= 3.1416. Then sin </> = - (2/1 + sin 2a).
MAP-DRAWING AND MAP-MAKING 81
the radius is 68.3 units. For a map of a grand division it is well to
follow the scheme laid down on page 00, but in projecting the
map of a state or any other small area, careful, mechanical meas-
urements will give a better result. Suppose the map to be that of
Pennsylvania. Determine the size of the map and draw the central
meridian. From Table II. lay off the points where the 40th, 41st,
and 42d parallels cross it. With a radius of 68.28 units (Table I.)
draw an arc for the 40th parallel, and from the same centre draw
the 41st and 4 2d parallels each through its proper point on the
central meridian. On this parallel of 400 lay off the degrees of
longitude, each 53.06 miles in length; and on the 42d parallel
space off the degrees 51.48 miles each. Draw the meridians each
through its proper series of points.
Bonnet Projection. — The parallels are drawn from the same
centre, using a length of radius according to Table I. The merid-
ian distances may be laid off from either table and the meridians
drawn with a flexible rule, or they may be drawn by means of
curves made for the purpose. A set of three or four ' ship-curves '
will answer all practical purposes.
For FlamsteedVs modification, make the parallels equidistant
straight lines, space off the meridian distances according to Table
I., and through each set of points draw the meridian with a flexi-
ble rule.
From the foregoing it may be inferred that while the map is
theoretically projected on a tangent cone, the meridians are spaced
off as if the cone were spheroidal. It is for this reason, also, that
on a projection for a large area, a meridian, instead of cutting the
parallels at right angles, may cut them at very oblique angles, —
acute in high, and obtuse in low latitudes.
The Polyconic Projection. — Determine the extent and scale
of the map, and lay off the central meridian. Along the central
meridian lay off divisions through which the parallels are to be
drawn, five, ten, or any number of degrees apart, as may be desired.
The parallels may then be laid off from Table I. On the suppo-
sition that the distance between meridians at the equator is ten
82 HINTS TO TEACHERS
units (each, say, \ of an inch, or any value the draughtsman adopts),
the radius for drawing the parallel of ten degrees is 324.9 units in
length; for the parallel of twenty degrees, 157.4 units, etc.
The distance between adjacent meridians may then be spaced
off. Referring to the same table, the distance at the equator is 10
units ; on the tenth parallel, 9.84 units ; on the twentieth parallel,
9.39 units, etc., throughout the extent of the map. With the
flexible rule, draw curved lines which shall pass, each through a set
of points thus established. The second column of Table I. has
been constructed on the hypothesis of a spherical earth. A
slightly more accurate result may be obtained by dividing each
member of the second column of Table II. by 69.172 ; the quo-
tients will be ordinates for each degree of a geoid. As a matter of
fact, this table is used in spacing off the meridian distances on the
maps published by the U. S. Coast Survey. It is practically a
table of cosines ; and the radii by which the parallels are drawn
from a table of natural cotangents, each member being multiplied
by a constant factor N. In Table I. this factor is 57.296. It is
deduced as follows : If the cosine of an arc of i° of a great circle
of a sphere is 1.000, then the radius of that sphere is 57.296-f.
The formula for the radius of the developed parallel is, therefore,
R = N cot$.
.1
nL J MAP^DRAWING AND MAP-MAKING
83
T
LBLE I.
— For 1
he Construction of Polyconic Projections.
1 Dec.
Radius
Dec.
Radius
Dec.
Radius
Lat.
I OF
for
Lat.
of
for
Lat.
of
FOR
ILONG.
Parallei .
Long.
Parallel.
Long.
Parallel.
0°
1.000
CO
31°
.857
95.356
62°
.469
30.465
1°
.999
3282.473
32°
.848
91.962
63°
.454
27.945
2°
.999
1640.736
33°
.838
88.228
64°
.438
26.717
3°
.998
1093.268
34°
.829
84.944
65°
.423
26.717
4°
.997
819.368
35°
.819
81.827
66°
.407
25.510
5°
.996
654.894
36° '
.809
78.861
67°
.391
24.321
6°
.994
545.133
37°
'.799
76.034
68°
.374
23.149
7°
.992
466.637
38°
.788
73.335
69°
.358
21.194
8°
.990
407.681
39°
.777
70.254
70°
.342
20.854
9°
.9S7
361.751
40°
.766
68 282
71°
.325
19.729
10°
.984
324.940
41°
.755
65.911
72°
.309
18.617
11°
.981
294.761
42°
.743
63.633
73°
.292
17.517
12°
.978
269.556
43°
.731
61.442
74°
.275
16.429
13°
.974
248.175
44°
.719
59.332
75°
.259
15.352
14°
.970
229.801
45°
.707
57.296
76°
.242
14.285
15°
.965
213.831
46°
.694
55.330
77°
.225
13.228
16°
.961
199.814
47°
.682
53.429
78°
.208
12.179
17°
.956
187.406
48°
.669
51.589
79°
.191
11.137
18°
.951
176.338
49°
.656
49.806
80°
.174
10.103
19°
.945
166.399
50°
.643
48.077
81°
.156
9.075
20°
.939
157.419
51°
.629
46.397
82°
.139
8.052
21°
.933
149.261
52°
.615
44.764
83°
.122
7.035
22°
.927
141.812
53°
.602
43.175
84°
.104
6.022
23°
.920
134.980
54°
.588
41.628
85°
.087
5.013
24°
.913
128.688
55°
.573
40.119
86°
.070
4.007
25°
.906
122.871
56°
.559
38.646
87°
.052
3.001
26°
.899
117.474
57°
.544
37.208
88°
.035
2.001
27°
.891
112.449
58°
.529
35.802
89°
.017
1.000
28°
.883
107.758
59°
.515
34.427
90°
.000
0.000
29°
.874
103.364
60°
.500
33.080
30°
.866
99.239
61°
.485
31.760
84
HINTS TO TEACHERS
Table II. —The Lengths of One Degree of Longitude in Different
Latitudes.
Lat.
Stat. Mi.
Lat.
Stat. Mi.
Lat.
Stat. Mi.
Lat.
Stat. Mi.
0°
69.164
23°
63.695
46°
48.124
69°
24.860
1°
69.145
24°
63.216
47°
47.253
70°
23.725
2°
69.122
25°
62.718
48°
46.363
71°
22.584
3°
69.072
26°
62.202
49°
45.462
72c
21.437
4°
68.998
27°
61.666
50°
44.545
73°
20.284
5°
68.901
28°
61.113
51°
43.614
74°
19.124
6°
68.785
29°
60.537
52°
42.670
75°
17.957
7°
68.652
30°
59.947
53°
41.713
76°
16.784
8°
68.496
31°
59.333
54°
40.743
77°
15.608
9°
68.315
32°
58.711
55°
39.760
78°
14.427
10°
68.117
33°
58.065
56°
38.765
79°
13.240
11°
67.900
34°
57.397
57°
37.758
80°
12.049
12°
67.661
35°
56.714
58°
36.740
81°
10.854
13°
67.402
36°
56.018
59°
35.710
82°
9.656
14°
67.121
37°
55.308
60°
34.669
83°
8.456
15°
66.821
38°
54.570
61°
33.617
84°
7.253
16°
66.499
39°
53.819
62°
32.555
85°
6.048
17°
66.163
40°
53.053
63°
31.4S3
86°
4.840
18°
65.798
41°
52.269
64°
30.402
87°
3.631
19°
65.419
42°
51.476
65°
29.310
88°
2.421
20°
65.014
43°
50.660
66°
28.210
89°
1.211
21°
64.5S9
44°
49.830
67°
27.101
90°
0.000
22°
64.156
45°
48.982
68°
25.985
Geography.
Progressive Outline Maps.
North America; South America; Europe; Central and Western Europe*;
Asia; Africa; Australia; United States; New England; Middle Atlantic States ;
Southern States, Eastern Division ; Southern States, Western Division ; Central
States, Eastern Division ; Central States, Western Division ; Pacific States ; the
Great Lakes ; New York ; Ohio ; Washington ; Pennsylvania ; British Isles * ;
England*; the World on Mercator's Projection*; Greece*; Italy*; Pales-
tine * ; and Ancient History *(the world as known to the Ancients). Printed on
substantial drawing paper, adapted to lead-pencil or to ink. 10 x 12 inches.
U. S. and Mercator's Projection, 12 x 20 inches. Price by mail 2 cents each;
#1.50 per hundred. Map of Ancient History, 3 cents each ; $2.50 per hundred.
An edition of the Maps, at same price, is issued in black ink, on heavy white
writing paper, about three-fourths the size. These are especially adapted for use
in grades using the Primary Geography.
When ordered by mail at the hundred rate, the postage, which on
full hundreds is 25 cents for the small maps and 50 cents for the large,
must be paid by the purchaser.
* These maps may also be had for historical work with outline printed in black ink.
THESE outlines are for the use of the pupil, and are based on the
assumption that map-drawing should be taught as a means, and
not as an end ; that its purpose is to assist the mind in acquiring
and fixing geographical facts, and that to memorize the construction
lines of other methods and the hundreds of nameless projections and
indentations of a tortuous coast-line is a waste of iime and of nervous
energy which would be better employed in studying important and in-
teresting particulars concerning the physical features, climate, pro-
ducts, etc., of the interior.
In tracing the outline, the pupil acquires a correct knowledge of the
form of the country, and, as each day's lesson proceeds, he can fill in
his map to correspond with the detailed knowledge gained.
Among the advantages of the Progressive Outline Maps, we may
mention the following : —
I . Economy of time. By using the Progressive Outline Maps all
the practical benefits of map-drawing are secured. By tracing the dim
outline, and then developing a continent along such special lines as
the teacher may direct, every important feature is clearly fixed in the
mind of the pupil, in as little time as is ordinarily consumed in mem-
orizing the construction lines and diagrams of other systems ; and the
still longer time required to memorize the irregularities of a contour
can be devoted to the study of the more important topics.
167
i68
GEOGRAPHY.
2. Accuracy. They keep a correct form of the country under con-
sideration constantly before the pupil.
3. General usefulness, (a) These maps may be used to indicate,
besides the usual facts of indentations, projections, mountains, rivers,
countries, states, towns, etc., the location of areas of mineral deposits,
of forest growth, of prairies, deserts, plateaus, of the various kinds
of soil, of staple productions, of dense population, of manufacturing
districts, etc.
(b) For developing the features of continents, made specially prom-
inent in Physical Geography, these maps are very valuable.
(c) In connection with the study of Ancient History, these maps
may be used to represent the location of ancient tribes and barbarous
hordes of men, the provinces of ancient empires, the distribution of
territory after conquests, etc., etc.
(d) In Modern History, the Maps of North America and the
United States may be used for indicating the early discoveries, the
settlements and the general development of the continent, the colonies
and the nation, in connection with the text-book study of these fea-
tures.
No time can be spared in History for practice in map-drawing.
(e) For rapid and thorough tests of pupil's knowledge of Political,
Descriptive, and Physical Geography, and of many facts in History,
no series of questions and answers can equal in three hours what may
be ascertained, practically, of their knowledge of these subjects by
the Outlines in thirty minutes. Such a map can be easily and rapidly
inspected by the examiner.
4. Economy in price. These maps cost the pupil two cents each.
Several times that amount is usually expended for paper required for
the practice in producing a satisfactory map by other methods.
For opinions, other than the following, from teachers and school
officers who have used, or carefully examined the maps, see special
circular which is sent free on application.
Albert G. Boyden, Prin. State
Normal School, Bridge-water, Mass.:
They are admirable, and greatly facilitate
the study of geography and history. We
use them with much satisfaction for his-
tory as well as geography.
Geo. H. Martin, Agent Mass. State
Board of Education : Both the idea and
execution commend themselves fully to
my judgement If they can be made to
displace the old "systems" of map-draw-
ing, they wiU be a boon.
GEOGRAPHY. 169
Progressive Outline Maps of the World.
No. 1. World Outline, on the Plane of London. \\\ X t8 inches.
No. 2. World Drainage Outline, on the Plane of the North Pole. 14J X 18.
No. 3. Southern Hemisphere, Drainage Outline, on the Plane of the South Pole.
*32 X 18. Introduction price, 3 cents each. #2.50 per hundred.
THIS series of Progressive Outline Maps of the World is based on
the latest and best means of presenting by maps geographical and
historical facts, especially those of world-wide significance. The series
has been proven, by actual work with pupils from the fifth year upward,
to be unexcelled for the ease, accuracy, and truthfulness with which
World Relations, both in Geography and History, can be represented.
Pupils are enabled to perceive and express in Geography, (1) the
ideas of the relations of relief, drainage, climate, productions, of all
the continents, (2) the distribution, occupations, settlements, etc., of
people, O") the intercontinental lines of travel, (4) the extent of the
interdependence of geographical objects; in History, (1) the territorial
limits, (2) the movements of nations in the past and present, in war
and peace, (3) the influence of physical features on the development of
a people or nation.
A list indicating the uses of the series in the teaching of the World
as a Whole, or Globe Lessons, is given in a special circular on these
maps.
Historical Outline Map of England.
For the Use of Students. By Thomas C. Roney, Chicago. 19 x 24 inches.
Retail price, 5 cents each. Introduction price, #4.00 per hundred.
THIS map is especially valuable for showing the vital relation be-
tween Geography and History, and for illustrating the historic
sequence of events. The skillful teacher will make it serve many
other subordinate uses. It is an admirable help to the study of
English Literature.
The outlines of the counties of modern England and Wales, and of
the earldoms and vassal kingdoms of England in the tenth and
eleventh centuries are indicated, and suggestions and illustrations as
to the use of the map are given on it.
170
GEOGRAPHY.
Outline Maps of the United States.
Prepared by Edward Channing and Albert B. Hart, Assistant Professors
in History in Harvard College. The Large Map is on strong white paper, in
four sections, each 26x42 inches. Price, 15 cents per section; 50 cents com-
plete. Mounted, $3.00. The Small Map is on tough white paper, in blue
ink, and 1 1£ x 18 inches. Price, 2 cents each ; #1.50 per hundred.
THE sections of the large maps are divided by the 95th meridian
and the 37th parallel. They may be used separately or pasted
together. The location of the principal cities is indicated by dots and
there is no lettering on the map except the numbering of the parallels
and meridians. These maps are suitable for large classes or for
public lectures as they can be clearly seen for a distance of more than
forty feet. By the simple use of shading and colors they may be
made to serve in place of elaborate maps of various kinds ; physical,
geological, political, etc., with the further advantage of allowing
teachers to exercise their individual knowledge.
The small map has a broad margin on the right hand side which
furnishes space for written comments. The names of the principal
rivers and the numbers of the parallels and meridians are printed on
these maps. They are useful to the teacher or lecturer, where a map
may be passed from hand to hand, and convenient for recording geo-
graphic facts in graphic form, and for copying rare or expensive maps.
They may serve well for a great variety of exercises in Political
History, Economics, Meteorology, Geology, and Physical Geography.
In use at Harvard, Johns Hopkins, University of Pennsylvania,
etc., etc. Special circular, more fully describing the method of using
these maps, sent free on application.
The Educational Courant, Louis-
ville, Ky.: Map drawing is one of the
best methods possible in teaching geo-
graphy, but has not been used by teachers
generally on account of the time necessary
to teach children how to make outlines.
This series of maps, which embraces all
that any class will need to use, does away
with that stumbling block. If you see
them you will use them.
School Education, Minneapolis,
Minn.: Many teachers whose time is
limited are deterred from map sketching
by the labor of drawing details. Here we
have maps faultlessly proportioned and
ready for names. The advantage of such
work is incalculable. The larger sectional
maps of the United States are also in
blank ready for a large historical wall map
which will grow in completeness as events
are unfolded during the progress of the
term's work in history. Each student
may work up his own map, or one may be
made by the class in common.
GEOGRAPHY.
Historical Outline Map of Europe.
Printed on bond paper, 12x18 inches, in black outline. Price by mail, 3 cents
each ; #2.25 per hundred.
THIS map, though belonging to the Progressive Outline Map Se-
ries, is especially intended for the use of classes in History or
Science, as fully described under the Historical Outline Map of the
United States (seepage 170).
In addition to the outline of the continent, the principal mountain
ranges are also given.
Topics in Geography.
By W. F. Nichols, Principal of Hamilton School, Holyoke, Mass. Cloth.
176 pages. Retail Price, 65 cents.
THIS book contains a comprehensive outline of all geographical
facts usually taught in our best primary and grammar schools,
together with many excellent suggestions for increasing the interest
of pupils by object lessons and language work in geography.
In preparing the Topics the author has aimed : to increase the
value of geographical study, to shorten the time usually spent on the
study, to give a brief outline for the scientific study of any continent
as based upon structure or slope, to deal sparingly or not at all with
statistics, but rather to have all areas taught by comparison, to make
more prominent the natural curiosities and wonders, and to combine
language and geography. It is a practical guide, containing much in-
formation concisely stated. A list of books for reference, including
many interesting and reliable tales of travel is added.
G. R. Showhan, Co. Supt. Schools,
Urbana, III. : I believe it will be a very
useful auxiliary to teachers of our com-
mon schools. They do not so much need
to be told what to teach as how to teach ;
as how to select from the great mass of
geographical facts those which will prove
to be most useful. Your little work will
certainly prove to be a valuable guide.
Isaac H. Stout, lately of Dept. of In-
struction, Geneva, N. Y. : I have exam-
ined it carefully and am much pleased
with it, believing that it is directly in the
line of what so many of our teachers need
for their work in the school- room.
E. S. Kirtland, recently Supt.,
Holyoke, Mass. : The Topics in Geog-
raphy were made in and for our schools,
and have been used long enough to prove
their value ; indeed, I regard the little book
as the most useful school-room work that
has ever been given to this department.
Miss A. G. Baldwin, Teacher in
Hampden Nor. and Agri. Inst., Va. : It
seems to me admirably fitted for the pur-
pose for which it was intended-
172 GEOGRAPHY,
Lessons in the New Geography.
By Spencer Trotter, Professor of Biology and Geology in Swarthmore Col'
lege, Pa. Cloth. 192 pages. Retail price, pi. 00.
THE New Geography is new in the sense that its point of view is
essentially human . The old methods of geography teaching dealt
almost exclusively in the hard facts and dry detail of surface features,
political divisions, — an endless, meaningless collection of names, with
Jittle if any reference to the true value of geographical conditions as
factors in the development of man. As the earth is the theatre of
human action, the true study of geography is a study of human life
under the varied conditions of existence imposed by the different regions
of the earth. It is thus synonymous with History. One object of these
" Lessons" is to bring this view of the study of Geography, — with
a fresh and living interest to the mind of every teacher and student.
Not the least important feature of geographical study, as of all study,
is the extent to which the imagination is brought into play in forming
ideas of things. A mental picture must be created in the child's brain ;
and the teacher is successful in so far as he or she is able to form this
picture in his or her own mind, and vividly reflect it to the pupil. So
with a book : its words and sentences must convey living ideals. To
the extent that it does this will it be interesting, instructive, and
valuable as an educational factor.
These " Lessons11 aim to fulfil these two phases of the study, — the
human and the imaginative. The purpose of the book is to present
an outline sketch, suggestive and stimulating, and it is intended as
a Reader to supplement the regular work of the teacher and the
class.
The various subjects presented in the chapters and lessons are not
to be viewed as special and separate treatises. They are brought for-
ward simply to indicate their relationships to the whole subject. This
is especially true of the lessons dealing with the elementary questions
of climate and geology. The book does not aim to train the student,
but to stimulate interest in the wider relations of Geography.
From our special circular on this book we quote the following :
in an excellent manner. It is interestingly
written, and it deals with matter which
ought to be learned by all pupils.
K. S. Tarr, Prof, of Geology \ Cornell
Univ.y Ithaca N.Y.: The book is well
conceived, well prepared, and published
GEOGRAPHY.
*73
Manual of Geography,
Modern Facts and Ancient Fancies in Geography. A book for teachers. By
Jacques W. Redway. Cloth. 175 pages. Retail price, 65 cents.
BEING a world-wide traveller and professional geographer, as well
as a practical teacher, Mr. Redway is excellently fitted to make
fresh and original suggestions on the study of this subject. His
book renders the latest discoveries in Geography available for the
use of teachers. Chapters on Out-of-door Lessons, Clay and Sand-
modelling and Map-drawing are full of interesting information else-
where unpublished.
The most striking part of the work is devoted to the discussion of
the time-worn traditions that still cumber many even of the most re-
cent text-books. The facts given concerning volcanoes, storms,
deserts, sea-depths, ocean-currents, glaciers, etc., etc., have never be-
fore found their way into modern school-books, and will be a surprise
to most teachers. It is full of useful hints to teachers, and of bright,
interesting information for the general reader.
Alex. E. Frye, Author of " Frye's
Geographies : " I consider it a very valua
ble contribution to geographical literature.
It should be in the hands of all progress-
ive teachers. Its Hints to Teachers are
invaluable ; while its chapters on Modern
Facts and Ancient Fancies will be a
revelation to many.
The work is stimulating, logical and
practical ; and reflects much credit upon
the scholarly attainments of its author.
J. M. Greenwood, Supt. of Pub.
Instruction , Kansas City, Mo. : One of
the most suggestive hand-books for
teachers I have ever read. I will recom-
mend it to our teachers.
J. P. Welch, recently Inst, in State
Normal School, West Chester, Pa. : I
read it with much pleasure and profit, and
was not surprised at its excellence, be-
cause I know the author to be the best in-
formed man, on that subject, that I ever
knew,
Miss B. M. Reed, Prin. Springfield
Training School, Mass. : I think it will
be cordially received by teachers. It is
very suggestive and covers ground that
must have required a lifetime, nearly, to
become acquainted with.
Wisconsin Journal of Educa-
tion : It helps where help is most needed,
in effecting a change from mechanical to
rational teaching of geography. It is not
a dull manual of directions, but an inter-
esting and suggestive treatment of modern
pedagogical views in geography. We
venture to affirm that teachers of geog-
raphy will find in it much that is new to
them, and plans of work, with practical
discussions of ways and means for realiz-
ing them, which if followed will make ele-
mentary geography a new branch to them
and their pupils. The book is thus a man-
ual of methods and matter, the sort of a
book which a good geography teacher
will want always at hand until familiar
with every paragraph in it.
174
GEOGRAPHY.
The Reproduction of Geographical Forms.
I. Sand and Clay-Modelling with Reference to Geographical Forms. II. Map-
Drawing and Map Projection. By JACQUES W. Redway, author of " A Man-
ual of Geography." Illustrated. Paper, 84 pages. Retail price, 30 cents.
THE object of this pamphlet is to group the various forms and outlines
of relief into types. The pupil is taught to classify the various
types of relief and earth-sculpture, and to reproduce them in sand or
in clay, either from pictures or photographs, or from a study of the
form as it occurs in nature. By this method the modelling of geo-
graphical forms becomes a science instead of an aimless expenditure of
energy. In the chapter on Map-projection the pupil is taught not only
how to draw a map, but also how to project it as well. A number of
easy projections, requiring no more elaborate apparatus than a pair
of dividers and a straight-edge, are plotted for the practical use of the
pupil. The very important question of how to read and interpret a map
is also discussed.
Schoolmaster, London, Eng. :
This book is full of practical suggestions.
We have nowhere seen collected so many
hints as to the best methods of modelling
in sand and clay, and of utilizing out-
door lessons in acquiring the essential
facts and principles of geographical study.
We commend this work to our readers.
Educational Journal of Va. :
This is emphatically a working book, and
we have seen nothing which so fully ac-
cords with our ideas on the subjects
treated.
Wisconsin Journal of Educa-
tion : The single chapter on out-of door
lessons is full of suggestions which would
enable any intelligent teacher to substi-
tute something better for the text-book
memorizing now so common. There are
few teachers who would not learn much
from this little manual.
Iowa Nor. Monthly ; Teachers in
primary as well as in grammar grades will
find this little book very helpful. The
cuts are such as will enable the teacher to
fully understand the work in hand.
Intermediate Outline Map /£ United States.
For Historical and Geographical Study. Prepared by William A. Mowry,
Editor of " Education " and *' Common School." 28 x 40 inches. Price, each
30 cents ; per set of four, #1.00.
WITH this map colored pencils should be used to fill in the history
as it occurred and as fast as the lessons develop the facts. For
a full course of U. S. history four maps should be used : (1) Discoveries
and explorations to 1763 ; (2) through the Revolution to 1783 ; (3) de-
velopment and growth to 1861 ; (4) the War of Secession.
GEOGRAPHY. 175
The Earth in Space ;
Or, a Fortnight in Astronomical Geography. By Edward P. Jackson, In-
structor in Science at the Boston Latin School. Illustrated. Cloth. So pages.
Retail price, 40 cents. Special price for class use.
TO many persons otherwise well informed, this subject is an ever-
perplexing mystery. Familiar with the topography, geology*
and political history of the world they inhabit, they know little of it
as a unit, in its relation to other worlds. This book presents, in a
few simple lessons, the main features of this important branch of
Geography. It is adapted to grammar and intermediate schools.
The following is the Table of Contents : How we know that the
earth is spherical ; How we know that the earth is flattened at the
poles; Latitude and Longitude ; Zones; Dimensions and Distances:
How we know these ; Gradual changes in light and heat during the
day and the year ; How we know that the earth rotates ; Apparent
daily motion of the heavens ; How we know that the earth revolves :
The inclination of the axis ; The sun's declinations ; The change of
seasons ; The variation in the length of day and night ; Appendix.
Boston School Board, June 11,
I89 : Ordered, that Jackson's Manual of
Astronomical Geography be authorized
C. F. King, Master of Dearborn
School, Boston : I consider it a most valu-
able treatise on the subject. I have been
looking for years for such a book.
J. M. Sawin, Master of Grammar
School, Providence : Delighted with it.
I have never read anything on the subject
so short, simple, and interesting.
for use as supplementary reading for the
Grammar Schools, one set of sixty copies
to be supplied to each of the Schools.
The Epoch : There is about as much
solid meat packed into this little volume
as could be put into such small space.
Outline Maps to accompany Sheldon s Amer-
ican History. Printed in black outline on bond paper. Price, 2 cents each;
$1.50 per hundred.
THESE six outline maps include the following: The World on
Mercator's projection, North America, the United States west to
Santa Fe, west to the Mississippi, west from the Mississippi, and the
Southern and Middle States for use in studying the Civil War.
This series of maps is of great service when used in connection with
any text-book on American History.
176
GEOGRAPHY.
Picturesque Geography.
A set of 12 pictures, printed in oil colors, size, 15 x 20 inches. Price, per Set, in
Sheets, with 24 pages of letterpress description, #3.00. Mounted on Boards, per
Set, #5.00.
INTENDED primarily to picture to the beginner the natural divi-
sions of land and water, which are usually named in abstract defini-
tions, and at the same time to meet the modern demand for artistic and
instructive pictures for decoration of school walls.
These pictures are produced in the finest style of chromo-litho
graphy. They consist of twelve beautiful landscapes from Nature,
selected for their prominent geographical features.
The series consists of :
1. River and Valley.
7-
2. Roads and Railways.
8.
3. Hills, Plain and Con-
9-
fluence of Rivers.
10.
4. Mountain-Pass and Torrent.
11.
5. Glacier.
12.
6. Lake.
Cliffs and Cape.
Strait.
Islands.
Isthmus, Peninsula, and Haven.
Coral Islands and Reef.
Volcano and Gulf.
W. T. Harris, U. S. ComW of Ed-
ucation, Washington, D. C. : It gives me
great pleasure to commend the new Pictur-
esque Geography. It is calculated to be
of real service in teaching the child the
concrete meaning of technical terms used
in Geography.
Olive Adele Evers, Prin. of
Teachers' Training Class, Minneapolis,
Minn. : I am delighted with the pictures,
and can make good use of them.
Journal of Education, Boston :
By far the finest presentation of natu-
ral formations and scenic characteris-
tics of the various countries that has yet
appeared.
National Schoolmaster, London :
The artistic beauty of these pictures ex-
ceeds anything we have previously seen
for school use.
Mrs. Louisa Parsons Hopkins,
late Supervisor, Boston, Mass.: I think
it altogether the best set of illustrative
plates of the kind I could find, and have
urged very strongly that a set should be
furnished to every Primary School. I
hope the time will come when sufficient
progress in method will be reached to in-
sure the introduction of the series of Pic-
turesque Geography as a part of the fur-
nishing of every first class in the Primarv
Schools.
Educational Times, London :
They will supply the mind with images
more definite and lasting than those
gained from books alone.
Tablet, London: The subjects chosen,
as well as the artistic excellence in execu-
tion, are well calculated to fix Geography
on the mind.
READING.
Badlands Suggestive Lessons in Language and Reading. A manual for prt-
mary teachers. Plain and practical; being a transcript of work actually done in the
school-room. $1.50.
Badlam's Stepping-Stones to Reading.— A Primer. Supplements the a83-page
book above. Boards. 30 cts.
Badlam's First Reader. New and valuable word-building exercises, designed to follow
the above. Boards. 35 cts.
Bass's Nature Stories for Young Readers: Plant Life, intended to supple-
ment the first and second reading-books. Boards. 30 cts.
Bass's Nature Stories for Young Readers: Animal Life. Gives lessons on
animals and their habits. To follow second reader. Boards. 40 cts.
Firth'S Stories Of Old Greece. Contains 17 Greek myths adapted for reading in
intermediate grades. Illustrated. Boards. 35 cts.
Fuller's Illustrated Primer. Presents the word-method in a very attractive form to
the youngest readers. Boards. 30 cts.
Hall's HOW tO Teach Reading. Treats the important question: what children should
and should not read. Paper. 25 cts.
Miller's My Saturday Bird Class. Designed for use as a supplementary reader in
lower grades or as a text-book of elementary ornithology. Boards. 30 cts.
Norton's Heart Of Oak BOOkS. This series is of material from the standard imagin-
ative literature of the English language. It draws freely upon the treasury of favorite
stories, poems, and songs with wnich every child should become familiar, and which
have done most to stimulate the fancy and direct the sentiment of the best men and
women of the English-speaking race. Book I, 100 pages, 25 cts. ; Book II, 142 pages,
35 cts. ; Book III, 265 pages, 45 cts. ; Book IV, 303 pages, 55 cts. \ Book V, 359 pages,
65 cts. ; Book VI, 367 pages, 75 cts.
Penniman'S School Poetry BOOk. Gives 73 of the best short poems in the English
language. Boards. 35 cts.
Smith's Reading and Speaking. Familiar Talks to those who would speak well in
public 80 cts.
Spear's Leaves and Flowers. Designed for supplementary reading in lower grades
or as a text-book of elementary botany. Boards. 30 cts.
Ventura's MantegaZZa'S Testa. A book to help boys toward a complete self-develop-
ment. $1.00.
Wright's Nature Reader, NO. I. Describes crabs, wasps, spiders, bees, and some
univalve mollusks. Boards. 30 cts.
Wright's Nature Reader, NO. II. Describes ants, flies, earth-worms, beetles, bar-
nacles and star-fish. Boards. 40 cts.
Wright's Nature Reader, NO. III. Has lessons in plant-life, grasshoppers, butter
flies, and birds. Boards. 60 cts.
Wright's Nature Reader, NO. IV. Has lessons in geology, astronomy, world-life,
etc. Boards. 70 cts.
For advanced supplementary reading see our list 0/ books in English Literature.
D. C. HEATH & CO., PUBLISHERS,
BOSTON NEW YORK, CHICAGO.
English language.
Hyde's LeSSOns in English, Book I. For the lower grades. Contains exercises for
reproduction, picture lessons, letter writing, uses of parts of speech, etc. 40 cts.
Hyde's LeSSOns in English, Book II. For grammar schools. Has enough techni-
cal grammar for correct use of language. 60 cts.
Hyde's Lessons in English, Book II with Supplement. Has, in addition to
the above, 118 pages of technical grammar. 70 cts.
Supplement bound alone, 35 cts.
Hyde's Practical English Grammar. For advanced classes in grammar schools and
for high schools. 60 cts.
Hyde's Lessons in English, Book II with Practical Grammar. The Practical
Grammar and Book II bound together. 80 cts.
Hyde's Derivation of Words. 15 cts.
Penniman's Common Words Difficult to Spell. Graded lists of common words
often misspelled. Boards. 25 cts.
Penniman's Prose Dictation Exercises. Short extracts from the best authors.
boards. 30 cts.
Spalding's Problem of Elementary Composition. Suggestions for its solution.
Cloth. 45 cts.
Mathews's Outline of English Grammar, with Selections for Practice.
The application of principles is made through composition of original sentences. 80 cts.
Buckbee's Primary Word Book. Embraces thorough drills in articulation and in the
primary difficulties of spelling and sound. 30 cts.
Sever'S Progressive Speller. For use in advanced primary, intermediate, and gram,
mar grades. Gives spelling, pronunciation, definition, and use of words. 30 cts.
Badlam's Suggestive Lessons in Language. Being Part I and Appendix of
Suggestive Lessons in Language and Reading. 50 cts.
Smith's Studies in Nature, and Language Lessons. A combination of object
lessons with language work. 50 cts. Part I bound separately, 25 cts.
MeiklejOhn'S English Language. Treats salient features with a master's skill and
with the utmost clearness and simplicity. $1.30.
Meikle John's English Grammar. Also composition, versification, paraphrasing, eta.
For high schools and colleges, qo cts.
Meiklejohn's History of the English Language. 78 pages. Part ill of Eng-
lish Language above, 35 cts.
Williams's Composition and Rhetoric by Practice. For high school and col-
lege. Combines the smallest amount of theory with an abundance of practice. Revised
edition. $1.00.
Strang's Exercises in English. Examples in Syntax, Accidence, and Style for
criticism and correction. 50 cts.
Huffcutt's English in the Preparatory School. Presents advanced methods
of teaching English grammar and compositon in the secondary schools. 25 cts.
Woodward's Study Of English. From primary school to college. 25 cts.
Genung'S Study Of Rhetoric. Shows the most practical discipline. 25 cts.
See also our list of books for the study of English 'Literature*
D. C. HEATH & CO., PUBLISHERS,
BOSTON. NEW YORK. CHICAGO.
UNIVERSITY OF CALIFORNIA LIBRARY
BERKELEY
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