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Entered, according to Act of Congress, in the year 1849, by s

TEMPERANCE C. Colburn, Widow of Warren Colburn,
In the Clerk's Office of the District Court of the District of Massachusetts.

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THE character of Colburn's First Lcssons is too widely and thoroughly known to make it necessary to give, in this edition, any extended statement of its principles and method. Ideas which were new at the first publication of this work have now, through the “great change” that has taken place in elementary instruction in Arithmetic, through its influence, become the common possession of all intelligent teachers.

The careful revision of the work which has now been made has suggested very few points in which any change seemed to be required. It has been thought that a more easy and gradual introduction would render the work more useful to the most youthful beginners.”

The use of the book with beginners demands of the teacher considerable labor in the way of proposing original questions, and devising modes of illustration; and a short course of Introductory Lessons is prefixed, which the teacher may use as materials and hints in the first steps of the study.

* In the city of Lowell, where this book has been used from its first pubsication, the School Committee passed a vote in December, 1846, excluding all other Arithmetics in their Primary Schools; thus showing, in the opinion of intelligent men who acted upon their experience, that Colburn's Birst Lessons is sufficiently easy for the most juvenile scholar

CAJORI

ADVERTISEMENT TO THE REVISED EDITION.

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INTRODUCTION.

Tan first instructions given to the child in Arithmetic are usually given on the supposition that the child is already able to count. This indeed seems a sufficiently low requisition; and if children were taught to count at home in a proper manner, they would have this power in a sufficient degree when they enter the primary school. But it will be found on trial that most children, when they begin to go to school, do not know well how to count. This may be proved by requiring them to count 20 beans or kernels of corn. Few of them will do it without mistake. The difficulty is they have been taught to repeat the numerical names, one, two, three, in order, without attaching ideas to them. They learn to count without counting things. This point then calls for the teacher's first attention — to lead the child to apprehend the meaning of each numerical word by using it in connection with objects.

The kind of objects to be employed as counters should of course be similar, as marks on the blackboard, beaos, pieces of wood, or of cork, or the balls in a numeration frame. Provided they are similar, and large enough to be seen without effort by all the class, it is of little consequence what they are; the simpler the better, and those which the teacher devises or makes will, other things being equal, be best of all.” Not more than ten should be used or exhibited to the children in the first few lessons.

LESSON I.

Let the class have their attention called to the teacher; and when he lays down a counter, when all can see it, let them say one; let the teacher lay down another, and the class say two; and so on up to ten. If any of the olas become inattentive, let the teacher stop at once; and, after the attentionis fully centred on him, let him begin again.

*The Numeration Frame should have ten balls on a bar. Three bars will be sufficient for all the necessary illustrations. It is sometimes proto employ a Frame with only nine balls on a bar: the use of such a e, however, would be a greaterror in the First Lessons of Mental Arithmetis. The Frame with nine balls is designed to illustrate the idea of local Walue in the decimal notation, and has as many balls as there are significant figures. But Mental Arithmetic begins with the numerical words, and Muires for its illustration on a Frame as many balls as there are simple Somerical words. These are the first ten, those above being compound. #leven is formed of two obsolete words, signifying, one and ten; so twelve to a compound of two words, signifying two and ten. The names above thoe, thirteen, fourteen, &c., sufficiently indicate of themselves the simp.” words of which they are formed.

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Alter going through this addition a few times in this form, it may be varied thus. The teacher laying down the counters, one by one, as before, the class may be led to say, one and one are two, two ed one are three three and one are four, &o.

The above mode of adding may be shortened by leading the class to say as follows: One and one are two, and one are three, and one are four, &o.

At any time the word designating the counter may be used along with the number, as beans, balls, pieces, marks, or books, as the case may be.

At times it will be well to give some fictitious designation to the counters, such as the teacher, or still better such as some one of the class, may choose, calling them men, sheep, horses, &c.

Next to Addition, as illustrated above, should come Subtraction. Bay. Ing counted ten, let the teacher take away one, and the class be made to say, one from ten leaves nine one from nine leaves eight, &o. In Subtraction the same variations may be introduced as in Addition. No further Mustrations of this operation need be given, as the teacher's discretion wid supply all that is necessary.

In connection with these exercises, let the pupil be taught to repeat in re versed order the numerical words they have employed, counting from on up to ten, and then in reverse order from ten to one.

“It is not to be supposed that the whole of the foregoing lesson can be learned at one exercise. It is only & small part of it that children will first havo suficient power of attention to go over with profit. The sange remark may be made respecting the following Introductory Lessone.

LESSON II.

Lot the teacher call the attention of the class, and require them to count, and then lay down, one by one, a small number of counters, say, for ex. Amplo, five; then let him separate them into two parts, as one and four, thus,

•, and say, “ one and four are fwe,” and require the class to say the same. Then let him divide the number into different parts, ed two and three, three and two, four and one, wae and one and three, &c., roquiring the class with each division to name the parts and make the addi. tion. Let them always begin at the left end of the line of counters as they face them. Having exhausted the combinations of five, let the number six be tažen, giving combinations like the following:

; &o.

It may be found that a lower number than five should be made the first stop in this exercise.

Áfter the combinations of six have been exhausted, the number sevse may be taken, and then successively, eight, nine, and ten.

As a part of this Lesson, each question in addition should be converted into a question in subtraction ; thus, five and three are eight; then, having put the two parts together which make eight, remove the three, and lead The class to say, “three from eight leaves five."

The following exercise is important in this connection. Let the teacher select some number, and give one part of it, and roquire the class an qulck as possible to name the complementary part. Than let six be the number, the oxercise will be as follows. Teacher. “Now attond, six is the number I am going to name one part of it; when you hear me name it, do you al bame the other part as quick as you can; now be ready; five.". Class a

Teacher: "" Forer. » Glass « Thoo." - Teacher : « Thros. Oleh : "Threo."-Toncher : « Ome.Class : " Fime,” &c

* One."

This exercise should not be pressed too fast, but carried on gradually as the pupil's strength of mind will allow. Special pains should be taken that the number ten be perfectly mastered in this form of combining its parts This will give the pupil the most important aid in all his calculations in larger numbers.

LESSON III.

For a number of days after beginning the above exercises, the child should not have the book at all in his hands. If the child has the book in his pogsession, it will be well for the teacher to take it for a few days, and let the pupil employ himself at his seat in writing on a slate, or with other books. In this way the child has awakened within him the idea of calculation in numbers, without having become wearied with the reading of what excites no interest. After a few days, however, the book may be put into the pupil's hands, and he may be directed to get a lesson in Section I. In the meanwhile the Introductory Lessons should be continued, and form a part of each day's exercise till they are finished. In this way, the pupil, in studying his first lesson from the book, will already have learned the use of counters, and will naturally resort to them at his seat, using beans or marks on his slate for this purpose. It will be far better for him to come to the use of counters in this natural way, than to be enjoined to use them before he has been interested in witnessing their application. The pupil, in the preceding lessons, has become acquainted with all the numbers as far as ten, regarding them either as units, or as grouped into parts of a larger whole. The next step is to carry him through the numbers from ten to twenty. First let the class count with the objects before them from one up to twenty; then, removing all but ten, let the ten be grouped in a pile; or, if they are marks on the board, let them be enclosed by a line drawn around them, and begin to count upward from ten. “One and ten are eleven; two and ten are twelve; three and ten are thirteen; ”—here pause, and examine the composition of the word, thirteen—three ten, or three and ten. Show how the three is spelt in thirteen, and also how the ten is spelt. Then proceed, “four and ten are fourteen,” examining the word as in the former case; “five and ten are fifteen; six and ten are,”—perhaps some one in the class will now be able to give the compound word; then go on, “seven and ten, eight and ten, mine and ten, ten and ten.” When they can give the compound words readily from the simple ones, then give them the compound word, and let the class separate it into its two component words; thus: Teacher: “Seventeen.” Class: “Seven and ten,” &c. Thus far let the teacher be careful to present the name of the smaller of the two numbers first, for that is the order in which the compound word presents them; let the teacher say four and ten, and not ten and four. After the class have caught the analogy between the simple words and the compounds which they form, so that one instantly suggests to them the other, then the order of the words may be changed, and the ten put first. The caution here suggested may seem to some unnecessary; into erral observation of the mental habits or children will noon, i think, to show its importance. ... In the analysis of the compound words from ten to twenty, eleven and twelve should be omitted till the last; for, as the simple words of which they are formed are disguised or obsolete, they tend to obscure rather than eluoldate the subject to the mind of a child. Having obtained the idea through *worlain the series, he may take the statement respecting these on St.

LESSON IV.

Having counted twenty, and grouped the number in two tens, let the class count ten more, making in all thirty, or three tens. Keeping the tens separate, let the class count ten more, making forty, or four tens. Let the class then answer such questions as the following: —Twenty are how many

tens? Thirty are how many tens? Forty are how many tens? Four tens

are lo; number? Three tens are what number? Two tens are what
number? "
After this, they may proceed with the higher multiples of ten, fifty,
sixty, seventy, eighty, ninety, a hundred.
Through the whole of this exercise, each multiple of ten should be pre-
sented in groups of ten, so as to aid the idea by the visible representation.
The pupils should be led to see the significancy of each numerical name;
that thirty-seven, for example, means three tens and seven; fifty-siz means
five tens and six.
In this way the pupils may be led to understand the Decimal Ratio at
this early stage, and no further trouble need be taken in that direction.
When, in a later stage of study, he comes to the Decimal notation in written
Arithmetic, he will find it only a natural mode of expressing ideas already
rendered familiar in practice.

LESSON V.

Let the teacher stand at the board, and call the attention of the class to what he shall write; then, making two marks, ask, “How many marks on the board?” When the class have answered, let the teacher write two more, and ask, “How many now?” and so on to the number of twelve or more. Then take a writing book or sheet of paper, and covering all but two of the marks, let the glass re§: the same process while the teacher removes the k, so as to bring two more into view at each remove; the numbers read by the class being two, four, six, eight, ten, &c. Then let the process be reversed, subtracting two successively, which gives, beginning with sixteen, the following, — sixteen, fourteen, twelve, ten, &c. Again the teacher may say to the class, “When I made those marks how many did I make at a time?” Class: “Two.” – Teacher: “Did o make two more than once f * Class: “Yes, sir, a good many times.” Then the teacher, covering up all but two: “Now look, how many times two are there?” Class: “Once.” Teacher: “Once two are how many?” Then, after the class have answered, showing two more, “How many times two do you see?” “Twice two are how many?” Then go on in the same way with three twos, four twos, &c., to the end. At this point the pupils may be taught the distinction between even and odd numbers, and be trained to repeat, rapidly the even numbers, from two up to twenty. The pupils may derive important aidin adding and multiplying, by group. ing the numerical names with the voice, in something like the following manner. Teacher: “Listen now to me; one, two three, four five, six. How many twos did I count?” Class: “Three twos.” Teacher: “Count three twos just as I did.” Then let the teacher ask, “Three times two are

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