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difference between 75 and 43. From an inspection of these examples, it will be seen that Subtraction is, in effect, the separating of the minuend into two parts, one of which is the subtrahend, and the other the remainder. Hence, to show the correctness of the operation, we have only to recompose the minuend by adding together the subtrahend and remainder.

96. 3. A person owed 727 dollars, of which he paid 542 dollars; how much remains unpaid?

727 dolls.
542 dolls.

Here we take 2 from 7, and write the difference, 5, below the line in the place of units. We now proceed to the tens, but find we cannot take 4 tens from 2 tens. We may, however, separate 7 hundreds into two parts, Ans. 185 dolls. one of which shall be 6 hundred, and the other 1 hundred, or 10 tens, and this 10 we can join with the 2, making 12 tens. From the 12 we now subtract the 4, and write the remainder, 8, at the left hand of the 5, in the ten's place. Proceeding to the hundreds, we must remember that 1 unit of the upper figure of this order has already been borrowed and disposed of; we must therefore call the 7 a 6, and then taking 5 from 6, there will remain 1, which being written down in the place of hundreds, we find that 185 dollars remain unpaid.

4. A boy having 12 chesnuts, gave away 7 of them; how many had he left?

12

7

5 Ans.

Here we cannot take 7 units from 2 units; we must therefore take the 1 ten=10 units, with the 2, making 12 units; then 7 from 12 leaves 5 for the answer.

97. 5. A man has debts due him to the amount of 406 dollars, and he owes 178 dollars; what is the balance in his favour?

406 178 228

Here we cannot take 8 units from 6 units; we must therefore borrow 10 units from the 400, denoted by the figure 4, which leaves 390. Now joining the ten we borrowed with 6, we have the minuend, 406, divided into two parts, which are 390 and 16. Taking 8 from 16, the remainder is 8; and then we have 390, or 39 tens in the upper line, from which to take 170, or 17 tens. Thus the place of the cipher is eccupied by a 9, and the significant figure 1 is diminished by 1, making it 3. We then say, 7 from 9 there remains 2, which we write in the place of tens, and proceeding to the next place, say 1 from 3 there remains 2. Thus we find the balance to be 228 dollars.

SIMPLE SUBTRACTION.

98. Simple Subtraction is the taking of one simple number from another, so as to find the difference between them. 'The greater of the given numbers is called the minuend, the less the subtrahend, and the difference between them the remainder.

RULE.

99. Write the least number under the greater, with units under units, and tens under tens, and so on, and draw a line below. Beginning at the right hand, take each figure of the subtrahend from the figure standing over it in the minuend, and write the remainders in their order below. If the figure

100.

SIMPLE SUBTRACTION.

15

in the lower line be greater than the figure standing over it, suppose ten to be added to the upper figure, and the next significant figure in the upper line to be diminished by 1, (96) regarding ciphers, if any come between, as 9s,(97); or, which gives the same result, suppose 10 to be added to the upper figure, and the next figure in the lower line to be increased by 1, with which proceed as before, and so on till the whole is finished.

PROOF.

100. Add together the remainder and the subtrahend, and if the work be right, their sum will equal the minuend.

QUESTIONS FOR PRACTICE.

6. In 1810, Montpelier con- | 12. What number is that tained 1877 inhabitants, and which taken from 365, leaves in 1820, 2308 inhabitants; 159? Ans. 206. what was the increase, and in what time?

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8. A man deposited 9000 dollars in a bank, of which he took out 112 dollars; how much remains in the bank?

Ans. 8888 dolls.

9. If a man sell 29 out of a flock of 76 sheep, how many will there be left? Ans. 47.

10. Sir Isaac Newton was porn in the year 1642, and died in 1727; how old was he when he died? Ans. 85 years.

11. If you lend a neighbor 765 dollars, and he pay you at one time, 86 dollars, and at another 125 dollars,how much is still due? Ans. 554 dolls.

13. Supposing a man to have been born in 1796, how old was he in 1828?

Ans. 32 years.

14. If a man have 125 head of cattle, how many will he have after selling 8 oxen, 11 Cows, 9 steers and 13 heifers? Ans. 84.

15. What number is that to which if you add 643, it will become 1826? Ans. 1183.

16. How many years from the flight of Mahomet in 622, to the year 1828? Ans. 1206.

17. America was discovered by Columbus in 1492; how many years since?

18. If you lend 3646 dollars and receive in payment 2998 dollars, how much is still due? Ans. 648 dolls.

19. A owed B $4850, of which he paid at one time $200, at another, $475, at an other $40, at another $1200,

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101. 1. Divide 24 apples equally among 6 boys, how many wil each receive?

The most simple way of doing this would be, first to give each boy 1 apple, then each boy 1 apple more, and so on, till the whole were distribsted, and the number of I's, which each received, would denote his share of the apples, which would in this case be 4. Or as it would take 6 apples to give each boy one, each boy's share will evidently contain as many apples as there are sixes in 24. Now this may be ascertained by subtracting 6 from 24, as many times as it can be done, and the number of subtractions will be the number of times 6 is contained in 24; thus, 24

6=18, 18-6=12, 6-12=6, and 6-6=0. Here we find that by performing 4 subtractions of 6, the 24 is completely exhausted, which shows that 24 contains 6 just 4 times. Now as Subtraction is the reverse of Addition, 94) it is evident that the addition of 4 sixes, (6-+6+6+6=24) must recompose the number, which we have separated by the subtraction of 4 sixes. But when the numbers to be added are all equal, Addition becomes Multiplication, (83) and 24 is therefors the product of 4 and 6, (4X6=24). A number to be divided, and which is called a dividend, is then to be regarded as the product of two factors, one of which, called the divisor, is given to find the other, called the quotient; and the inquiry how many times one number is contained in another, as 6 in 24, is the same as how many times the one will make the other, as how many times 6 will make 24, and both must receive the same answer, viz. 4. Heace to prove Division, we multiply the divisor and quotient together, and if the work be right, the product will equal the dividend.

2. How many yards of cloth will 63 dollars buy, at 9 dollars a yard!

102, 103.

DIVISION.

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102. When the dividend does not exceed 100, nor the divisor exceed 10, the whole operation may be performed at once in the mind: but when either of them is greater than this, it will be found most convenient to write down the numbers before performing the operation.

3. Divide 552 dollars equally between 2 men, how many dollars will each have?

-2)552

400-200 140- -70 12- -6

552-276

Divis. Divid.Quot. 2)552 (276

4

15

2

552

Here we cannot say at once how many times 2 is contained in 552, we therefore write down the dividend, 552, and place the divisor, 2, at the left hand. We then proceed to separate the dividend into such parts as may readily be divided by 2. These parts we find to be 400, 140, and 12. Now 2 is contained in 4, 2 times, and therefore in 400, 200 times; 2 in 14, 7 times, and in 140, 70 times, and 2 in 12, 6 times; and since these partial dividends, 400+140+-12-552, the whole dividend, the partial quotients, 20070+6=276, the whole quotient, or whole number of times 2 is contained in 552. But in practice we separate the dividend into parts no faster than we proceed in the division. Having written down the dividend and divisor..as before, we first seek how many times 2 in 5, and find it to be completely contained in it only 2 times. We therefore write 2 for the highest figure of the quotient, which, since the 5 is 500, is evidently 200; but we leave the place of tens and units blank to receive those parts of the quotient which shall be found by dividing the remaining part of the dividend. We now multiply the divisor 2, by the 2 in the quotient, and write the product, 4, (400) under the 5 hundred in the dividend. We have thus found that 400 contains 2, 200 times, and by subtracting 4 from 5, we find that there are 1 hundred, 5 tens, and 2 units, remaining to be divided. We next bring down the tens of the dividend, by the side of the 1 hundred, making 15 tens, and find 2 in 15, 7 times. But as 15 are so many tens; the 7 must be tens also, and must occupy the place next below hundreds in the quotient. We now multiply the diviser by 7, and write the product, 14, under the 15. Thus we find that 2 is contained in 15 tens 70 times, and subtracting 14 from 15, find that I ten remains, to which we bring down the 2 units of the dividend, making 12, which contains 2, 6 times; which 6 we write in the unit's place of the quotient, and multiplying the divisor by it, find the product to be 12. Thus have we completely exhausted the dividend, and obtained 276 for the quotient as before,

14 proof.

(12

12

103. 4. A prize of 3349 dollars was shared equally among 16 men, how many dollars did each man receive?

32

149 144

We write down the numbers as before, and find 16 16)3349 2095 Ans. in 32, 2 times, we write 2 in the quotient, multiply the divisor by it, and place the product, 32, under 33, the part of the dividend used, and subtracting, find the remainder to be 1, which is 1 hundred. To the 1 we bring down the 4 tens, making 14 tens; but as this is less than the divisor, there can be no tens in the quotient. We therefore put a cipher in the ten's place in the quotient, and bring down the 9 units of the dividend to the 14 tens, making 149 units, which contain 16 somewhat more than 9

5

times. Placing 9 in the unit's place of the quotient, and multiplying the divisor by it, the product is 444, which, subtracted from 149, leaves a remainder of 5. The division of these 5 dollars may be denoted by writing the 5 over 16, with a line between, as in the example. Each man's share then will be 209 dollars and 5 sixteenths of a dollar.(21) The division of any number by another may be denoted by writing the dividend over the divisor, with a line between, and an expression of that kind called a Vulgar Fraction.

104. 5. A certain cornfield contains 2688 bills of corn planted in rows, which are 56 hills long, how many rows are there?

but

Here, as 56 is not contained in 26, it is necessary to take 56) 2688(48 three figures, or 263, for the first partial dividend: 224

448
448

there may be some difficulty in finding how many times the divisor may be had in it. It will, however, soon be seen by inspection, that it cannot be less than 4 times, and by making trial of 4, we find that we cannot have a larger number than that in the ten's place of the quotient, because the remainder, 44, is less than 56, the divisor. In multiplying the divisor by the quotient figure, if the product be greater than the part of the dividend used, the quotient figure is too great; and in subtracting this product, if the remainder exceed the divisor, the quotient figure is too small; and in each case the operation must be repeated until the right figure be found.

SIMPLE DIVISION.

DEFINITIONS.

105. Simple Division is the method of finding how many times one simple number is contained in another; or, of sepa rating a simple number into a proposed number of equal parts. The number which is to be divided, is called the dividend; the number by which the dividend is to be divided, is called the divisor; and the number of times the divisor is contained in the dividend, is called the quotient. If there be any thing left after performing the operation, that excess is called the remainder, and is always less than the divisor, and of the same kind as the dividend.

RULE.

106. Write the divisor at the left hand of the dividend; find how many times it is contained in as many of the left hand figures of the dividend, as will contain it once, and not more than nine times, and write the result for the highest figure of the quotient. Multiply the divisor by the quotient figure, and set the product under the part of the dividend used, and subtract it therefrom. Bring down the next figure of the dividend to the right of the remainder, and divide this number as before; and so on till the whole is finished.

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