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20. Multiply 75432 by 47.

Ans. 3545304. 21. Multiply 76785316 by 7615. Ans. 584720181340. 22. Multiply 67853000 by 8765. Ans. 594731545000. 23. Multiply 38123450 by 31243. Ans. 1191090948350. 24. Multiply 40670007 by 10002. Ans. 406781410014. 25. Multiply 31235678 by 10203. · Ans. 318697622634. 26. Multiply 76786321 by 30070. Ans. 2308964672470. 27. Multiply 317160070 by 700500. Ans. 222170629035000. 28. Multiply 467325812 by 167000. Ans. 78043410604000. 29. Multiply 6176777 by 22222. Ans. 137260338494. 30. Multiply 123456789 by 987654321.

Ans. 121932631112635269. 31. Multiply 7060504 by 30204. Ans. 213255462816. 32. Multiply 6017853 by 800070. Ans. 4814703649710. 33. Multiply 5000700 by 530071. Ans. 2650726049700. 34. Multiply 88888 by 4444.

Ans. 395018272. 35. Multiply 123000 by 78000.

Ans. 9594000000. 36. Multiply 7008005 by 10008.

Ans. 70136114040. 37. Multiply 4001100 by 40506. Ans. 162068556600. 38. Multiply 6716700 by 808070. Ans. 5427563769000. 39. Multiply 987648 by 481007. Ans. 475065601536. 40. Multiply 18711000 by 470.

Ans. 8794170000. 41. Multiply 10000 by 7000.

Ans. 70000000. 42. Multiply 101010101 by 2020202. Ans. 204060808060402. 43. Multiply 70000 by 10000.

Ans. 700000000. 44. Multiply 800008 by 9009.

Ans. 7207272072. 45. Multiply 900900 by 70070.

Ans. 63126063000. 46. Multiply 4807658 by 706007. Ans. 3394240201606. 47. Multiply 16789001 by 10080. Ans. 169233130080. 48. Multiply 304050607 by 3011101. Ans. 915527086788307. 49. Multiply 908007004 by 500123. Ans. 454115186861492. 50. Multiply 2003007001 by 6007023.

Ans. 12032109124168023. 51. Multiply 9000006 by 9000006. Ans. 81000108000036. 52. Multiply 1152921504606846976 by 1152921504606846976.

Ans. 1329227995784915872903807060280344576. 53. What will 27 oxen cost at 35 dollars each?

Ans. $ 945. 54. What will 365 acres of land cost at 73 dollars per acre ?

Ans. $ 26645. 55. What will 97 tons of iron cost at 57 dollars a ton ?

Ans. $ 5529. 56. What will 397 yards of cloth cost at 7 dollars per yard ?

Ans. $ 2779. 57. What will 569 hogsheads of molasses cost at 37 dollars per hogshead ?

Ans. $ 21053. 58. If a man travel 37 miles in one day, how far will he travel in 365 days ?

. Ans. 13505 miles. 59. If one quire of paper have 24 sheets, how many sheets are in a ream, which consists of 20 quires ? Ans. 480 sheets.

60. If a vessel sails 169 miles in one day, how far will she sail in 144 days?

Ans. 24336 miles. 61. What will 698 barrels of flour cost at 7 dollars a barrel ?

Ans. $ 4886. 62. What will 376 lbs. of sugar cost at 13 cents a pound ?

Ans. 4888 cts. 63. What will 97 lbs. of tea cost at 93 cents a pound ?

Ans. 9021 cts. 64. If a regiment of soldiers consists of 1128 men, how many men are there in an army of 53 regiments ?

Ans. 59784.

65. What will an ox weighing 569 pounds amount to at 8 cents a pound ?

Ans. 4552 cts. 66. If a barrel of cider can be bought for 93 cents, what will 75 barrels cost?

Ans. 6975 cts. 67. If in a certain factory 786 yards of cloth are made in one day, how many will be made in 313 days? Ans. 246018 yds.

68. A certain house contains 87 windows, and each window has 32 squares of glass; how many squares are there in the whole house?

Ans. 2784 squares. 69. There are 407 wagons each loaded with 30009 pounds of coal ; how many pounds are there in the whole ?

Ans. 12213663 pounds. 70. Multiply three hundred and seventy-five millions two hundred and ninety-six thousand three hundred and twenty-one, by seventy-nine thousand and twenty-four.

Ans. 29657416470704. 71. What would be the cost of 687 fothers of lead at 73 dol. lars a fother?

Ans. $ 50151.

SECTION V.
DIVISION.

The object of Division is to find how many times one number is contained in another.

Division consists of three principal parts; the Dividend, or number to be divided; the Divisor, or number by which we divide; and the Quotient, which shows how many times the dividend contains the divisor.

When the dividend contains the divisor an exact number of times, the quotient is expressed by a whole number. But when this is not the case, there will be a remainder, when the division has reached its limit, and this remainder placed above the divisor, with a horizontal line between them, will form a fraction, and should be written at the right hand of the quotient, and will be a part of it. See Example 2d, and note.

1. The Remainder may be considered a fourth term in Di. vision, and it will always be of the same denomination with the dividend.

For the sake of convenience, Division has been divided into two kinds, Long and Short.

2. All questions in which the divisor is not more than 12 may be conveniently performed by Short Division ; all others are better performed by Long Division.

SHORT DIVISION.

EXAMPLE 1. Divide 948 dollars equally among 4 men. Dividend.

ma In performing this question, inquire how Divisor 4)948

to many times 4, the divisor, is contained in 9,

which is 2 times, and 1 remaining ; write Quotient 237 the 2 under the 9 and suppose 1, the remainder, to be placed before the next figure of the dividend, 4, and the number will be 14. Then inquire how many times 4, the divisor, is contained in 14. It is found to be 3 times and 2 remaining. Write the 3 under the 4, and suppose the remainder, 2, to be placed before the next figure of the dividend, 8, and the number will be 28. Inquire again how many times 28 will contain the divisor. It is found to be 7 times, which we place under the 8. Thus we find each man receives 237 dollars.

From the above illustration, we deduce the following

RULE.

Write down the dividend and place the divisor on the left, with a curved or perpendicular line drawn between them. Draw also a horizontal line under the dividend, then observe how many times the divisor is contained in the first figure or figures of the dividend (beginning at the left hand), and place the quotient figure directly under the right-hand

figure of the part of the dividend that was taken. If there be no remainder, proceed to inquire how many times the divisor is contained in the next figure* of the dividend, and set down the result at the right hand of the quotient figure already obtained, or directly under the figure of the dividend, and continue the work in this manner until the whole dividend is divided. But if there be a remainder either in the first or any subsequent division, imagine the number denoting it to be placed directly before the next figure of the dividend, and ascertain the number of times the divisor is contained in the number thus formed, and place the

* If this figure be smaller than the divisor, it cannot contain it, and the figure to be placed in the quotient will be a cipher. Sometimes, as when we divide by 11 or 12, we may have two successive ciphers in the quotient, as when the divisor is 12 and the next two figures are l's or 1 and 0. We are then obliged to proceed to a third figure in the dividend, before we can effect a proper division.

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