...which were cut oil- from the dividend. Examples. NOTE. To divide by 10, 100, 1000, Sec. ia to cut off as many figures from the right of the dividend as there are cyphers in the divisor. Thus, 1742 divided by 10 is 174T\ 1876 divided by 100 is 18TY<r 1st. Divide 6100000 by 610. 61,0)610000,0(10000...

...given divisor then, are 5 and 5. Thus, 5)9125 To Divide by 10, 100, 1000, 10000, &c. RULE. Cut off so many figures from the right of the dividend, as there are cyphers in the divisor ; — that part cut off from the dividend is the remainder, the other figures in the dividend are the...

...Hence iy.. To divide hy any namher whnst right hand figurei are ciphers; RULE.—Cut off the ciphers from the divisor, and as many figures from the right of the dividend; divide the remaining figures of the dividend hy the remaining figures of the divisor, and hring down...

...Hence, F IV. To divide by any number whose right hand figures are ciphers: RULE. — Cut off the ciphers from the divisor, and as many figures from the right of the dividend; divide the remaining figures of the dividend by the remaining figures of the divisdr, and bring down...

...from each, and then the work is done. So when you divide by 100, 1000, <kc. You have merely to cut off as many figures from the right of the dividend as there are ciphers in the divisor. The principle of this is very plain, for in Multiplication you proved that...

...di»id«d bv the lut divinor (8). aril gives MS 4.9. IV. To divide ly 10, 100, 1000, #e. RULE. Cut off as many figures from the right of the dividend, as there are ciphers in the divisor. The figures on the left of the point will be the quotient ; and those on the...

...Answer, each can have 2, and there will be 311 over. So when the divisor is 10, 100, Six., Cut off as many figures from the right of the dividend as there are G's in the divisor. The figures cut off are the remainder, the others the quotient. 9. Divide 599843...

...1748 by 18. Quo. 97, and 2 rem. Note 4th. — When the divisor is 10, 100, 1000, 10000, <kc. point off as many figures from the right of the dividend, as there are cyphers in the divisor ; the figures on the left of the point will be the quotient, and those on the right, the remainder....

...98400000 11789300 1782)6424700(3605 5346 10787 10692 9500 8910 590000 The rule then is : Strike out as many figures* from the right of the dividend as there are ciphers at the right of the divisor. Strike out all the ciphers from the divisor, and divide in the...

...? Ans. each one can have 2, and there will be 311 over. So when the divisor is 10, 100, &c. Out off as many figures from the right of the dividend as there are Os in the divisor. The figures cut off are the remainder, the others the quotient. Explain how example...