 | International Correspondence Schools - 1897 - 672 σελίδες
...V. If there be a remainder at last, write it after the quotient '. with the divisor underneath. 61 . Proof. — Multiply the quotient by the divisor, and add the remainder, if there be any, to the product. The result will be the dividend. divisor dividend quotient Thus, 63)4235(67if... | |
 | 1897 - 366 σελίδες
...before. V. If there & a remainder at last, write it after tin quotient, with the divisor underneath. 61. Proof. — Multiply the quotient by the divisor and add the remainder, if there be any, to the product. The result will be the dividend. Thus, Proof, divisor dividend quotient... | |
 | International Correspondence Schools - 1899 - 650 σελίδες
...before. V. If there is at last a remainder, write it after the quotient, with the divisor underneath. 85. Proof. — Multiply the quotient by the divisor, and add the remainder, if any, to the product. The result will be the dividend. divisor dirid4.nd ql4otient Thus, 63)4235(67 \\ Ans.... | |
 | International Correspondence Schools - 1899 - 722 σελίδες
...V. If there be a remainder at last, write it after the quotient, with the divisor underneath. 61 . Proof. — Multiply the quotient by the divisor, and add the remainder, if there be any, to the product. The result will bt the dividend. divisor dividend quotient Thus, 68)4235(67i4... | |
 | 1900 - 532 σελίδες
...before. V. If there be at last a remainder, write it after the quotient, with the divisor underneath. 61. Proof. — Multiply the quotient by the divisor and add the remainder, if there be any, to the prodiiet. The result will be the dividend. Thus, divisor dividend quotient 63)4285(67... | |
 | International Correspondence Schools - 1900 - 720 σελίδες
...before. V. If there be a remainder at last, write it after the quotient, with the divisor underneath. 61. Proof. — Multiply the quotient by the divisor, and add the remainder, if there be any, to the product. The result will be the dividend. divisor dividend quotitnt Thus, 63)4285(67^... | |
 | International Correspondence Schools - 1900 - 614 σελίδες
...(e) If there be a remainder at last, write it after the quotient, with the divisor underneath. 61 . Proof. — Multiply the quotient by the divisor, and add the remainder, if there be any, to the product. The result will be the dividend. divisor dividend quotient Thus, 63)4235(67... | |
 | William Estabrook Chancellor - 1901 - 146 σελίδες
...Thus 5)10(2 shows that 10 divided by 5 equals 2. We sometimes indicate division by this form, 8)64. Proof. Multiply the quotient by the divisor and add the remainder, if any. If the result equals the dividend, the work is correct. 8)64 8 x 8 = 64 8)216 27 quotient 8 27 8 divisor... | |
 | William Estabrook Chancellor - 1901 - 154 σελίδες
...shows that 10 divided by 5 equals 2. We sometimes show by this form, 8)64, that division is desired. Proof. Multiply the quotient by the divisor and add the remainder, if any. If the result equals the dividend, the work is correct. 8)65 8 x 8 = 64 + 1 8)216 27 quotient ~~ 8... | |
 | International Correspondence Schools - 1901 - 630 σελίδες
...before. V. If there be at last a remainder, write it after the quotient, with the divisor underneath. 61. Proof. — Multiply the quotient by the divisor and add the remainder, if there be any, to the product. The result will be the dividend. Thus, divisor dividend quotient 6 3... | |
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IV. If any partial dividend will not contain the divisor, write a cipher in the quotient, annex the next figure of the dividend, and proceed as before. 
