| Edward Brooks - 1877 - 444 σελίδες
...final remainder, annex it, with the divisor written beneath, to the integral part of the quotient. Proof. — Multiply the quotient by the divisor, and add the remainder, if any, to the product ; if the work is correct, the result will equal the dividend. NOTE. — In practice... | |
| Edward Brooks - 1877 - 438 σελίδες
...a final remainder, annex it with the divisor written beneath, to the integral part of the quotient. Proof. — Multiply the quotient by the divisor, and add the remainder, if any, to the product ; if the work is correct, the result will equal the dividend. NOTE. — In practice... | |
| Edward Brooks - 1877 - 250 σελίδες
...final remainder, annex it, with the divisor written beneath, to the integral part of the quotient. Proof. — Multiply the quotient by the divisor, and add the remainder, if any, to the product ; if the work is correct, the result will equal the dividend. NOTE. — In practice... | |
| Levi N. Beebe - 1877 - 382 σελίδες
...which we divide is called the divisor.) Quotient. The number found by dividing is called the quotient. Proof. Multiply the quotient by the divisor, and add the remainder if there be one ; if the work is correct the result should equal the dividend. Divisor, 7)4321 Dividend.... | |
| Albert Newton Raub - 1877 - 348 σελίδες
...divisor, place a cipher in the quotient, annex the next figure of the dividend and proceed as before. PROOF. — Multiply the quotient by the divisor and add the remainder. If this result equals the dividend, the work is correct. 2. Divide 2709 by 7. 3. Divide 5024 by 8. 4.... | |
| Alexander Ingram - 1881 - 192 σελίδες
...that name, if any ; divide again to get the next part of the quotient, and so on to the lowest name. PROOF. Multiply the quotient by the divisor, and add the remainder, if any, to the product. Ex. Divide £4561, 15s. 9|d. by 87. ANS. £52, 8s. 8id. 87)£4561, 15s. 9|d.(£52,... | |
| Alexander Ingram - 1883 - 190 σελίδες
...that name, if any ; divide again to get the next part of the quotient, and so on to the lowest name. PROOF. Multiply the quotient by the divisor, and add the remainder, if any, to the product. Ex. Divide £4561, 15s. 9|d. by 87. ANS. £52, 8s. 8id. 87)£4561, 15s. 9|d.(£52,... | |
| Charles Austin Hobbs - 1889 - 366 σελίδες
...the multiplier, and if the work is correct, the result is the same as the multiplicand ; in Division multiply the quotient by the divisor and add the remainder, if any, and if the work is correct, the result is the same as- the dividend. 2. The fundamental operations can... | |
| Edward Brooks - 1895 - 424 σελίδες
...final remainder, annex it, with the divisor written beneath, to the integral part of the quotient. Proof. — Multiply the quotient by the divisor, and add the remainder, if any, to the product ; if the work is correct, the result will equal the dividend. In practice we need not... | |
| International Correspondence Schools - 1897 - 346 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 dividind quotient Thus, 63)4235(67... | |
| |