...by 672. 1242 Quotient + 552 Remainder. 672 1 835170 Dividend. 672 i fi'^i ..„.. In this example, the dividend does not contain the divisor an exact number of times, hence there is a remainder. This remainder may be written over the divisor as part of the quotient...

...division is called the Quotient. It shows how many times the divisor is contained in the dividend. When the dividend does not contain the divisor an exact number of times, the part of the dividend left undivided is called the Remainder. It is always less than the divisor. The...

...division is called the quotient. It shows how many times the divisor is contained in the dividend. When the dividend does not contain the divisor an exact number of times, the part of the dividend left undivided is called the remainder, which is always less than the divisor....

...number obtained by dividing, and shows how many times the divisor is contained in the dividend. 1. When the dividend does not contain the divisor an exact number of times, the part of the dividend left is called the remainder, and it must be less than the divisor. 2. As the...

...above a line and the divisor below the same line, thus : a. Give the quotients: ^; ^; Wî W ; ¥î W3. When the dividend does not contain the divisor an exact number of times, the remainder is written over the divisor, as a. fraction, thus -3^ = 4f . This means that there are four...

...division is called the quotient. It shows how many times the divisor is contained in the dividend. When the dividend does not contain the divisor an exact number of times, the part of the dividend left undivided is called the remainder, which is always less than the divisor....

...number obtained by dividing, and shows how many times the divisor is contained in the dividend. 1. When the dividend does not contain the divisor an exact number of times, the part of the dividend left is called the remainder, and it must be less than the divisor. 2. As the...

...and bring down 2 units. 49 is almost 50. We may therefore take 5 for a guide figure. In this example the dividend does not contain the divisor an exact number of times, hence there is a remainder. The remainder may be written over the divisor as a part of the quotient...

...¥-12 +3 = 4; ¥ = 3;¥ = ;i| = ; i£ = . 3. Give the quotients : -*/ ; ^ ; ^ ; ^°- ; ^ ; ^°-. 3. When the dividend does not contain the divisor an exact number of times, the remainder is written over the divisor, as a fraction, thus -3^ = 4|. This means that there are four...

...dividend is the quantity to be divided. The divisor is the quantity which is divided into the dividend. When the dividend does not contain the divisor an exact number of times, the excess is called the remainder. The remainder being a part of the dividend will always be of the same kind as the dividend...