To perform division with a remainder, divide the dividend (the number being divided) by the divisor (the number you are dividing by) to find the quotient (the whole number result). Multiply the quotient by the divisor, and then subtract this product from the original dividend to find the remainder. The final result can be expressed as: Dividend = (Divisor × Quotient) + Remainder. The remainder must always be less than the divisor.
It's called the remainder
12.0123
You do not invert it. However, you can convert the remainder to a decimal by carrying out a long division of the remainder divided by the original divisor. For example, 13/3 = 4r1 Then, long division of the remainder (=1) by the divisor (=3) gives 0.33.... which is the converted remainder. The full quotient, in decimal form is 4.33...
If the divisor of a division problem is 4, any number between 0 and 3 (inclusive) can be a remainder for that problem.
No, the remainder in a division problem cannot equal the divisor. The remainder is defined as the amount left over after division when the dividend is not evenly divisible by the divisor. By definition, the remainder must be less than the divisor; if it were equal to the divisor, it would indicate that the dividend is divisible by the divisor, resulting in a remainder of zero.
It's called the remainder
The number left over in a division problem is called the "remainder".
the remainder
12.0123
You do not invert it. However, you can convert the remainder to a decimal by carrying out a long division of the remainder divided by the original divisor. For example, 13/3 = 4r1 Then, long division of the remainder (=1) by the divisor (=3) gives 0.33.... which is the converted remainder. The full quotient, in decimal form is 4.33...
To check for divisibility, use the "%" operator - the remainder of a division. If the remainder is 0, it is divisible.for (i = 1; i
Division BY 76: 75 Division of 76: 76
If the divisor of a division problem is 4, any number between 0 and 3 (inclusive) can be a remainder for that problem.
the parts of division problem are : dividend , divisor , quotient and remainder . where : dividend = quotient * divisor + remainder
No, the remainder in a division problem cannot equal the divisor. The remainder is defined as the amount left over after division when the dividend is not evenly divisible by the divisor. By definition, the remainder must be less than the divisor; if it were equal to the divisor, it would indicate that the dividend is divisible by the divisor, resulting in a remainder of zero.
... when the remainder after division ...
So that the answer from the division is a single quotient.