Best Answer

The greatest possible remainder is divisor is just less than 28. If the dividend is an integer, then it is 27. But if the dividend is any real number, the greatest possible remainder is 27.999.... (recurring).

Strictly speaking, though, the decimal can only be "nearly recurring". This is because 27.999 recurring = 28 and the remainder cannot be 28.

The greatest possible remainder is divisor is just less than 28. If the dividend is an integer, then it is 27. But if the dividend is any real number, the greatest possible remainder is 27.999.... (recurring).

Strictly speaking, though, the decimal can only be "nearly recurring". This is because 27.999 recurring = 28 and the remainder cannot be 28.

The greatest possible remainder is divisor is just less than 28. If the dividend is an integer, then it is 27. But if the dividend is any real number, the greatest possible remainder is 27.999.... (recurring).

Strictly speaking, though, the decimal can only be "nearly recurring". This is because 27.999 recurring = 28 and the remainder cannot be 28.

The greatest possible remainder is divisor is just less than 28. If the dividend is an integer, then it is 27. But if the dividend is any real number, the greatest possible remainder is 27.999.... (recurring).

🙏

🤨

😮

Study guides

More answers

The greatest possible remainder is divisor is just less than 28. If the dividend is an integer, then it is 27. But if the dividend is any real number, the greatest possible remainder is 27.999.... (recurring).

Q: What is the greatest possible remainder for a divisor of 28 and a dividend of any number?

Write your answer...

Submit

Related questions

It depends on the dividend.

quotent X divisor + remainder = dividend

The greatest possible remainder for 76 is to be divided by 2 leaving the result of 38. Thank you!

The divisor is 9. quotient x divisor + remainder = dividend ⇒ quotient x divisor = dividend - remainder ⇒ divisor = (dividend - remainder) ÷ quotient = (53 - 8) ÷ 5 = 45 ÷ 5 = 9

75

7

62

16

If the divisor is 7, the quotient is 9, and the remainder is 6, then the dividend must be 69.

24. It is always one less than the divisor.

Because if the remainder was larger than the divisor, then the divisor could go into the dividend again.

Dividend if the number that you divide, divisor is the number that you divide dividend into, and quotient is the number that you get from dividing dividend into divisor. For example, in 12/3=4, 12 is the dividend, 3 is the divisor, and 4 is the quotient.

8 is the greatest possible whole number remainder, eg seventeen divided by nine...

The remainder of two positive integers can be calculated by first dividing one number (the dividend) by the other (the divisor) using integer division (ignoring any fractional component). Multiply this quotient by the divisor, then subtract the product from the dividend. The result is the remainder. Alternatively, while the dividend remains greater than the divisor, subtract the divisor from the dividend and repeat until the dividend is smaller than the divisor. The dividend is then the remainder.

12-1, that is, 11.

the parts of division problem are : dividend , divisor , quotient and remainder . where : dividend = quotient * divisor + remainder

What is the largest remainder possible if the divisor is 10

It means that there is no remainder in the problem. For example 9/3=3. The nine is the dividend, and the first three is the divisor. There was no remainder, so it divided evenly.

The dividend is 35 because 35/4 = 8 with a remainder of 3

If you add two zeroes to the divisor but still have a remainder, add zeroes to the dividend. Adding zeroes to the divisor will not help.

The greatest integer remainder for a division sum with a divisor of 63 would be 62 - for a number one fewer than an integer multiple of 63 - for example, 125/63 = 1 remainder 62.

It is called a multiple of the divisor.

Divisor, dividend, quotient, remainder.

quotient,divisor, and dividend and remainder

I dontknow