No, it is not possible to divide 15 by a mixed number and get a quotient that is greater than 15.
By an integer, no. By any proper fraction, yes.
When you divide a number by a fraction between zero and one, the quotient will be greater than that number.
It will be greater.
The quotient is less than the fraction.
A quotient is the answer when you divide 2 numbers. For example if you divide 72 by 3, you get 24 as a quotient.
Yes. Because an example of this would be 15 ÷ 4 2/3. To solve you would turn 4 2/3 to 14/3 and 15 to 15/1. Then u multiply to get 210/3. 210/3 simplified is 70. And 70 is greater than 15 so yes, yes u can divide by a mixed number to get a quotient greater than 15. If you came to the conclusion that no you can not. Did you test your reasoning?
to fine the quotient of a number u have to divide
It is W - 1. If the remainder is greater than or equal to W, then you can subtract W from the remainder and increase the quotient by 1.
I assume that by a mixed number you mean a number of the form ab/c where a is an integer greater than 0 (otherwise the number would be a simple fraction), the answer is No.
The quotient can be smaller or larger - depending on whether the original was negative or positive. It will be unchanged if it was 0.
The quotient will be less. 1/2 ÷ 2 = 1/4
A strategy for finding the quotient when you divide a number by a power of 10 greater than 1 by actually if you put them in decimals: 1/10=0.10 1/100=0.01 So the then 10 is bigger than 10.
The quotient is always greater than the whole number. Why? Because it takes more to add up a smaller number than a bigger number. I hope this makes sense.. I'm really stupid XD
You divide the dividend by the divisor. The result is the quotient.
The number which we divide is called the dividend. The number by which we divide is called the divisor. The result obtained is called the quotient.
The quotient need not be greater than a whole number less than one!
The answer you get when you divide is called the quotient.It is the number on top of the whole division problem.
divided a number by 8. His quotient was 73. The remainder was6. What was the number?