11.8333
Remainders are the leftover numbers in division. For example, 6 doesn't fit in to 25 perfectly. It fits in to 24 perfectly. 25-24=1. 1 is the remainder for 25 divded by 6.
Next to the quotient, write R(x). Let x be the remainder number.
If the dividend is a multiple of 8 then there will be no remainders in the quotient otherwise the possible remainders are limitless
In division by 5, you can have remainders of 0, 1, 2, 3, and 4. If you count zero, then you can have five possible remainders. If you are not counting zero, then 4 possible remainders.
It is the short for MODULUS DIVISION which is an operation of division that aims to get the ramainder rather than the whole number.
you just mult
Remainders (on division) rather than division itself.
The answer depends on the level of mathematics you are at: from simple remainders left when one number is divided by another to the remainder theorem where is is the division of one polynomial by another.
Remainders accompany quotients, not products. 154x15 uses multiplication, not division.
It really helps a lot to know your times tables inside-out.
11.8333
Remainders are the leftover numbers in division. For example, 6 doesn't fit in to 25 perfectly. It fits in to 24 perfectly. 25-24=1. 1 is the remainder for 25 divded by 6.
In division by three, possible nonzero remainders are 1 and 2.
Next to the quotient, write R(x). Let x be the remainder number.
One possibility is remainders after division by 5.
remainders are cool