the product is reduced
Details about multiplying and dividing rational number involves modeling multiplying fractions by dividing squares to equal segments and then overlap the squares.
Dividing by a non-zero rational number is the same as multiplying by its reciprocal.
The product of an irrational number and a rational number, both nonzero, is always irrational
Yes, but only if the rational number is non-zero.
Dividing by a rational number (other than zero) is simply multiplication by its reciprocal.
A rational number can be stated in the form a/b where and b are integers. Adding or multiplying such numbers always gives another number that can be expressed in this form also. So it is also rational.
If 0.75 is the radius, that's rational. If 0.75 is the diameter, the radius is also rational: multiplying two rational numbers together always gives you a rational number.
No. To be a rational number it must be an integer over another integer. π is not an integer, nor can it be made into an integer by multiplying it by another integer, thus one twelfth of π is not a rational number.
yes it can All perfect squares are rational numbers as the definition of a perfect square is a number which is the product of an integer with itself. An integer is a rational number, and multiplying an integer by an integer produces another integer.
There are [countably] infinite rational number between any two rational numbers. There is, therefore, no maximum.
There cannot be any rational"between" the same number.
7.8 is a rational number