No. If the rational number is not zero, then such a product is irrational.
No, they are not. An irrational number subtracted from itself will give 0, which is rational.
The proposition is not true.pi and -pi are both irrational. But their sum, = 0, is rational.
rational! :) Have a nice day!1
Provided that the rational number is not 0, the product is irrational.
No. 0 is a rational number and the product of 0 and any irrational number will be 0, a rational. Otherwise, though, the product will always be irrational.
Not necessarily. 0 times any irrational number is 0 - which is rational.
No, it is not.
No
The product of 0 and an irrational is 0 (a rational), the product of a non-zero rational and any irrational is always irrational.
Can be irrational or rational.1 [rational] * sqrt(2) [irrational] = sqrt(2) [irrational]0 [rational] * sqrt(2) [irrational] = 0 [rational]
The question cannot be answered because it is based on a false premise.The product of a (not an!) rational number and an irrational number need not be irrational. For eample, the product ofthe rational number, 0, and the irrational number, pi, is 0. The product is rational, not irrational!
The product of an irrational number and a rational number, both nonzero, is always irrational
No
No. If the rational number is not zero, then such a product is irrational.
Yes, unless the rational number is 0.
No irrational number can turn into a rational number by itself: you have to do something to it. If you multiply any irrational number by 0, the answer is 0, which is rational. So, given the correct procedure, every irrational number can be turned into a rational number.