Answer:
The reason is that, the square root of any real number, cannot be negative in real number system.
Step-by-step explanation:
Rational exponents often referred to as fractional exponent is a mathematical terms that describes the interger exponent and its nth root, such that the interger is used as the numerator, which will be the power of denominator, while the denominator is the root of the interger.
Therefore, given the denominator to be positive even, then the nth root, will be even root such as square root, 4th root, 6th root, 8th root etc.
However, if the denominator is negative number, this implies that, we are finding for even root, of a negative number, which is technically impossible nor defined, because a negative times a negative is a positive, as is a positive times a positive, so there is no way to multiply the same number twice and get a negative.
For example: there is no square roots of (-16), since -4 x -4 = + 16 and +4 x +4 = +16
Hence, the nth root of a negative number does not exist in real number system.
