Question

1. Why is a radical expression expressible as a rational exponent? Provide two examples.

Answer 1

"radikal expresshun"...is that hippees??   ? sumwon hu dont luv banks???

"rashunal exponent" ????is zat a proponent av rashunal thot ??????????

Answer 2

(14b^(7)p^(3)(-2bp^(6) ÷ [(3kbp(-25k^(2)b^(-8)0)]^(0)

Answer 3

Assuming that this question is asking why some number in radical form can be expressed in exponential form of rational number.   And also assuming "rational" indicates a fraction form.

A rational number is real, and can be written in fraction form as a ratio.   And if the number given is negative, the result can be the product of real number in exponential form and "i", imaginary number.

Thus, the answe is: Becase the number given with root sign is rational and positive.

The following are a few examples: 

√0.4444...=√(4/9)=(4/9)^½

∜0.296296296...=∜(8/27)=(8/27)^¼

√1.4=√(7/5)=(7/5)^½