SOLUTION: taking root of 1= x^(-1/3)

SOLUTION: taking root of 1= x^(-1/3)

Algebra.Com

Question 164472: taking root of 1= x^(-1/3)
Answer by checkley77(12844) (Show Source): You can put this solution on YOUR website!
1= x^(-1/3)
1=1/CUBERT(X)
CUBERTX=1
X=1 ANSWER.
RELATED QUESTIONS
root{x+1} + root of (2x-3} =4.find... (answered by MathLover1)

Solve by taking square root of BOTH sides of the equation. 1) x^2=16 2) x^2-36=0 (answered by Fombitz,nyc_function)

Solve {{{t^2-2t+1=49}}} by taking the square root of each... (answered by stanbon)

Square root of (2x+3) - square root of (x+1) =... (answered by mathslover)

Solve square root of 2x+3- square root of... (answered by ankor@dixie-net.com)

square root(2x-1) - square root(x+3) = 1... (answered by stanbon)

square root 2x+3 - square root x+1... (answered by mathslover)

the square root of x-1... (answered by checkley77)

f(x)=3 square root of... (answered by Alan3354)