Justify why is equivalent to using properties of rational exponents, where and .
Justify the equivalence using properties of rational exponents.
Which expression is not a solution to the equation ?
Kenzie believes that for , the expression is equivalent to . Is she correct? Justify your response algebraically.
Justify whether Kenzie's belief is correct.
29 Kenzie believes that for , the expression is equivalent to . Is she correct? Justify your response algebraically.
Determine if the expression is equivalent to and justify your response algebraically.
For , which expression is equivalent to ?
When and is a positive integer, the expression is equivalent to
When is written in the form , what is the value of ? Justify your answer.
For all positive values of , which expression is equivalent to ?
For and , is the expression equivalent to ? Justify your answer.
Justify your answer.
Justify why is equivalent to using properties of rational exponents, where and .
Justify the equivalence using properties of rational exponents.