How do you simplify #(\frac { a ^ { 2x } } { a ^ { 3} } ) ^ { 3} #?

1 Answer
Jun 7, 2018

Distribute the exponent to the top and bottom terms of the fraction, then subtract the exponent in the denominator from that in the numerator to get #a^(6x-9)#

Explanation:

First, we'll apply the exponent to the terms inside of the parentheses:

#((a^(2x))/(a^3))^3=((a^(2x))^3)/((a^3)^3)#

Next, we'll simplify the expressions in the numerator and denominator. Remember, an exponent raised to another exponent is the same as multiplying the two exponents together:

#((a^(2x))^3)/((a^3)^3)=(a^(6x))/(a^9)#

Finally, since we're dividing two exponents with the same base, we can simplify by saying that its equivalent to the difference between the two exponents:

#(a^(6x))/(a^9)=a^(6x-9)#

And now it's as simplified as it can be:

#color(green)(a^(6x-9))#