Answer:
d) He divided the exponents in the parentheses instead of subtracting
Step-by-step explanation:
First you should know that the power of a power based
"a" is the power based on "a" and whose exponent is the product of the exponents:
[tex](a^{n})^{m}=a^{n*m}[/tex]
By simplifying the expression you get,
[tex]\frac{(x^{12})^{5}}{(x^{-3})^{5}}=(x^{12-(-3)})^{5}=(x^{12+3})^{5}=(x^{15})^{5}=x^{15*5}=x^{75}[/tex]
What Blake did wrong is what says option d) He divided the exponents in the parentheses instead of subtracting.
This is what he did wrong:
[tex]\frac{(x^{12})^{5}}{(x^{-3})^{5}}=(x^{12/(-3)})^{5}=(x^{-4})^{5}=x^{-4*5}=x^{-20}=\frac{1}{x^{20}}[/tex]
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Hope this helps!
