1 Answer

Jamey Sharp · Answer 1 · 2022-02-12T23:30:32+0000

Answer:

Equivalent Expression:
$\displaytext\mathsf{(a^7)/(b^8)}$

Explanation:

Given the exponential expression,
$\displaystyle\mathsf{(a^(12)\:b^(-3))/(a^(5)\:b^(5))}$ :

We could use the Quotient Rule of Exponents where it states that:

$\displaystyle\mathsf{(a^m)/(a^n)\:=\:a^((m\:-\:n))}$

Since we have the variables, a and b as the base, we could simply apply the Quotient Rule and subtract their exponents.

$\displaystyle\mathsf{(a^(12)\:b^(-3))/(a^(5)\:b^(5))\:=\:a^((12\:-\:5))\:b^((-3\:-\:5))}$

$\displaytext\mathsf{=\:a^(7)\:b^(-8)}$

Next, we must transform the negative exponent of base, b, into positive by applying the Negative Exponent Rule, where it states that:

$\large\text{$ a^(-n)\:=\:(1)/(a^(n)) $}$

Applying the Negative Exponent Rule will result in the following exponential expression:

$\LARGE\text{$ a^(7)\:b^(-8)\:=\:[a^(7)\:*\:(1)/(b^8)]\:=\:(a^7)/(b^8) $}$

Therefore, the equivalent expression is:
$\LARGE\text{$ (a^7)/(b^8) $}$ .

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