which expression is equivalent to $\frac{45m^{-6}p^{2}v^{12}}{15m^{-2}p^{8}v^{-4}}$ for all values of $m$, $p$, and $v$ where the expression is defined?\
a $\frac{3v^{8}}{m^{8}p^{6}}$\
b $\frac{3v^{16}}{m^{4}p^{6}}$\
c $\frac{30m^{3}}{p^{4}v^{3}}$\
d $\frac{30v^{3}}{m^{3}p^{4}}$\
$\circ$ b\
$\circ$ d\
$\circ$ c\
$\circ$ a

Question

Accepted Answer

# Explanation:
## Step1: Simplify coefficients
$\frac{45}{15} = 3$
## Step2: Simplify $m$ terms
$m^{-6 - (-2)} = m^{-6+2} = m^{-4} = \frac{1}{m^4}$
## Step3: Simplify $p$ terms
$p^{2 - 8} = p^{-6} = \frac{1}{p^6}$
## Step4: Simplify $v$ terms
$v^{12 - (-4)} = v^{12+4} = v^{16}$
## Step5: Combine all simplified parts
$3 \cdot \frac{1}{m^4} \cdot \frac{1}{p^6} \cdot v^{16} = \frac{3v^{16}}{m^4p^6}$

# Answer:
B. $\frac{3v^{16}}{m^4p^6}$

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QUESTION IMAGE

Question

Explanation:

Step1: Simplify coefficients

Step2: Simplify $m$ terms

Step3: Simplify $p$ terms

Step4: Simplify $v$ terms

Step5: Combine all simplified parts

Answer: