# Explanation: ## Step1: Apply power of a product rule The power of a product rule states that $(ab)^n = a^n b^n$. So, we can apply this to $(-u^4v^2)^3$ as follows: $(-u^4v^2)^3 = (-1)^3 \cdot (u^4)^3 \cdot (v^2)^3$ ## Step2: Simplify each term - For $(-1)^3$, we know that $(-1)^3=-1$ - For $(u^4)^3$, using the power of a power rule $(a^m)^n = a^{mn}$, we get $u^{4\times3}=u^{12}$ - For $(v^2)^3$, using the power of a power rule, we get $v^{2\times3}=v^6$ ## Step3: Multiply the simplified terms together Multiplying the results from Step 2, we have: $-1\times u^{12}\times v^6=-u^{12}v^6$ # Answer: $-u^{12}v^6$

8) $(-u^4v^2)^3$

QUESTION IMAGE

Question

$(-u^4v^2)^3$

Explanation:

Step1: Apply power of a product rule

The power of a product rule states that $(ab)^n = a^n b^n$. So, we can apply this to $(-u^4v^2)^3$ as follows:
$(-u^4v^2)^3 = (-1)^3 \cdot (u^4)^3 \cdot (v^2)^3$

Step2: Simplify each term

For $(-1)^3$, we know that $(-1)^3=-1$
For $(u^4)^3$, using the power of a power rule $(a^m)^n = a^{mn}$, we get $u^{4\times3}=u^{12}$
For $(v^2)^3$, using the power of a power rule, we get $v^{2\times3}=v^6$

Step3: Multiply the simplified terms together

Multiplying the results from Step 2, we have: $-1\times u^{12}\times v^6=-u^{12}v^6$

Answer:

$-u^{12}v^6$