# 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 $(-3x^{3}y^{3})^{4}$ as follows: $(-3x^{3}y^{3})^{4}=(-3)^{4}\cdot(x^{3})^{4}\cdot(y^{3})^{4}$ ## Step2: Calculate each term - Calculate $(-3)^{4}$: $(-3)^{4}=(-3)\times(-3)\times(-3)\times(-3) = 81$ - Calculate $(x^{3})^{4}$ using the power of a power rule $(a^m)^n=a^{mn}$: $(x^{3})^{4}=x^{3\times4}=x^{12}$ - Calculate $(y^{3})^{4}$ using the power of a power rule: $(y^{3})^{4}=y^{3\times4}=y^{12}$ ## Step3: Multiply the results together Multiply the three results we got: $81\times x^{12}\times y^{12}=81x^{12}y^{12}$ # Answer: $81x^{12}y^{12}$

$(-3x^{3}y^{3})^{4}$

QUESTION IMAGE

Question

$(-3x^{3}y^{3})^{4}$

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 $(-3x^{3}y^{3})^{4}$ as follows:
$(-3x^{3}y^{3})^{4}=(-3)^{4}\cdot(x^{3})^{4}\cdot(y^{3})^{4}$

Step2: Calculate each term

Calculate $(-3)^{4}$: $(-3)^{4}=(-3)\times(-3)\times(-3)\times(-3) = 81$
Calculate $(x^{3})^{4}$ using the power of a power rule $(a^m)^n=a^{mn}$: $(x^{3})^{4}=x^{3\times4}=x^{12}$
Calculate $(y^{3})^{4}$ using the power of a power rule: $(y^{3})^{4}=y^{3\times4}=y^{12}$

Step3: Multiply the results together

Multiply the three results we got: $81\times x^{12}\times y^{12}=81x^{12}y^{12}$

Answer:

$81x^{12}y^{12}$