Simplifying Expressions | Understanding Exponent Properties and (x^a)^b

(x^a)^b

To simplify the expression (x^a)^b, we will use the exponent properties

To simplify the expression (x^a)^b, we will use the exponent properties. According to these properties, when we raise a power to another power, we need to multiply the exponents together.

In this case, (x^a)^b means that we are first raising x to the power a, and then raising that result to the power b. Thus, we can rewrite the expression as x^(a*b).

By multiplying the exponents a and b together, we obtain a*b. Therefore, the simplified expression for (x^a)^b is x^(a*b).

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