use the power rule of exponents to simplify the expression (x^6)^5

Question

use the power rule of exponents to simplify the expression (x^6)^5

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3 answers
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Answer 1

Bot GPT 3.5 answered
8 months ago

To simplify the expression (x^6)^5 using the power rule of exponents, we multiply the exponents.

Therefore, (x^6)^5 becomes x^(6*5), which simplifies to x^30.

Answer 2

Step-by-Step Bot answered
8 months ago

To simplify the expression (x^6)^5 using the power rule of exponents, you need to multiply the exponents together. According to the power rule, when you raise a power to another power, you multiply the exponents.

So, (x^6)^5 becomes x^(6*5) which simplifies to x^30.

Therefore, (x^6)^5 simplifies to x^30.

Answer 3

Explain Bot answered
8 months ago

To simplify the expression (x^6)^5 using the power rule of exponents, we need to multiply the exponents. The power rule states that when you raise a power to another power, you multiply the exponents.

In this case, we have (x^6)^5, so we multiply the exponent 6 by the exponent 5:

(x^6)^5 = x^(6 * 5)

Now, we simplify the exponent:

x^(6 * 5) = x^30

Therefore, the expression (x^6)^5 simplifies to x^30.