rewrite in simplest rational exponent form square root x times 4 square root x

[tex] \sqrt{x} *4 \sqrt{x} [/tex] is what I think you're saying. Converting this to exponential form, the square root becomes a 1/2. So the square root of x is rewritten as x^(1/2). Same with the 4 times the square root of x. That can be rewritten as 4x^(1/2). The rule about multiplying exponents when the bases are the same is to add the exponents, right. So x^(1/2)*4x^(1/2) = 4x^1 or 4x

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jainveenamrata jainveenamrata · Answer 2 · 2022-05-17T08:03:24+02:00

If the base of the exponent is the same then the power gets added up. Then the expression can be written as 4x.

What is an exponent?

Exponential notation is a type of mathematical shorthand that allows us to express complex statements in a more concise manner. The basis of an exponent is a quantity or letter. It denotes that the base will rise to a specific level of strength. The base is X, and the power is n.

The expression is given below.

√x and 4√x

Then the product of the expression will be

[tex]\rm \sqrt{x} \times 4\sqrt{x}[/tex]

The expression can be written as

[tex]\rm x^{1/2} \times 4x^{1/2}[/tex]

If the base of the exponent is the same then the power gets added up.

[tex]\rm 4x^{1/2 + 1/2} \\\\4x[/tex]

More about the exponent link is given below.

https://brainly.com/question/5497425

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