How do you rationalize the denominator and simplify $\frac{8}{2 \sqrt{x} + 3}$ $8/(2sqrt x +3 )$ ?

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How do you rationalize the denominator and simplify $\frac{8}{2 \sqrt{x} + 3}$ $8/(2sqrt x +3 )$ ?

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Answer 1 · 2018-03-19T05:38:31

The fraction is equal to $\frac{16 \sqrt{x} - 24}{4 x - 9}$ $(16sqrtx-24)/(4x-9)$ .

Explanation:

The strategy is to multiply by the conjugate of the denominator. A conjugate of a two-term number looks like this:

The conjugate of $x + y$ $x+y$ is $x - y$ $x-y$ .

Multiplying the top and the bottom by the conjugate will cancel out the square roots of $x$ $x$ on the bottom, leaving only $x$ $x$ 's. It will look like this:

$= \frac{8}{2 \sqrt{x} + 3}$ $color(white)=8/(2sqrtx+3)$

$= \frac{8}{2 \sqrt{x} + 3} \cdot \frac{(2 \sqrt{x} - 3)}{(2 \sqrt{x} - 3)}$ $=8/(2sqrtx+3)color(red)(*((2sqrtx-3))/((2sqrtx-3)))$

$= \frac{8 \cdot (2 \sqrt{x} - 3)}{(2 \sqrt{x} + 3) \cdot (2 \sqrt{x} - 3)}$ $=(8*(2sqrtx-3))/((2sqrtx+3)*(2sqrtx-3))$

$= \frac{16 \sqrt{x} - 24}{(2 \sqrt{x} + 3) \cdot (2 \sqrt{x} - 3)}$ $=(16sqrtx-24)/((2sqrtx+3)*(2sqrtx-3))$

$= \frac{16 \sqrt{x} - 24}{2^{2} {\sqrt{x}}^{2} - 6 \sqrt{x} + 6 \sqrt{x} - 3 \cdot 3}$ $=(16sqrtx-24)/(2^2sqrtx^2-6sqrtx+6sqrtx-3*3)$

$=(16sqrtx-24)/(4xcolor(red)cancelcolor(black)(-6sqrtx+6sqrtx)-9)$

$=(16sqrtx-24)/(4x-9)$

The fraction is rationalized. Hope this helped!

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How do you rationalize the denominator and simplify $\frac{8}{2 \sqrt{x} + 3}$ $8/(2sqrt x +3 )$ ?

1 Answer

Explanation:

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