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Max Bileschi · Answer 1 · 2023-10-31T20:18:18+0000

Solution:

Given:

(2x^2-6x)/(x^2-9)/(4x^3+28x^2)/(x^2+8x+15)

$\begin{gathered} (2x^2-6x)/(x^2-9)*(x^2+8x+15)/(4x^3+28x^2) \\ \\ To\text{ simplify the expression, we n}eed\text{ to factorize each expression and cancel them out.} \\ \text{Hence,} \\ (2x(x-3))/((x-3)(x+3))*((x+3)(x+5))/(4x^2(x+7)) \end{gathered}$

Canceling out the common factors,

$\begin{gathered} (2x(x-3))/((x-3)(x+3))*((x+3)(x+5))/(4x^2(x+7)) \\ ((x+5))/(2x(x+7)) \end{gathered}$

Thus,

(2x^2-6x)/(x^2-9)/(4x^3+28x^2)/(x^2+8x+15)=((x+5))/(2x(x+7))

The restrictions will occur for the expression to be undefined.

The expression will be undefined when the denominator is zero.

$\begin{gathered} ((x+5))/(2x(x+7)) \\ \text{Hence,} \\ 2x(x+7)=0 \\ 2x=0\text{ OR x + 7 = 0} \\ x=(0)/(2)\text{ OR x = 0 - 7} \\ x=0\text{ OR x = -7} \\ \\ \text{Hence, there are restrictions at x = 0 and x = -7 because the expression will be undefined at these two points} \end{gathered}$

Therefore,

$\begin{gathered} ((x+5))/(2x(x+7))\text{ will have the following restrictions,} \\ x\\e0\text{ and x }\\e-7 \end{gathered}$

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