Question: Let [f] be a function defined for all real numbers except for [4].Also let [f'], the derivative of [f], be defined as [f'(x)=dfrac{(x+1)^2}{x-4}].On which intervals
Let \[f\] be a function defined for all real numbers except for \[4\].Also let \[f'\], the derivative of \[f\], be defined as \[f'(x)=\dfrac{(x+1)^2}{x-4}\].On which intervals is \[f\] increasing?Choose 1 answer:Choose 1 answer:(Choice A)\[(-1,4)\] onlyA\[(-1,4)\] only(Choice B)\[(-\infty,-1)\] onlyB\[(-\infty,-1)\] only(Choice C)\[(-\infty,-1)\] and \[(4,\infty)\]C\[(-\infty,-1)\] and \[(4,\infty)\](Choice D)\[(4,\infty)\] onlyD\[(4,\infty)\] only(Choice E)The entire domain of \[f\]EThe entire domain of \[f\]
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