AP Calculus AB - Differentiating using the Product Rule
(it is # 3 on the PDF)

I need help differentiating the following equation using the Product rule

[f(x)*g'(x)]+[f(x)g'(x)]

Will Award brainliest answer

please help, I keep getting the wrong answer

[tex]h(t)=\sqrt{t}(1-t^2)\\\\f(t)=\sqrt{t} \qquad f'(t)=\dfrac{1}{2\sqrt{t}}=\dfrac{\sqrt{t}}{2t}\\\\g(t)=1-t^2 \qquad g'(t)=-2t\\\\h'(t)=f'(t)g(t)+f(t)g'(t)=\dfrac{\sqrt{t}}{2t}(1-t^2)+\sqrt{t}(-2t)\\\\h'(t)=\dfrac{\sqrt{t}(1-t^2-4t^2)}{2t}=\dfrac{\sqrt{t}(1-5t^2)}{2t}[/tex]

AP Calculus AB - Differentiating using the Product Rule(it is # 3 on the PDF)I need help differentiating the following equation using the Product rule[f(x)*g'(x)]+[f(x)g'(x)]Will Award brainliest answerplease help, I keep getting the wrong answer

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AP Calculus AB - Differentiating using the Product Rule
(it is # 3 on the PDF)

I need help differentiating the following equation using the Product rule

[f(x)*g'(x)]+[f(x)g'(x)]

Will Award brainliest answer

please help, I keep getting the wrong answer