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Question
differentiate: v(x)=(2x^3 - 6)(x^4 - 6x) v(x)=
Step1: Apply product - rule
The product - rule states that if $V(x)=u(x)v(x)$, then $V^{\prime}(x)=u^{\prime}(x)v(x)+u(x)v^{\prime}(x)$. Let $u(x)=2x^{3}-6$ and $v(x)=x^{4}-6x$.
Step2: Differentiate $u(x)$
Using the power - rule $\frac{d}{dx}(ax^{n})=nax^{n - 1}$, we have $u^{\prime}(x)=\frac{d}{dx}(2x^{3}-6)=6x^{2}$.
Step3: Differentiate $v(x)$
Using the power - rule, $v^{\prime}(x)=\frac{d}{dx}(x^{4}-6x)=4x^{3}-6$.
Step4: Substitute into product - rule
$V^{\prime}(x)=u^{\prime}(x)v(x)+u(x)v^{\prime}(x)=6x^{2}(x^{4}-6x)+(2x^{3}-6)(4x^{3}-6)$.
Step5: Expand the expressions
First expand $6x^{2}(x^{4}-6x)=6x^{6}-36x^{3}$. Then expand $(2x^{3}-6)(4x^{3}-6)=8x^{6}-12x^{3}-24x^{3}+36 = 8x^{6}-36x^{3}+36$.
Step6: Combine like terms
$V^{\prime}(x)=(6x^{6}-36x^{3})+(8x^{6}-36x^{3}+36)=14x^{6}-72x^{3}+36$.
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$14x^{6}-72x^{3}+36$