Pregunta
Differentiate the function. \( s(t)=6 t-2\left(3 t^{4}+4\right)^{3} \) \( s^{\prime}(t)=\square \)
Ask by Norris Nguyen. in the United States
Mar 08,2025
Solución de inteligencia artificial de Upstudy
Respuesta verificada por el tutor
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\( s'(t) = 6 - 72t^3(3t^4 + 4)^2 \)
Solución
1. Write the function:
\[
s(t)=6t-2\left(3t^4+4\right)^3.
\]
2. Differentiate \(6t\):
\[
\frac{d}{dt}\left(6t\right)=6.
\]
3. Differentiate \(-2\left(3t^4+4\right)^3\) using the chain rule:
- Let \( u = 3t^4+4 \). Then the term becomes \(-2u^3\).
- Differentiate \( u^3 \) with respect to \( u \):
\[
\frac{d}{du}\left(u^3\right)=3u^2.
\]
- Differentiate \( u \) with respect to \( t \):
\[
\frac{du}{dt}=\frac{d}{dt}\left(3t^4+4\right)=12t^3.
\]
- Apply the chain rule:
\[
\frac{d}{dt}\left(-2u^3\right)=-2\cdot 3u^2\cdot \frac{du}{dt}=-6u^2\cdot 12t^3=-72t^3u^2.
\]
- Substitute back \( u=3t^4+4 \):
\[
-72t^3\left(3t^4+4\right)^2.
\]
4. Combine the derivatives:
\[
s'(t)=6-72t^3\left(3t^4+4\right)^2.
\]
Thus, the derivative is:
\[
s'(t)=6-72t^3\left(3t^4+4\right)^2.
\]
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Simplifique esta solución Mind Expander
To differentiate the function \( s(t) = 6t - 2(3t^4 + 4)^3 \), we will apply both the product rule and the chain rule for differentiation. First, differentiate \( 6t \) which gives \( 6 \). Now, for \( -2(3t^4 + 4)^3 \), we need to use the chain rule. Let \( u = 3t^4 + 4 \); then \( \frac{du}{dt} = 12t^3 \). Using the chain rule gives: \[ \frac{d}{dt}[-2u^3] = -6u^2 \cdot \frac{du}{dt} = -6(3t^4 + 4)^2 \cdot 12t^3 \] Now, putting it all together: \[ s^{\prime}(t) = 6 - 72t^3(3t^4 + 4)^2 \] Thus, the final expression for the derivative is: \[ s^{\prime}(t) = 6 - 72t^3(3t^4 + 4)^2 \]
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