Question
Evaluate the integral. \( \int 2 y^{2} \sqrt{9-2 y^{3}} d y \) \( \int 2 y^{2} \sqrt{9-2 y^{3}} d y=\square \)
Ask by Harper Rogers. in the United States
Mar 09,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
The integral evaluates to \( -\frac{2}{9}(9-2y^3)^{\frac{3}{2}} + C \).
Solution
We start with the integral
\[
\int 2y^2 \sqrt{9-2y^3}\,dy.
\]
**Step 1.** Use the substitution
\[
u = 9-2y^3.
\]
Then, differentiate with respect to \(y\):
\[
\frac{du}{dy} = -6y^2 \quad \Longrightarrow \quad du = -6y^2\,dy.
\]
**Step 2.** Solve for \(y^2\,dy\):
\[
y^2\,dy = -\frac{1}{6}\,du.
\]
Substitute this into the integral. Note that
\[
2y^2\,dy = 2\left(-\frac{1}{6}\,du\right) = -\frac{1}{3}\,du.
\]
Thus, the integral becomes
\[
-\frac{1}{3}\int \sqrt{u}\,du.
\]
**Step 3.** Evaluate the integral:
\[
\int \sqrt{u}\,du = \int u^{\frac{1}{2}}\,du = \frac{u^{\frac{3}{2}}}{\frac{3}{2}} = \frac{2}{3}u^{\frac{3}{2}}.
\]
So, we have
\[
-\frac{1}{3}\int \sqrt{u}\,du = -\frac{1}{3}\cdot\frac{2}{3} u^{\frac{3}{2}} = -\frac{2}{9} u^{\frac{3}{2}}.
\]
**Step 4.** Substitute back \(u = 9-2y^3\):
\[
-\frac{2}{9}(9-2y^3)^{\frac{3}{2}}+C.
\]
Thus, the evaluated integral is
\[
\int 2y^2 \sqrt{9-2y^3}\,dy = -\frac{2}{9}(9-2y^3)^{\frac{3}{2}}+C.
\]
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Simplify this solution Extra Insights
To evaluate the integral \( \int 2 y^{2} \sqrt{9-2 y^{3}} \, dy \), we can use substitution. Let \( u = 9 - 2y^{3} \). Then we have: \[ \frac{du}{dy} = -6y^{2} \implies du = -6y^{2} \, dy \implies dy = -\frac{du}{6y^{2}}. \] Substituting into the integral: \[ \int 2 y^{2} \sqrt{u} \left(-\frac{du}{6y^{2}}\right) = -\frac{1}{3} \int \sqrt{u} \, du. \] Now, we can integrate: \[ -\frac{1}{3} \cdot \frac{2}{3} u^{3/2} = -\frac{2}{9} u^{3/2}. \] Substituting back \( u = 9 - 2y^{3} \): \[ -\frac{2}{9} (9 - 2y^{3})^{3/2} + C. \] Thus, the final answer is: \[ \int 2 y^{2} \sqrt{9-2 y^{3}} \, dy = -\frac{2}{9} (9 - 2y^{3})^{3/2} + C. \]
