009B Sample Midterm 2, Problem 3

Evaluate

a) ${\displaystyle \int _{1}^{2}{\bigg (}2t+{\frac {3}{t^{2}}}{\bigg )}{\bigg (}4t^{2}-{\frac {5}{t}}{\bigg )}~dt}$

b) ${\displaystyle \int _{0}^{2}(x^{3}+x){\sqrt {x^{4}+2x^{2}+4}}~dx}$

Foundations:
How would you integrate ${\displaystyle \int (2x+1){\sqrt {x^{2}+x}}~dx?}$
You could use ${\displaystyle u}$-substitution. Let ${\displaystyle u=x^{2}+x.}$ Then, Failed to parse (Conversion error. Server ("https://wikimedia.org/api/rest_") reported: "Cannot get mml. Server problem."): {\displaystyle du=(2x+1)~dx.}
Thus, Failed to parse (Conversion error. Server ("https://wikimedia.org/api/rest_") reported: "Cannot get mml. Server problem."): {\displaystyle \int (2x+1){\sqrt {x^{2}+x}}~dx=\int {\sqrt {u}}={\frac {2}{3}}u^{3/2}+C={\frac {2}{3}}(x^{2}+x)^{3/2}+C.}

Solution:

(a)

Step 1:
We multiply the product inside the integral to get
${\displaystyle \int _{1}^{2}{\bigg (}2t+{\frac {3}{t^{2}}}{\bigg )}{\bigg (}4t^{2}-{\frac {5}{t}}{\bigg )}~dt=\int _{1}^{2}{\bigg (}8t^{3}-10+12-{\frac {15}{t^{3}}}{\bigg )}~dt=\int _{1}^{2}(8t^{3}+2-15t^{-3})~dt}$.

Step 2:
We integrate to get
${\displaystyle \int _{1}^{2}{\bigg (}2t+{\frac {3}{t^{2}}}{\bigg )}{\bigg (}4t^{2}-{\frac {5}{t}}{\bigg )}~dt=\left.2t^{4}+2t+{\frac {15}{2}}t^{-2}\right|_{1}^{2}}$.
We now evaluate to get
${\displaystyle \int _{1}^{2}{\bigg (}2t+{\frac {3}{t^{2}}}{\bigg )}{\bigg (}4t^{2}-{\frac {5}{t}}{\bigg )}~dt=2(2)^{4}+2(2)+{\frac {15}{2(2)^{2}}}-{\bigg (}2+2+{\frac {15}{2}}{\bigg )}=36+{\frac {15}{8}}-4-{\frac {15}{2}}={\frac {211}{8}}}$.

(b)

Step 1:
We use ${\displaystyle u}$-substitution. Let ${\displaystyle u=x^{4}+2x^{2}+4}$. Then, ${\displaystyle du=(4x^{3}+4x)dx}$ and ${\displaystyle {\frac {du}{4}}=(x^{3}+x)dx}$. Also, we need to change the bounds of integration.
Plugging in our values into the equation ${\displaystyle u=x^{4}+2x^{2}+4}$, we get ${\displaystyle u_{1}=0^{4}+2(0)^{2}+4=4}$ and ${\displaystyle u_{2}=2^{4}+2(2)^{2}+4=28}$.
Therefore, the integral becomes  ${\displaystyle {\frac {1}{4}}\int _{4}^{28}{\sqrt {u}}~du}$.

Step 2:
We now have:
${\displaystyle \int _{0}^{2}(x^{3}+x){\sqrt {x^{4}+2x^{2}+4}}~dx={\frac {1}{4}}\int _{4}^{28}{\sqrt {u}}~du=\left.{\frac {1}{6}}u^{\frac {3}{2}}\right|_{4}^{28}={\frac {1}{6}}(28^{\frac {3}{2}}-4^{\frac {3}{2}})={\frac {1}{6}}(({\sqrt {28}})^{3}-({\sqrt {4}})^{3})={\frac {1}{6}}((2{\sqrt {7}})^{3}-2^{3})}$.
So, we have
${\displaystyle \int _{0}^{2}(x^{3}+x){\sqrt {x^{4}+2x^{2}+4}}~dx={\frac {28{\sqrt {7}}-4}{3}}}$.

Final Answer:
(a)   ${\displaystyle {\frac {211}{8}}}$
(b)   ${\displaystyle {\frac {28{\sqrt {7}}-4}{3}}}$

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