From Mr. V Wiki Math
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| <math> | | <math> |
| \int u dv=uv-\int vd u | | \int u\,dv= u\cdot v -\int v\, du |
| | </math> |
| | |
| | <math> |
| | \begin{align} |
| | |
| | &\int_{0}^{\pi}\underbrace{x^3\cos(x)}_{ |
| | \begin{aligned} |
| | u&=x^3 \quad \quad dv=\cos(x) \\ |
| | dv&=3x^2 \quad \quad v=\sin(x) |
| | \end{aligned}} |
| | \,dx =x^3\sin(x)-\int_{0}^{\pi} \underbrace{3x^2\sin(x)}_{ |
| | \begin{aligned} |
| | u&=3x^2 \quad \quad dv=\sin(x) \\ |
| | du&=6x \quad \quad v=-\cos(x) |
| | \end{aligned}} |
| | \,dx= x^3\sin(x)-\bigg[3x^2-\cos(x)-\int_{0}^{\pi}-6x\cos(x)\,dx\bigg]\\ |
| | =&x^3\sin(x)-3x^2\cos(x)-\int_{0}^{\pi}\underbrace{6x\cos(x)}_{ |
| | \begin{aligned} |
| | u&=6x \quad \quad dv=cos(x) \\ |
| | du&=6 \quad \quad v=sin(x) |
| | \end{aligned}} |
| | =x^3\sin(x)+3x^2\cos(x)-\bigg[6x\sin(x)-\int_{0}^{\pi} 6\sin(x)\,dx\bigg]= x^3sin(x)+3x^2\cos(x)-6x\sin(x)-6\cos(x)\bigg|_{0}^{\pi} |
| | \end{align} |
| | </math> |
| | <math> |
| | \begin{align} |
| | &=[(\pi^3\cdot\sin(\pi)+3(\pi)^2\cdot\cos(\pi)-6(\pi)\cdot\sin(\pi)-6\cos(\pi))-(0^3\cdot\sin(0)+3(0)^2\cdot\cos(0)-6(0)\cdot\sin(0)-6\cos(0))] \\ |
| | &=[(\pi\cdot 0 +3\pi^2 \cdot -1 -6 \cdot -1)+6 =-3\pi^2+6+6 = -3\pi^2+12 = -17.60 |
| | \end{align} |
| | </math> |
Latest revision as of 20:31, 1 December 2022
![{\displaystyle {\begin{aligned}&\int _{0}^{\pi }\underbrace {x^{3}\cos(x)} _{\begin{aligned}u&=x^{3}\quad \quad dv=\cos(x)\\dv&=3x^{2}\quad \quad v=\sin(x)\end{aligned}}\,dx=x^{3}\sin(x)-\int _{0}^{\pi }\underbrace {3x^{2}\sin(x)} _{\begin{aligned}u&=3x^{2}\quad \quad dv=\sin(x)\\du&=6x\quad \quad v=-\cos(x)\end{aligned}}\,dx=x^{3}\sin(x)-{\bigg [}3x^{2}-\cos(x)-\int _{0}^{\pi }-6x\cos(x)\,dx{\bigg ]}\\=&x^{3}\sin(x)-3x^{2}\cos(x)-\int _{0}^{\pi }\underbrace {6x\cos(x)} _{\begin{aligned}u&=6x\quad \quad dv=cos(x)\\du&=6\quad \quad v=sin(x)\end{aligned}}=x^{3}\sin(x)+3x^{2}\cos(x)-{\bigg [}6x\sin(x)-\int _{0}^{\pi }6\sin(x)\,dx{\bigg ]}=x^{3}sin(x)+3x^{2}\cos(x)-6x\sin(x)-6\cos(x){\bigg |}_{0}^{\pi }\end{aligned}}}](https://en.wikipedia.org/api/rest_v1/media/math/render/svg/53267d38fca4fc2ce71dfcdb3206afb87f073752)
![{\displaystyle {\begin{aligned}&=[(\pi ^{3}\cdot \sin(\pi )+3(\pi )^{2}\cdot \cos(\pi )-6(\pi )\cdot \sin(\pi )-6\cos(\pi ))-(0^{3}\cdot \sin(0)+3(0)^{2}\cdot \cos(0)-6(0)\cdot \sin(0)-6\cos(0))]\\&=[(\pi \cdot 0+3\pi ^{2}\cdot -1-6\cdot -1)+6=-3\pi ^{2}+6+6=-3\pi ^{2}+12=-17.60\end{aligned}}}](https://en.wikipedia.org/api/rest_v1/media/math/render/svg/b9b759b1ed4f6083e7fe23c9be130a55e99cf666)