do now - #4 on p.328
DESCRIPTION
Do Now - #4 on p.328. Evaluate:. Integration by parts:. Now, use substitution to evaluate the new integral. Do Now - #4 on p.328. Evaluate:. Solving for the Unknown Integral. Section 6.3b. Practice Problems. Evaluate. Practice Problems. Evaluate. Now our unknown integral appears - PowerPoint PPT PresentationTRANSCRIPT
![Page 1: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/1.jpg)
Do Now - #4 on p.328Evaluate: 1tan ydy
1tanu y dv dy
2
11
du dyy
v y
1 12tan tan
1yydy y y dyy
Integration by parts:
Now, use substitution to evaluate the new integral
![Page 2: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/2.jpg)
Do Now - #4 on p.328Evaluate: 1tan ydy
1 12tan tan
1yydy y y dyy
21w y 2dw ydy
12dw ydy1 1 1tan
2y y dw
w 1 1tan ln
2y y w C
1 21tan ln 12
y y y C
![Page 3: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/3.jpg)
Solving for the Unknown IntegralSection 6.3b
![Page 4: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/4.jpg)
Practice ProblemsEvaluate cosxe xdx
xu exdu e dx
cosdv xdxsinv x
cos sin sinx x xe xdx e x e xdx xu exdu e dx
sindv xdxcosv x
sin cos cosx x xe x e x x e dx
![Page 5: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/5.jpg)
Practice ProblemsEvaluate cosxe xdx
sin cos cosx x xe x e x x e dx cos sin cos cosx x x xe xdx e x e x e xdx
Now our unknown integral appearson both sides of the equation!!!
2 cos sin cosx x xe xdx e x e x C Combine like terms:
![Page 6: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/6.jpg)
Practice ProblemsEvaluate cosxe xdx2 cos sin cosx x xe xdx e x e x C
Final Answer:sin coscos
2
x xx e x e xe xdx C
Note: When using this technique, it is usually agood idea to keep the same choices for u and dvduring each step of the problem…
![Page 7: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/7.jpg)
Practice Problems
Solve the differential equation:2 lndy x x
dx
lnu x 1du dxx
2dv x dx 313
v x
2 lndy dx x x dxdx
2 lny x x dx
Use I.B.P. to evaluate this integral:
![Page 8: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/8.jpg)
Practice Problems
Solve the differential equation:2 lndy x x
dx
2 lny x x dx 3 31 1 1ln
3 3x x x dx
x
3 21 1ln3 3x x x dx 3 31 1ln
3 9x x x C
![Page 9: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/9.jpg)
Practice ProblemsEvaluate
2 2
3sin 2xe xdx
2xu e
22 xdu e dx
sin 2dv xdx1 cos22
v x
2 21 1cos 2 cos2 22 2
x xe x x e dx 2 21 cos2 cos2
2x xe x e xdx
![Page 10: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/10.jpg)
Practice ProblemsEvaluate
2 2
3sin 2xe xdx
2xu e22 xdu e dx
cos 2dv xdx1 sin 22
v x
2 21 cos2 cos22
x xe x e xdx
21 cos 22
xe x
2 21 1sin 2 sin 2 22 2
x xe x x e dx
![Page 11: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/11.jpg)
Practice ProblemsEvaluate
2 2
3sin 2xe xdx
2 21 cos2 sin 2 sin 2
2x xe x x e xdx
2 212 sin 2 cos 2 sin 22
x xe xdx e x x C
2 21sin 2 cos2 sin 24
x xe xdx e x x C Now, to apply the limits of integration…
![Page 12: Do Now - #4 on p.328](https://reader036.vdocuments.site/reader036/viewer/2022062323/56816276550346895dd2e790/html5/thumbnails/12.jpg)
Practice ProblemsEvaluate
2 2
3sin 2xe xdx
22
3
1 cos 2 sin 24
xe x x
4 61 1cos 4 sin 4 cos 6 sin 64 4e e
125.028 Verify numerically!!!