i need ans very very fast in 20 min and thank you | ᴅʏʙᴀʟᴀ ?✨؛ For the rose r = 4 sin(20) and circle r = 2 shown in the figure. Find the area inside the rose andoutside the circle using:Useful formulas:sin² (20)Double integration in Polar coordinatesSingle integration in Polar coordinates.=1- cos(48)2r=2D

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Answered: For the rose r = 4 sin(20) and circle r…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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If the integration by parts was used to integrate the product of e^ax and sin(bx) and cos(bx). e.g.∫e^ax cos(bx)dx and∫e^ax sin(bx)dx. Use Euler’s Identity to evaluate the integral∫e^ax cos(bx) dx+i∫e^ax sin(x) dx =∫e^ax(cos(bx) +isin(bx)) dx =∫e^(a+ib)x dx. Remember that i is a constant! Write the number i in polar complex form and use Euler’s identity to find√i. Hint: The two roots are evenly spaced around the unit circle and√i=i^1/2.
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For the rose r = 4 sin(20) and circle r = 2 shown in the figure. Find the area inside the rose and outside the circle using: Double integration in Polar coordinates Single integration in Polar coordinates. Useful formulas: sin² (20) 1 - cos(40) 2 r=2 B