In Exercises 9-22, change the Cartesian
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- #11 Please show as many steps as possible and explain in detail.arrow_forwardEvaluating Polar Integrals In Exercises 9-22, change the Cartesian integral into an equivalent polar integral. Then evaluate the polar integral. μl pV²-3² 11 12. Jo Jo ra I √a²-x² тугилау dy dx JOJOarrow_forwardEvaluate the iterated integral by converting to polar coordinates. 2х - х2 4 V x2 + y2 dy dx Need Help? Read Itarrow_forward
- ln (3+j4) express in polar formarrow_forwardConvert the integral to polar coordinates and evaluatearrow_forwardJo Jo (3_ p2) dr d0 Which of the following is equivalent to the following integral when converted to polar coordinates? 2 V4-a2 (4 – æ² – y³ ) dy dæ -2 J0 | (4r – r³) dr d0 c2 (4 – r² ) dr d0 7T (4r – p³) dr d0 (4 – r2) dr dearrow_forward
- ull zain IQ 8:59 AM 36% Q2.jpg Q2: a) Use the polar coordinate to find the integral | (x²+y²) dxdy 1/16 1/2 b) By using the change of order evaluate the integral cos(167x') dxdy 0 yV4arrow_forwardSolve ? in 15 minutes and get the thumbs uparrow_forward(1 point) Evaluate the iterated integral by converting to polar coordinates. NOTE: When typing your answers use "th" for 0. /6-y2 2x + 4y dx dy Σ dr de = where a = Σ b = pi/2 Σ c = Σ d = 6-y2 2x + 4y dx dy = Σ M M MMarrow_forward
- Q6 (a) Transform the integral to polar coordinates and calculate the integral. V 1 dxdy 1+x² +y²arrow_forwardEvaluate the complex integral if a = 4.2, b = 2 , v = 2, x = 3 and y = 5. Then, find the real component of the result. Round off answer to 2 decimal places.arrow_forwardTrue or False: It is possible to transform the integral So Lo x? + y?dædy to polar coordinates without expressing it as two integrals with different bounds. True O Falsearrow_forward
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