12. Convert to polar coordinates and evaluate: 1 LL62 +7) dydx + y2 +
5.Use polar coordinates system to evaluate: x2 + y2)dydx , R is the region enclosed by 0 <x< 1 and, -x sy sx
Evaluate the iterated integral by converting to polar coordinates points) | sin(x² + y2)dydx T SHARE Y COMO
Using polar coordinates, evaluate the integral so Som x(x2 + y²) dydx. Be careful to check that the limits of integration you use correspond to the region under consideration.
11. Use polar coordinates to evaluate the integral 1,8-2V(+ y2)<dy dx
Convert the equation to polar coordinates. x2 + y2 = 7y + X Sketch the graph.
Problem #2: Evaluate the following by changing to polar coordinates. 81 - y2 81 - y2 8 + x2 + y2 dx dy + 8 + x2 + 16 - y2 Problem #2: Enter your answer symbolically, as in these examples
#49,53,57 3- lar coordinates to polar coordinates will Polar Coordinates Convert blar coordinates with r> 0 and the ove describe of the the rectangular con 050<27. 37. (-1,1) be app 39. (V8, V8) 41. (3.4) 38. (3V3,-3) 40. (-V6, -V2) 42. (1,-2) 44. (0, -V3) your a (a) Yo (b) YO 43. (-6,0) Rectangular Equations to Polar Equations Convert the equation to polar form. 45. x = y *.47. y = x² 49. x = 4 46. x² + y2...
Please quickly and clear Given 11, 6**** 1x2 + y2 dydx. Rewrite the integral in polar coordinates. Select one: radrde O b. Card ST S" Srdr ST rdrde rPdrdo O d.
Q4: Use polar coordinates to evaluate x2 - y2 dA, where R is the region in the first V9- quadrant within the circle x2 + y2-9.
Convert the following integral to an integral in polar coordinates. Je V x2 + y2 d xd y where Ris 45x+yºs -) SºS *"rar de