what is the integral for the common area between the circles r = √3sin(theta) and r = cos(theta) ?
what is the integral for the common area between the circles r = √3sin(theta) and r...
convert to rectangular form: r=3sin(theta)
Use a double integral to find the area of a petal of the rose r =? 2 (cos 3?(theta))
Sketch the region and use a double integral to find the area of the region inside both the cardioid r=1+sin(theta) and r=1+cos(theta). I have worked through the problem twice and keep getting (3pi/4 - sqrt(2)). Can someone please explain how you arrive at, what they say, is the correct answer? Sketch the region and use a double integral to find its area The region inside both the cardioid r= 1 + sin 0 and the cardioid r= 1 + cosa...
Set up and evaluate the double integral using polar coordinates f(x,y) = 8-y; R is the region enclosed by the circles with polar equations r=cos(theta) and r=3cos(theta). I am struggling with understanding how to determine the interval for theta. The answer key says 0<= theta <= pi but I don't understand why. Please elaborate on this when solving.
area inside circle of parametric curves Problem 7 (a) Find the area inside circle r. 2cos θ und outside r 1 ern (b) Find the area outside circle r-2 cos θ and inside r-1. Find the area of the region common in circles r- 2cos and r1. (c) Problem 7 (a) Find the area inside circle r. 2cos θ und outside r 1 ern (b) Find the area outside circle r-2 cos θ and inside r-1. Find the area of...
d r? + ind the area of the region shared by Consider the circles r? both circles.
8. Set up a double integral to represent the area of the region inside the circle r= 3sin 0 and outside the cardioid r=1+sin 8. Use technology to evaluate the integral. Give the exact answer.
Use a double integral to find the area of the region bounded by the cardioid r= -2(1 - cos 6). Set up the double integral as efficiently as possible, in polar coordinates, that is used to find the area. r drdo (Type exact answers, using a as needed.)
Please step by step double integral to find the area of the region R enclosed between the line y = x and the parabola y = x-
Consider the polar graph r=1-sin theta and r= sin theta, shown below. Please help with B, D, and E 5. Consider the polar graphs r = 1-sin 0 and r = sin 0, shown below. a. Find the polar coordinates (r, 2) for all points of intersection on the figure. Hint: Not all points can be found algebraically. For b.-d., set up an integral that represents the area of the indicated region. b. The region inside of the circle, but...