c. Sketch the curve and find the area of the region that lies outside r 2sin0...
Find the area of the region that lies inside the first curve and outside the second curve. r2=72 cos(28), r=6
1. Find the area (exact value) of the region that lies inside the curve r=5cosθ and outside the curve r=2+cosθ 2. Find the area (exact value) of the region that lies inside between curve r=5cosθ and r=2+cosθ 8. Find the area (exact value) of the region that lies inside the curve r = 5cose and outside the curve r = 2 + cose. 9. Find the area (exact value) of the region that lies inside both curves r = 5cose...
Find the area of the region that lies inside the first curve and outside the second curve. r = 3 - 3 sin(θ), r = 3 Find the exact length of the curve. Use a graph to determine the parameter interval. r = cos2(θ/2)
Find the area of the following region. The region outside the circle r = 2 and inside the circle r = - 4 cos 0 . The area of the region is square units. (Type an exact answer.)
6(6pts) Sketch the curve and find the area it encloses. (SETUP DO NOT EVALUATE) r=1-2 cos 76pts) Find the area of the region that lies outside the first curves and inside the second curve. (SETUP DO NOT EVALUATE) r = 2 and r = 4cos
4. Consider the area of the region that lies inside the curve given in polar form) by r = 6 sin(@) and outside the cardioid given by r=2+2 sin(0). (a) (3pts) Set up but do not evaluate an integral(s) which represents the area of this region. (b) (3.5pts) Evaluate this integral to determine the exact area of this region. (Hint: you will need to use a trig, identity)
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...
(15 points) Find the centre of the region in the xy-plane that lies inside the cardioid r = a(1 + cos θ) and outside the circle r-a if the mass density is p(,y)-1 (15 points) Find the centre of the region in the xy-plane that lies inside the cardioid r = a(1 + cos θ) and outside the circle r-a if the mass density is p(,y)-1
Question 3: (15 Marks) Find centroid for the region R, that lies outside r - 2 and inside r 3 + 3 sin 6 Hint: Sketch graph in the range of 0e e <2T Question 3: (15 Marks) Find centroid for the region R, that lies outside r - 2 and inside r 3 + 3 sin 6 Hint: Sketch graph in the range of 0e e
13. Find the area of the shaded region r2 = sin(2θ) 14. Find the area of the shaded region. r = 4 + 3sin(θ) 18. Find the area of the region that lies inside the first curve and outside the second curve. r = 7cos(θ), r = 3+ cos(θ) Need Help? Read It ss View Pre19. Find the area of the region that lies inside both curves. r = 5 sin(θ), r = 5 cos(θ)