Find the area enclosed by the function r = 1 – cos θ

Sketch the curve. r = 4 + 2 cos(θ) and find area enclosed by it.

Sketch the curve. r = 4 + 2 cos(θ) and find area enclosed by it.

Find the area of the region within the cardioid r = 1 − cos θ for...

Find the area of the region within the cardioid r = 1 − cos θ for θ ∈ [0, π /2]

Use a double integral to find the area inside the circle r = cos θ and...

Use a double integral to find the area inside the circle r = cos θ and outside the cardioid r = 1 − cos θ.

Find the area that lies simultaneously outside the polar curve r = cos θ and inside...

Find the area that lies simultaneously outside the polar curve r = cos θ and inside the polar curve r = 1 + cos θ.

Find the area of the region that is inside the curve r = 2 cos θ...

Find the area of the region that is inside the curve r = 2 cos θ + 2 sin θ and that is to the left of the y-axis.

Find the area of the region soecified. The region enclosed by the curve r= 5 +cos(theta)

Find the area of the region soecified. The region enclosed by the curve r= 5 +cos(theta)

Find the area of the region common to the interiors of the cardioids r =1−sin θ...

Find the area of the region common to the interiors of the cardioids r =1−sin θ and r=1+cos θ.

Find the area of the region inside the circle r = sin θ but outside the...

Find the area of the region inside the circle r = sin θ but outside the cardioid r = 1 – cos θ. Hint, use an identity for cos 2θ.

Graph the polar equations: r = 1 + cos θ and r = 1 + sin...

Graph the polar equations: r = 1 + cos θ and r = 1 + sin θ. Find where they intersect (in polar or rectangular coordinates) and set up the integral to find the area inside both curves?

1. Sketch the polar function r = (θ − π/4)(θ − 3π/4) on the interval 0...

1. Sketch the polar function r = (θ − π/4)(θ − 3π/4) on the interval 0 ≤ θ ≤ 2π. Then find all lines tangent to this polar function at the point (0, 0). 2. Find the area of the region enclosed by one loop of the curve r = 5 sin(4θ). 3. Use the Monotone Sequence Theorem to determine that the following sequence converges: an = 1/ 2n+3 .