Determine the area where the regions of each graph overlap. r=2sin2θ r=1

Determine the area outside the black graph given by r(θ)=1+4cos(θ) and inside the red graph given...

Determine the area outside the black graph given by r(θ)=1+4cos(θ) and inside the red graph given by r(θ)=6cos(θ)

What is the area of the region common to two regions bounded by circle r=3, and...

What is the area of the region common to two regions bounded by circle r=3, and a cardioid r=3(1+sinθ)?

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?

A) Find an approximation of the area of the region R under the graph of the...

A) Find an approximation of the area of the region R under the graph of the function f on the interval [0, 2]. Use n = 5 subintervals. Choose the representative points to be the midpoints of the subintervals. f(x)=x^2+5 =_____ square units B) Find an approximation of the area of the region R under the graph of the function f on the interval [-1, 2]. Use n = 6 subintervals. Choose the representative points to be the left endpoints...

Find an approximation of the area of the region R under the graph of the function...

Find an approximation of the area of the region R under the graph of the function f on the interval [−1, 2]. Use n = 6 subintervals. Choose the representative points to be the left endpoints of the subintervals. f(x) = 5 − x2 _____ square units 2. Find the area (in square units) of the region under the graph of the function f on the interval [5, 6]. f(x) = 8ex − x ____square units Please answer both questions...

For the function ?(?) = ?^3 + 3x^2 + 1 determine All intervals where the graph...

For the function ?(?) = ?^3 + 3x^2 + 1 determine All intervals where the graph is concave up All intervals where the graph is concave down The coordinates of any points of inflection

Consider two curves: r =1, r = 2sindeta . Find the intersection area A. Show work...

Consider two curves: r =1, r = 2sindeta . Find the intersection area A. Show work and graph

a) Sketch the graph of r = 1 + sin2θ in polar coordinates with proper explanation....

a) Sketch the graph of r = 1 + sin2θ in polar coordinates with proper explanation. b) Find the area of the region that is inside of the cardioid r = 2+2sinθ and outside of the circle r = 3. Also find the area that is outside of the cardioid and inside of the circle. Hence, find the total area enclosed by these two curves.

Determine the interval(s) where r(t)=< t-1/((t^2) -1), 2e^3t , In(t+5) > is continuous. And Both r1(t)...

Determine the interval(s) where r(t)=< t-1/((t^2) -1), 2e^3t , In(t+5) > is continuous. And Both r1(t) = < t2, t4 > and  r2(t) = < t4, t8 > map out the same half parabolic graph. Notice that both r1(1) = < 1, 1 > and  r2(1) = < 1, 1 >. However, r'1(1) = < 2, 4 > and  r'2(1) = < 4, 8 >. Explain why the difference is logical and quantify the difference at t=1. Determine the interval(s) where r(t)=<t −...

Estimate the area under the graph of f ( x ) = 1 x + 1...

Estimate the area under the graph of f ( x ) = 1 x + 1 over the interval [ 3 , 5 ] using two hundred approximating rectangles and right endpoints R n = Repeat the approximation using left endpoints L n =