show full and complete procedure HANDWRITTEN only 3. The points of intersection of the cardioid r = 1+ sin and the spiral loop r = 20, −ñ/2 ≤osπ/2 can't be found exactly. Use a graphing device to find the approximate values of 0 at which theyintersect. Then use these values to estimate the area that lies inside both curves.

The given curves are cardioid r=1+sinθ and the spiral loop r=2θ, -π2≤θ≤π2.

The points of intersection of the cardioid r = 1 + sin 0 and the spiral loop r = 20,-π/2 ≤ 0≤ π/2 can't be found exactly. Use a graphing device to find the approximate values of 0 at which they intersect. Then use these values to estimate the area that lies inside both curves.

The points of intersection of the cardioid r = 1 + sin 0 and the spiral loop r = 20,-π/2 ≤ 0≤ π/2 can't be found exactly. Use a graphing device to find the approximate values of 0 at which they intersect. Then use these values to estimate the area that lies inside both curves.

Mathematics For Machine Technology

8th Edition

ISBN:9781337798310

Author:Peterson, John.

Publisher:Peterson, John.

Chapter65: Achievement Review—section Six

Section: Chapter Questions

Problem 44AR: Solve these prism and cylinder exercises. Where necessary, round the answers to 2 decimal places...

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Question

show full and complete procedure HANDWRITTEN only

3. The points of intersection of the cardioid r = 1+ sin and the spiral loop r = 20, −ñ/2 ≤os
π/2 can't be found exactly. Use a graphing device to find the approximate values of 0 at which they
intersect. Then use these values to estimate the area that lies inside both curves.

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