If a circle C with radius 1 rolls along the outside of the circle x^(2) + y^(2) = 25, a fixed point P on C traces out a curve called an epicycloid, with parametric equations x = 6 cos(t) − cos(6t), y = 6 sin(t) − sin(6t). Use one of the formulas below to find the area it encloses. A = C x dy = − c y dx = 1/2 C x dy − y dx

If a circle C with radius 1 rolls along the outside of the circle x2 + y2-25, a fixed point P on C traces out a curve called an epicycloid, with parametric equations x-6 cos(t)-cos(6t), y = 6 sin(t)-sin(6).

4. If a circle C of radius 1 rolls along the outside of the circle x* +y*-16, a fixed point P on C traces out a curve called an epicycloid (see the picture below) with parametric equations x-5 cos t-cos St, y-5 sin t-sin 51 for 0S1 2, . Find the area of this epicycloid sin (a -br sin (a +br Hint: cos ax cos bx dr + C (a and b are constants) may be 2a-2b 2a2b helpful for the integration. 10 -10 10 -10