Find all points of intersection of the given curves. (Assume 0 Sosn. Order your answers from...
Find all points of intersection of the given curves. (Assume o s o < 20 and r20. Order your answers from smallest to largest 0. If an intersection occurs at the pole, enter POLE in the first answer blank.) sin(O), sin(20) r = r = (r, 0) = ( pole (5,0) = ( 1 2 TT 2 4 (r, 0) = Need Help? Watch It Talk to a Tutor Submit Answer
4. (-/8 Points) DETAILS SCALCET8 10.4.039.073 Submissions US Find all points of intersection of the given curves. (Assume Oses and r20. Order your answers from smallest to largest of an intersection occurs at the pole, enter POLE in the first answer blank.) sin(20). Need Help?
Find all points of intersection of the given curves. (Enter your answers from smallest to largest θ.)r = sin(3θ)r = cos(3θ)0 < θ < π(,)( ,)(,)
Find the exact polar coordinates of the points of intersection of the following pairs of polar equations. Remember to check for any intersections at the pole. (Assume 0 s 0 < 21. Follow the guidelines outlined in the text for finding the points of intersection of graphs of polar equations. If the pole is a solution, enter POLE in the final blank. Order your answers from smallest to largest r, then from smallest to largest 6.) r = 3 cos(O)...
a. Find all the intersection points of the following curves. b. Find the area of the entire region that lies within both curves. r = 7 + 7 sin 0 and r = 7 + 7 cose a. Identify all of intersection points. (Type an ordered pair. Use a comma to separate answers as needed. Type an exact answer, using a as needed.) b. The area of the entire region that lies within both curves is (Type an exact answer.)...
. Find the area of the entire region The intersection points of the following curves are (0,0) and that lies within both curves. r= 18 sin 0 and r= 18 cos | The area of the region that lies within both curves is (Type an exact answer, using a as needed.) Find the area of the region common to the circle r=5 and the cardioid r=5(1 - cos 0). The area shared by the circle and the cardioid is (Type...
Find all solutions of the equation in the interval [0°, 360°). (Enter your answers from smallest to largest.) sin(x) X = X =
Find all points (if any) of horizontal and vertical tangency to the curve. Use a graphing utility to confirm your results. (Order your answers from smallest to largest x, then from smallest to largest y. If an answer does not exist, enter DNE.) x = cos , y = 2 sin 20 Horizontal tangents (x,y) - Vertical tangents (x,y) - -(( (x,y) -
Chapter 13, Section 13.7, Question 017 (a) Find all points of intersection of the line x = -2+1, y = 3 +t, z = 2t +21 and the surface z= x2 + y2 (b) At each point of intersection, find the cosine of the acute angle between the given line and the line normal to the surface. Enter your answers in order of ascending x-coordinate value. (a) (b) (x1,91,21) = (003 Edit cos 01 = ? Edit (x2, Y2, 22)...
ri = 2 sin 0 and r2 = 2 sin 20 We were unable to transcribe this imageFind the points of intersections of the two curves. Represent your answer in polar coordinates where r >0 and 0 << 21. (1,0) = _ (r, 0) = _ (7,0) = __ (1,0) = If r> 0 from your answers above, convert them into r <0 and 0 <O< 26 (If r = 0, you don't need to convert it. You may not...