8. (a) Use a graphing utility to graph the curve represented by the following polar equation: r(e)-2cos(3) over the interval 0s0<t. b) Find the area of one petal of this curve. (c) Shade the i...
please include the graph 12. la) Use a graphing utility to graph the curve represented by the following polar equation: r(θ)-1-cos(θ) over the interval 0 ses 2. (b) Find the arc length of this curve over the interval with your notation, show orientation arrows on your curve, and show your steps clearly.) (b) are length of this curve over the interval 0 0 S 2,- 12. la) Use a graphing utility to graph the curve represented by the following polar...
(a) Use a graphing utility to graph the curve represented by the following parametric 6. x y over the interval -2sts2. (b) Write an integral that represents -3t-1 the arc length of this curve over the interval -2sts2. (Do not attempt to evaluate this integral algebraically.) (c) Use the numerical integration capability of a graphing utility to approximate the value of this integral. Round your result to the nearest tenth. (Be careful with your notation, show orientation arrows on your...
6. (a) Use a graphing utility to graph the curve represented by the following parametric x=езі, over the interval-2sts2.(b) Write an integral that represents tions: the arc length of this curve over the interval -2sts2. (Do not attempt to evaluate this integral algebraically) (e) Use the numerical integration capability of a the value of this integral. Round your result to the nearest tenth (Be careful with your notation, show orientation arrous on your curve, and show your steps clearly.) utility...
Question 8 Select the curve generated by the polar equation: r=sin(20) Then find the area enclosed by one petal & Q Q B Q Area: • Question 9 Write the power series representation of the following function and find the interval of convergence of the power series (in interval notation) f(0) = 27 6 + 73 00 f(x) = n=0 Interval of Convergence:
Find the area of the surface generated by revolving the equation r-2+2cos(0) about the polar axis. Find the length of the curve r 6; from 8-0 to θ Find the area of the surface generated by revolving the equation r-2+2cos(0) about the polar axis. Find the length of the curve r 6; from 8-0 to θ
I need the area between the loops 4 points | Previous Answers LarCalc9 10.5.022 e a graphing utility to graph the polar equation. r-8(1 + 2 sin(θ)) 2아 15 WebAssign Plot 10 10 O 10 5 4 points | Previous Answers LarCalc9 10.5.022 e a graphing utility to graph the polar equation. r-8(1 + 2 sin(θ)) 2아 15 WebAssign Plot 10 10 O 10 5
2 photos but they are the one question If a curve whose polar equation is r = f() is rotated about the pole though an angle $, then an equation for the rotated curve is r = f(-6). write an equation for the limaçon r = 3 - sin after it has been rotated counterclockwise by the given amount. Use a graphing utility to graph the rotated limaçon for 8 = 7/4, e = 7/2, 8-, and 0 = 3/2....
yu d nit answers by quetion arts. The number of submissions rmaining for each qusstion part only hang t is used lor your scor best Use a graphing ubility to graph the polar equation r 8(1+2 sin(9) 1S 20 10 yu d nit answers by quetion arts. The number of submissions rmaining for each qusstion part only hang t is used lor your scor best Use a graphing ubility to graph the polar equation r 8(1+2 sin(9) 1S 20 10
all parts please PART II 7) (8 pts) Given the polar equation r = 6 sin θ, 0 θ π a) Graph and find the length of the graph geometrically. b) Find the length of the graph by integrating. 8.) (9 pts) Given the four-leaved rose r 2sin(26). a) Show the symmetries. b) Find the tangents of the leaf through the pole to determine the limits of integration. c) Find the area of one leaf. PART II 7) (8 pts)...
16 cos(20). 3. a. Sketch the Polar equation Use the method LI max, r- o) CSİ Sct.e Calculate dy/dx at theta = pi/6. CamScanner c. Calculate the area enclosed by one leaf of the graph. 16 cos(20). 3. a. Sketch the Polar equation Use the method LI max, r- o) CSİ Sct.e Calculate dy/dx at theta = pi/6. CamScanner c. Calculate the area enclosed by one leaf of the graph.