Consider the rose curve with polar equation r = cos(20), whose graph is shown below. 0.5 -0.8-0.4서 20.40.60.8 0.5 Neglecting the symmetries of the curve, determine the angles a and B in [0, 27) such that the integral (cos(20))2 do would specifically find the area of the rose petal that points downwards. a = Number B = Number
Consider the rose curve with polar equation r = cos(20), whose graph is shown below. 0.5 -0.8-0.4서 20.40.60.8 0.5 Neglecting the symmetries of the curve, determine the angles a and B in [0, 27) such that the integral (cos(20))2 do would specifically find the area of the rose petal that points downwards. a = Number B = Number
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter11: Topics From Analytic Geometry
Section: Chapter Questions
Problem 64RE
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