Find all points of intersection of the given curves. (Assume 0 ≤ ? ≤ 2? and r ≥ 0. Order your answers from smallest to largest ?. If an intersection occurs at the pole, enter POLE in the first answer blank.) r = 4 sin(2?), r = 2 (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)__ (r, ?) = __(_________)__ (r, ?) = __(_________)__
Find all points of intersection of the given curves. (Assume 0 ≤ ? ≤ 2? and r ≥ 0. Order your answers from smallest to largest ?. If an intersection occurs at the pole, enter POLE in the first answer blank.) r = 4 sin(2?), r = 2 (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)_ (r, ?) = _(_________)__ (r, ?) = __(_________)__ (r, ?) = __(_________)__
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter11: Topics From Analytic Geometry
Section11.4: Plane Curves And Parametric Equations
Problem 61E
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Find all points of intersection of the given curves. (Assume 0 ≤ ? ≤ 2? and r ≥ 0. Order your answers from smallest to largest ?. If an intersection occurs at the pole, enter POLE in the first answer blank.)
r = 4 sin(2?), r = 2
(r, ?) = _(_________)_
(r, ?) = _(_________)_
(r, ?) = _(_________)_
(r, ?) = _(_________)_
(r, ?) = _(_________)_
(r, ?) = _(_________)__
(r, ?) = __(_________)__
(r, ?) = __(_________)__
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