Transcript Chapter 8
Chapter 8 Polar Coordinates and Conics 8.1 Polar Coordinates In this section, we study polar coordinates and their relation to Cartesian coordinates. While a point in the plane has just one pair of Cartesian coordinates, it has infinitely many pairs of polar coordinates. To define polar coordinates, we first fix an origin O (called the pole) and an initial ray from O. Then each point P can be located by assigning to it a polar coordinate pair (r, ) in which r gives the directed distance from O to P and gives the directed angle from the initial ray to ray OP. Polar Coordinates Example Example Example Find all the polar coordinates of the point P(2, /6). Polar Equations and Graphs Examples (a) r=1 and r=-1 are equations for the circle of radius 1 centered at O. (b)= /6, = 7/6, = -5/6 are equations for the line Examples Graph the sets of points whose polar coordinates satisfy the following coordinates. a) 1 ≤ r ≤ 2 and 0 ≤ ≤ /2 b) -3 ≤ r ≤ 2 and = /4 c) r ≤ 0 and = /4 d) 2/3 ≤ ≤ 5/6 Relating Polar and Cartesian Coordinates Examples Examples Find a polar equation for the circle x2+(y-3)2=9 Examples Replace the following polar equations by equivalent Cartesian equations, and identify their graphs. (a) rcos = - 4 (b) r2 = 4rcos (c) r = 4/(2cos-sin) 8.2 Graphing in Polar Coordinates This section describes techniques for graphing equations in polar coordinates. The Following figure illustrates the standard polar coordinate tests for symmetry. Symmetry Tests for Polar Graphs Slope Note if the graph of r=f() passes through the origin at the value = 0, the slope of the curve there is tan 0. Example Graph the curve r=1-cos . Example Graph the curve r2=4cos . 8.3 Areas and Lengths in Polar Coordinates This section show how to calculate areas of plane regions and lengths of curves in polar coordinates. Area of the Fan-Shaped Region Between the Origin and the Curve Example Find the area of the region in the plane enclosed by the cardioid r=2(1+cos ). Area lying between two polar curves Area Formula Example Find the area of the region that lies inside the circle r=1 and outside the cardioid r=1-cos . Length of a Polar Curve Examples Find the length of the cardioid r=1-cos .