Transcript Slide 1
A circle is a set of points in the xy-plane that are a fixed distance r from a fixed point (h, k). The fixed distance r is called the radius, and the fixed point (h, k) is called the center of the circle. y (x, y) r (h, k) x The standard form of an equation of a circle with radius r and center (h, k) is x h 2 y k r 2 2 Graph (x 1) ( y 3) 16 by hand. 2 2 ( x 1) ( y 3) 16 2 2 ( x ( 1)) ( y 3) 4 2 2 ( x h) ( y k ) r 2 2 h = -1, k = 3, r = 4 Center: (-1, 3), Radius: 4 2 2 (-1, 7) y (3,3) (-5, 3) (-1,3) x (-1, -1) The general form of the equation of a circle is x y ax by c 0 2 2 Find the center and radius of 2 2 x y 4 x 8 y 5 0. x 4x y 8y 5 2 2 x 4 x_ y 8 y_ 5 2 2 2 4 4 2 2 8 16 2 x 4 x 4 y 8 y 16 5 4 16 2 2 x 2 y 4 2 2 25 Center: (2, -4), Radius: 5 f x y x y x X DOMAIN Y RANGE The domain of a function f is the set of real numbers such that the rule makes sense. Find the domain of the following functions: g ( x ) 3x 5x 1 3 Domain of g is all real numbers. 4 s( t ) t 1 Domain of s is t |t 1 . h( z ) z 2 z20 z 2 Domain of h is z| z 2 . Determine the domain, range, and intercepts of the following graph. y 4 0 -4 (2, 3) (1, 0) (0, -3) (4, 0) (10, 0) x A function f is even if for every number x in its domain the number -x is also in the domain and f(-x) = f(x) A function f is odd if for every number x in its domain the number -x is also in the domain and f(-x) = -f(x) Theorem A function is even if and only if its graph is symmetric with respect to the y-axis. A function is odd if and only if its graph is symmetric with respect to the origin. Symmetry examples (a) g( z) z 2 2 g(-z) = -(-z)2+2 =-z2+2 g ( z) g ( z) Even function, graph symmetric with respect to the y-axis. (b) f ( x) 4 x 3x 5 f ( x) 4( x)5 3( x) 4 x5 3x f ( x) f ( x) Not an even function f ( x) ( 4 x5 3x) 4 x5 3x f ( x) f ( x) Odd function, and the graph is symmetric with respect to the origin.