Graph the piecewise function. (Apts) -8²+2 13. h(x) ix-21 If 1<x<3 -6 if x 25 b....
2. Graph EACH piecewise function. (3.5pts) A(x) = -2 135x<7 -10 if x 11 b. What is h(x) = 0 (Ipt) c. What is the range? (Ipt) d. What is the domain? (1 pt) e. Is there a local max, or min, and where? (Ipt) f. Where is the function increasing (1 pt) & Where is the function decreasing (Ipt) h. What is (0) (1 pt)
Piecewise Functions Graph: f(x) = x +5 if x 21 if x< 1 Calculate: 11) f(1) = 12) f(-3) = 13) f(2)= Functions: 1) Find g(2)= 1963 2) Find x-intercepts 3) Find y intercept 4) Find Domain of g 5) Find Range of g 6) For what value of x is g(x) = 0? 7) For what value of x is g(x) = 2? 8) Interval where g is decreasing - 9) Relative Maximum Point
10. Graph the piecewise-defined function on groph paper 0.75x-7if x <-6 -0.5 x2 + 8 f(x)- if-63 x <4
Sketch a graph of the piecewise defined function. sz if x <3 f(x) = x 1 if x 2 3
Sketch a graph of the following Piecewise Function 7 if < - 6 f(2) if 6< < 5 2 if x> 5 5 84 7 6 2+ 8 -6 -5-4-3 -2 7 7 8 4 5 6 Movie Night 7/5-50 West Street Condominium 50 West St. New York, NY
Compute f(3) in the piecewise function f(x) = -1 <1 3.22 +2 121
15. For the piecewise function, find the values h(-4), h(0), (5), and h(8). -4x -9, for x < -3 h(x) = 5, for-3x<5 ( x +3, for x 25 16. Determine the symmetries, if any, for the graph of the given relation. 3x + 2 = y2 17. The weight, W, that a horizontal beam can support varies inversely as the length, L, of the beam. Suppose that a 10-m beam can support 1400 Kg. How many kilograms can a...
-105 5 10 he graph of a piecewise function. f(x), is depicted above. Find its equation: f(x) = 3 < x <= for x >
How do you do this problem? 3. Let h be a function whose first derivative is h/(x) = S:* 3(In( + 3))? dt. For 6 < x < 12, which of the following is true? Oh is increasing and the graph of his concave down. Oh is increasing and the graph of h is concave up. Oh is decreasing and the graph of h is concave down. 0 h is decreasing and the graph of h is concave up. Oh...
Given the following piecewise function, evaluate f(2). 2.1 <-3 f(x) = { -3x +1 -3 <<< 2 22 - 2 2 << Do not include "f(2)="in your answer.