Evaluate the function for the given values of x. (-5x+4, for x<-1 x) = ), 2...
Given the following piecewise function, evaluate f(-5). I < -4 f(x) = . 1-42 -3x (x² – 2 -4 < x < 0 0<x
Evaluate the piecewise function at the given values of the independent variable. x +4 if x 2 -4 g(x) = (x+4) if x <-4 (a) g(0)=□ (b) g(-7)=□ (c) g(1)=□
(1 point) Consider the function f(x) = xe-5x, 0<x< 2. This function has an absolute minimum value equal to: which is attained at x = and an absolute maximum value equal to: 1/(5e) which is attained at x =
Evaluate the piecewise defined function at the indicated values (x2 f(x) if x -1 6x if 1 < x s 1 = -1 if x > 1 f(-3) (- 3 2 f(-1) f(0) = f(30) =
Q1 Given, f(x) = {x +1, 2 5x<4 4,0 < x < 2 (a) Sketch the graph of f(x) and its even half-range expansion. Then sketch THREE (3) full periods of the periodic function in the interval – 12 < x < 12. (b) Determine the Fourier cosine coefficients of Ql(a). (c) Write out f(x) in terms of Fourier coefficients you have found in Q1(b).
4. Given (x)=x-5x + 5x5x2 - 6x , write a symbolic MATLAB script that: (a) plots g(x) in the interval -2 <x< 4, (b) finds and display all of its maxima and minima, (c) evaluates g(x) at the following values of x: -21, 21, 0, 1, 2st and displays the five results. tidad
– 5x – 2 2 <1 Given the function t(x) 4.x2 - 6x +3 1< I< 5 - 3+1 I > 5 Calculate the following values: t(0) t(5) = t(2) = t(10) t(9) = t(1) =
Evaluate the piecewise-defined function for the given values. f(x) = 4x for x 20 - 4x for x < 0 Find f(1), f(2), f(-1), and f(-2). f(1) f(2) f(-1) = f(-2) =
Evaluate the piecewise function at the given values of the independent variable. 3x + 3 if x < 0 f(x) = X +5 if x20 (a) f(-1) (b) f(0) (c) f(3) (a) f(-1)=0 (b) f(0) = (c) f(3) =
Given, f(x) = {x #1, 2 5x<4 4,0<x< 2 (a) Sketch the graph of f(x) and its even half-range expansion. Then sketch THREE (3) full periods of the periodic function in the interval -12 < x < 12. (6 marks) (b) Determine the Fourier cosine coefficients of Ql(a). (10 marks)