Find the amplitude, period, and phase-shift. Use this information to graph the function over a full...

State the vertical shift, amplitude, period, and phase shift of each function. Then graph the function....

State the vertical shift, amplitude, period, and phase shift of each function. Then graph the function. 11.y=4/3sinθ+3 12.y=3cos[2(θ+60°)]-1

Determine the amplitude, the period and the phase shift of the function 1.  y = 1/3 cos...

Determine the amplitude, the period and the phase shift of the function 1.  y = 1/3 cos ( -3 x ) + 1 2. y =   cos ( - 2 PIE x ) + 2 3. y = ½ sin (2 PIE x + PIE ) 4. y = - ¼ cos (PIE x - 4 ) 5. y = 2 sin (2 PIE x + 1 ) 6. y = ½ sin ( 2 x - PIE/4 )

Find the absolute maximum and minimum values of f(x)= −x^3−3x^2+4x+3, if any, over the interval (−∞,+∞)(−∞,+∞)....

Find the absolute maximum and minimum values of f(x)= −x^3−3x^2+4x+3, if any, over the interval (−∞,+∞)(−∞,+∞). I know it doesn't have absolute maxima and minima but where do they occur? In other words x= ? for the maxima and minima?

find the amplitude of y= -4 sin (3x + pie). find the period of y= 3csc...

find the amplitude of y= -4 sin (3x + pie). find the period of y= 3csc 2/3 x find the phase shift of the function y= -5 sin (2x - pie/2) find the exact value of the real number y. Use radian measure y= csc^-1 (2). give the degree measure of theta use trig chart. theta = cos ^-1 (square root 2/2) use a calculator to give the value in degrees. sin^-1 (-0.4848) use a calculator to give the real...

Given the function g(x) = x3-3x + 1, use the first and second derivative tests to...

Given the function g(x) = x3-3x + 1, use the first and second derivative tests to (a) Find the intervals where g(x) is increasing and decreasing. (b) Find the points where the function reaches all realtive maxima and minima. (c) Determine the intervals for which g(x) is concave up and concave down. (d) Determine all points of inflection for g(x). (e) Graph g(x). Label your axes, extrema, and point(s) of inflection.

Use the following information to graph the function f over the closed interval [-2,5]. I.) The...

Use the following information to graph the function f over the closed interval [-2,5]. I.) The graph of f is made of closed line segments joined end to end. II.) The graph starts at the point (-2,2) III.) On the interval (-2,0) f’(x) = -2; on the interval (0,1) f’(x) = 1; on the interval (1,3) f’(x) = 0; on the interval (3,5) f’(x) = 2

1. Find the amplitude-phase form of the Fourier series of the time function below by hand....

1. Find the amplitude-phase form of the Fourier series of the time function below by hand. Show your work and box your answer. f(t)=-2t for -0.5<t<0 and f(t)=2t for 0<t<0.5. f(t) is periodic with period T=1

Analyze and sketch the graph of the function f(x) = (x − 4)2/3 (a) Determine the...

Analyze and sketch the graph of the function f(x) = (x − 4)2/3 (a) Determine the intervals on which f(x) is increasing / decreasing (b) Determine if any critical values correspond to a relative maxima / minima (c) Find possible inflection points (d) Determine intervals where f(x) is concave up / down

3 parts use these answers/rules Find the relative extrema of the function Specifically: The relative maxima...

3 parts use these answers/rules Find the relative extrema of the function Specifically: The relative maxima of f occur at x = The relative minima of f occur at x = The value of f at its relative minimum is the value of f at its relative maximum is Notes: Your answer should be a comma-separated list of values or the word "none". part 1) f(x)=x^2+6x+5 part 2) f(x)= x^3-18x+5 part 3) f(x)=8x^4−4x^2+8

y=0.1sin0.4(x-pi/6) Amplitude is 0.1 phase shift is= pi/6 how come period is 5pi I know equation...

y=0.1sin0.4(x-pi/6) Amplitude is 0.1 phase shift is= pi/6 how come period is 5pi I know equation 2pi/0.4