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4. Find the amplitude, period, and horizontal shift of the function, and graph one complete period....
1. Find the amplitude, period, midline, phase shift and graph over one period the following function: f(x) = 5cos(2x − π). (Please don’t use a calculator, include details on the graph (points on both axes)) 2. Use the fundamental identities to fully simplify the expression: csc(x) + cos(x)cot(−x)
Find the amplitude, period, and phase shift of the function. y = 2 sin(x - 1) amplitude period phase shift Graph one complete period. у 1 V 2x 2x -2 0-31 31 Graph one complete period. 2 2x 21 0-31 AN - 2
please show all steps The graph of one complete period of a cosine curve is given. (a) Find the amplitude, period, and horizontal shift. (Assume the absolute value of the horizontal shift is less than the period.) amplitude period horizontal shift (b) Write an equation that represents the curve in the form y = a cos((x - b)).
Problem A Find the amplitude, the period in radians, the phase shift in radians, and the vertical shift. Then sketch the graph using radians. No computer graphs - sketches need to be on graph paper with properly labeled axes. 1 2) y-2sin 1) y=-2+..cos(30 + 35 4) yaz.cos(30 + )-1 + 1 3) y - 3sin 30+
6. (18pts) Find the amplitude, period, and phase shift. Then graph one cycle of the functions: a. y = 3 sin(2x) b. y = -2sin(2x - 2)
e the amplitude, period, phase shift, vertical shift. Find the coordinates of the first two points (xo, yo) and (x1,y) of the five key points for the trig function y-3 sin(x T) in one period starting with the phase shift. (No need to sketch the graph) e the amplitude, period, phase shift, vertical shift. Find the coordinates of the first two points (xo, yo) and (x1,y) of the five key points for the trig function y-3 sin(x T) in one...
The graph of one complete period of a sine curve is given. y 8 л -81 (a) Find the amplitude, period, and horizontal shift. (Assume the absolute value of the horizontal shift is less than the period.) amplitude period horizontal shift (b) Write an equation that represents the curve in the form y = a sin(k(x - b)). y =
Determine the amplitude, period, and phase shift of the function. Graph the function. y= sin (4x -21)
For y = 3 sin 2(x - pi/4) Show your work! a) Find the amplitude, period, and horizontal shift of the function b) Graph the function.
For each defined function, give the amplitude (A), period (P), vertical translation (V), and phase shift (PS), as applicable. Explain your reasoning. y = 4 + 4 cos( 08(0 - 5) Amplitude= 4, Period = 27, Vertical: 4 (up), Phase Shift: A (right) Amplitude= 4, Period = 7, Vertical: 4 (down), Phase Shift: (left) Amplitude= 4, Period = 277, Vertical: 4 (up), Phase Shift: none Amplitude , Period = 27, Vertical: 4 (up), Phase Shift: (left)