Questions LLC
Login
or
Sign Up
Ask a New Question
Mathematics
Trigonometry
Functions
What is the phase shift of the function f (x) = sin(x - π/2)?
π
1
π/2
π/4
1 answer
The phase shift of the function f(x) = sin(x - π/2) is π/2.
You can
ask a new question
or
answer this question
.
Related Questions
Write an equation of the tangent function with period 3pi/8, phase shift -pi/5, and vertical shift -2.
Answer: y=tan(8x/3 -
State the amplitude, period, and phase shift of the function.
h(t)=-9cos(7t-Pie/5)
Write the equation of a sine wave (also called sine curve) given:
1. amplitude = 2 period = pi/2 phase shift = pi/8 vertical
Find the amplitude, period, and phase shift of the following function:
y=-2cos2(θ+45)
1.What is the amplitude, period, phase shift and vertical shift of the function: f(x) = 3 sin(2x − π) − 1
2.Write a function
state the amplitude, period, frequency, phase shift and vertical shift of each function, Then graph two periods of the function
1)y=1-tan(3pi-2x) Find period and phase shift
2)y=-sin(5x+3) Find amplitude,period,and phase shift 3)y=1-sin(3pi-2x)Find
1.HOW do you state the amplitude, period, phase shift and vertical shift for the function y= 2sin[4(angle symbol)-pie/2]-5?
2.
f(x)=\sin (x) g(x)=(1)/(3)\sin (2x- 5) +1 what is the phase shift of function g?
which transformation is not in this function? f(x) = sinx to g(x) = −2 sin (3x−120) −8
A horizontal compression by a
