**How To Find Phase Shift Of Sine Graph**. For cosine it is zero, but for your graph it is 3 π / 2. To shift such a graph vertically, one needs only to change the function to f (x) = sin (x) + c , where c is some constant.

An easy way to find the phase shift for a cosine curve is to look at the x value of the maximum point. To figure out the actual phase shift, i'll have to factor out the multiplier, π, on the variable. Vertical shift, d = 2.

### To Graph A Sine Function, We First Determine The Amplitude (The Maximum Point On The Graph), The Period (The Distance/.

Note that we are using radians here, not degrees, and there are 2 π radians in a full rotation. By the way, the formula for phase shift is not c, but − c b to the right. Vertical shift, d = 2.

### How To Find The Period Of A Function How To Find Phase Shift Amplitude Of A Function.

Period is 2 π /b; When considering a sine or cosine graph that has a phase shift, a good way to start the graph of the function is to determine the new starting point of the graph. D is a vertical shift.

### Which Is A 0.5 Shift To The Right.

This is the currently selected item. So, the phase shift will be −0.5. In the graph of 2.a the phase shift is equal 3 small divisions to the right.

### That Is Your Phase Shift (Though You Could Also Use − 3 Π / 2 ).

If you divide the c by the b (c / b), you'll get your phase shift. Phase shift is c (positive is to the left) vertical shift is d; The period is \[\frac {2\pi} {b}\].

### Where Is The Vertical Shift In An Equation?

In the example above, we saw how the function \ (y=\sin (x+\pi) \) moved the graph by a distance of \ 1 small division = π / 8. The generalized equation for a sine graph is given by: