Amplitude, Period, Phase Shift And Frequency - Math Is Fun

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Math is Fun Advanced Amplitude, Period, Phase Shift and Frequency

Some functions (like Sine and Cosine) repeat forever and are called Periodic Functions.

The Period goes from one peak to the next (or from any point to the next matching point):

Sine wave with period marked between peaks and amplitude marked from center line to peak

The Amplitude is the height from the center line to the peak (or to the trough). Or we can measure the height from highest to lowest points and divide that by 2.

Two sine waves showing a horizontal shift relative to each other

The Phase Shift is how far the function is shifted horizontally from the usual position.

Two sine waves showing a vertical translation

The Vertical Shift is how far the function is shifted vertically from the usual position.

All Together Now!

We can have all of them in one equation:

y = A sin(B(x + C)) + D

  • amplitude is A
  • period is 2π/B
  • phase shift is C (positive is to the left)
  • vertical shift is D

And here is how it looks on a graph:

Sine wave graph with labels for Amplitude A, Period 2pi/B, Phase Shift C, and Vertical Shift D

Note that we are using radians here, not degrees, and there are 2π radians in a full rotation.

Example: sin(x)

This is the basic unchanged sine formula. A = 1, B = 1, C = 0 and D = 0

So amplitude is 1, period is 2π, there is no phase shift or vertical shift:

amplitude 1, period 2pi, no shifts

Phase shift can be tricky with signs:

  • Using y = A sin(B(x + C)) + D, then C > 0 shifts the graph left
  • Some books use y = A sin(B(x − h)) + D, where h > 0 means a shift right

These match because C = −h.

Example: 2 sin(4(x − 0.5)) + 3

  • amplitude A = 2
  • period 2π/B = 2π/4 = π/2
  • phase shift = −0.5 (or 0.5 right)
  • vertical shift D = 3

amplitude 2, period pi/2, phase shift 0.5, vert shift 3

In words:

  • the 2 tells us it will be 2 times taller than usual, so Amplitude = 2
  • the usual period is 2π, but in our case that is "sped up" (made shorter) by the 4 in 4x, so Period = π/2
  • and the −0.5 means it will be shifted to the right by 0.5
  • last the +3 tells us the center line is y = +3, so Vertical Shift = 3

Instead of x we can have t (for time) or maybe other variables:

Example: 3 sin(100t + 1)

To see the phase shift, we factor out 100 inside the sine:

3 sin(100t + 1) = 3 sin(100(t + 0.01))

Now we can see:

  • amplitude is A = 3
  • period is 2π/100 = 0.02 π
  • phase shift is C = 0.01 (left)
  • vertical shift is D = 0

And we get:

amplitude 3, period 0.02pi, phase shift -0.01, no vertical shift

Frequency

Frequency is how often something happens per unit of time (per "1").

Example: Here the cosine function repeats 4 times between 0 and 1:

period 1/4, frequency 4

So the Frequency is 4

And the Period is 14

In fact the Period and Frequency are related:

Frequency = 1Period

Period = 1Frequency

Example from before: 3 sin(100(t + 0.01))

amplitude 3, period 0.02pi, phase shift -0.01, no vertical shift

The period is 0.02π

So the Frequency is 10.02π = 50π

Some more examples:

Period Frequency
110 10
14 4
1 1
5 15
100 1100

When frequency is per second it is called "Hertz".

Example: 50 Hertz means 50 times per second

Motocross rider in mid-air to illustrate frequency and bouncing The faster it bounces the more it "Hertz"!

Animation

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