大象传媒

Working with the graphs of trigonometric functionsTranslation (sliding a curve along an axis)

Trigonometric graphs can be sketched when you know the amplitude, period, phase and maximum and minimum turning points.

Part of MathsTrigonometric skills

Translation (sliding a curve, usually along an axis)

Now that you know what the graphs start out like, lets now look at what graphs would look like of the form:

\(y = a\sin bx + c\)

where:

  • a = amplitude (half the length from the maximum to the minimum values)
  • b = how many waves between 0藲 and 360藲
  • c = by how much has the graph been moved up (c > 0) or down (c < 0)

Examples of sketching graphs

1) Sketch the graph of \(y = 5\sin 2x^\circ + 4\)

  • amplitude = 5, so the distance between the maximum and minimum value is 10
  • number of waves = 2 (Each wave has a period of 360藲 梅 2 = 180藲)
  • moved up by 4 (since c > 0)
  • maximum turning point when \((5\times 1)+4=9\) and minimum turning point when \((5\times{-1})+4=-1\) (This is because the maximum of sine is 1 whether it is sinx or sin2x . and the minimum of sine is -1)

The graph looks like:

Diagram of a sin calculation graph with equation y = 5 sin 2x掳 + 4

2) Sketching the graph of \(y = 3\cos \frac{1}{2}x^\circ - 1\)

  • amplitude = 3, so the distance between the maximum and minimum value is 6
  • number of waves = 0.5 (Each wave has a period of 360藲 梅 0.5 = 720藲)
  • moved down by 1 (since c < 0)
  • maximum turning point when \(y=(3\times 1)-1=2\) and minimum turning point when \(y=(3\times 1)-1=-4\)
Diagram of a cos calculation graph with equation y = 3 cos 1/2x掳 - 1