Applications of sine and cosine functions including phase shift (degrees)

Behaviour in the real world that involves rotation or repetitive motion can be modelled using trigonometric equations like $y=\sin x$y=sinx and $y=\cos x$y=cosx.

We can develop more accurate models by transforming these equations. In this lesson we will focus on phase shifts of the form $y=\sin\left(x-c\right)$y=sin(x−c), and also look at other transformations.

 

Exploration

A small disc sitting on a flat surface begins to roll slowly with a constant angular velocity of $1^\circ$1° per second when a fan is switched on.

As the disc rolls, the height $h$h in centimetres of a point on the disc is described by the equation $h=\cos t+1$h=cost+1, where $t$t is in seconds.

A graph of the equation is shown below. Notice that the period of the equation is $360$360 seconds, or $6$6 minutes. This is the time it takes the point on the disc to complete one full revolution.

Graph of the function $h=\cos t+1$h=cost+1.

Thirty seconds after the first disc starts rolling along the surface, a second disc of the same size is placed in front of the fan. It begins to roll in a similar way, and the height of a point on its surface is described by the equation $h=\cos\left(t-30^\circ\right)+1$h=cos(t−30°)+1.

The second disc has the same behaviour as the first disc, except it has been translated in time. The graph below shows that the phase shift of $30$30 seconds corresponds to a horizontal translation of the graph of $h=\cos t+1$h=cost+1 to the graph of $h=\cos\left(t-30^\circ\right)+1$h=cos(t−30°)+1.

Graph of the functions $h=\cos t+1$h=cost+1 and $h=\cos\left(t-30^\circ\right)+1$h=cos(t−30°)+1.

Suppose now that we want the discs to roll a bit faster. If we crank up the speed of the fan, we can increase the angular velocity of the disc to $15^\circ$15° per second. The motion of the point on the first disc is then described by the equation $h=\cos\left(15t\right)+1$h=cos(15t)+1, and the point on the second disc has the equation $h=\cos\left(15\left(t-30\right)\right)+1$h=cos(15(t−30))+1.

In the image below we see the consequence of increasing the rolling speed is to decrease the period of each equation. The new period is $\frac{360^{\circ}}{15^{\circ}\text{ per second}}=24$360∘15∘ per second​=24 seconds.

Graph of the functions $h=\cos\left(15t\right)+1$h=cos(15t)+1 and $h=\cos\left(15\left(t-30\right)\right)+1$h=cos(15(t−30))+1.

 

Worked example

The height of a point on a disc from the scenario above is described by the equation $h=10\sin\left(20\left(t-7\right)\right)+10$h=10sin(20(t−7))+10. The graph of the function is shown below.

Graph of the function $h=10\sin\left(20\left(t-7\right)\right)+10$h=10sin(20(t−7))+10.

 

a. Find the initial height of the point.

Think: The initial point in time is the moment when $t=0$t=0 seconds.

Do: Substitute $t=0$t=0 into the equation $h=10\sin\left(20\left(t-7\right)\right)+10$h=10sin(20(t−7))+10.

$h$h	$=$=	$10\sin\left(20\left(t-7\right)\right)+10$10sin(20(t−7))+10
	$=$=	$10\sin\left(20\left(0-7\right)\right)+10$10sin(20(0−7))+10	(Substitute the value of $t$t)
	$=$=	$10\sin\left(20\times\left(-7\right)\right)+10$10sin(20×(−7))+10	(Simplify the product)
	$=$=	$10\sin\left(-140^\circ\right)+10$10sin(−140°)+10	(Evaluate the multiplication)
	$=$=	$3.57$3.57 cm (2 d.p.)	(Evaluate the expression)

The initial height of the point is $3.57$3.57 cm above the surface.

 

b. Find the maximum height of the point.

Think: The sine function takes values between $-1$−1 and $1$1. The maximum height will correspond to the times at which $\sin\left(20\left(t-7\right)\right)=1$sin(20(t−7))=1.

Do: By substituting $\sin\left(20\left(t-7\right)\right)=1$sin(20(t−7))=1 into the equation $h=10\sin\left(20\left(t-7\right)\right)+10$h=10sin(20(t−7))+10 we see that the maximum height is $h=10\times1+10=20$h=10×1+10=20 cm above the surface.

 

c. Find the time when the point is first at a height of $15$15 cm.

Think: We have a value of $h$h, and we want to find the corresponding value of $t$t.

Do: Substitute $h=15$h=15 into the equation and rearrange to solve for $t$t.

$h$h	$=$=	$10\sin\left(20\left(t-7\right)\right)+10$10sin(20(t−7))+10
$15$15	$=$=	$10\sin\left(20\left(t-7\right)\right)+10$10sin(20(t−7))+10	(Substitute the value of $h$h)
$5$5	$=$=	$10\sin\left(20\left(t-7\right)\right)$10sin(20(t−7))	(Subtract $10$10 from both sides)
$\frac{1}{2}$12​	$=$=	$\sin\left(20\left(t-7\right)\right)$sin(20(t−7))	(Divide both sides by $10$10)
$30$30	$=$=	$20\left(t-7\right)$20(t−7)	(Take the inverse $\sin$sin of both sides)
$\frac{3}{2}$32​	$=$=	$t-7$t−7	(Divide both sides by $20$20)
$t$t	$=$=	$8.5$8.5 seconds	(Add $7$7 to both sides)

The point on the disk will first reach a height of $15$15 cm when it has rolled for $8.5$8.5 seconds.

 

Practice question