1. Which is the correct sketch of the graph $ y=\sin \theta $ for $ 0\leq\theta\leq{360}^{\circ}? $

2. Which is the correct sketch of the graph $ y=\cos \theta $ for $ 0\leq\theta\leq{360}^{\circ}? $

3. Which is the correct sketch of the graph $ y=\tan \theta $ for $ 0\leq\theta\leq{360}^{\circ}? $

4. Which is the correct sketch of the graph $ y=\tan \theta $ for $ 90\leq\theta\leq{270}^{\circ}? $

5. Which is the correct sketch of the graph $ y=\cos \theta $ for $ -90\leq\theta\leq{90}^{\circ}? $

6. Which is the correct sketch of the graph $ y=\sin \theta $ for $ 360\leq\theta\leq{720}^{\circ}? $

Sin cos tan graphs

GCSE Tutoring Programme

"Our chosen students improved 1.19 of a grade on average - 0.45 more than those who didn't have the tutoring."

Teacher-trusted tutoring

In order to access this I need to be confident with:

SOHCAHTOA Straight line graphs Quadratic graphs Reciprocal graph Cubic graph Fractions Decimals Rearranging equations Solving equations Exact trig values

This topic is relevant for:

GCSE Maths Geometry and Measure Trigonometry

Trig Graphs

Sin Cos Tan Graphs

Here we will learn about sin, cos and tan graphs, including sketching each type of trigonometric graph, recognising key features about each graph, and using the graphs to answer questions.

There are also sin cos tan graphs worksheets based on Edexcel, AQA and OCR exam questions, along with further guidance on where to go next if you’re still stuck.

What are sin cos tan graphs?

Sin cos tan graphs are the graphs of the three trigonometric functions of sine, cosine, and tangent. We need to be able to sketch and label the graph of each trigonometric function.

Notice that the horizontal $\textbf{x}$ -axis is labelled as the angle $\textbf{θ}$ and the vertical $\textbf{y}$ -axis is labelled as the trig function of the angle $\textbf{θ}.$

We can use the graphs to work out the unknown angles in a triangle.

Let’s see how we can create these graphs using the unit circle.

What are sin cos tan graphs?

The unit circle

Here is the unit circle (a circle with the radius of $1$ ) with the centre at $(0,0).$

The point on the circumference of the circle can be labelled as $(a,b),$ creating a right-angled triangle with a width of $a,$ height of $b$ and a hypotenuse of $1$ (as the radius of the circle is equal to $1$ ).

As $\sin(\theta)=\frac{O}{H}$ we can say that $\sin(\theta)=\frac{b}{1}$ and so the height of the triangle is $b=\sin(\theta).$

Where $O$ is opposite, $A$ is adjacent and $H$ is hypotenuse.

As $\cos(\theta)=\frac{A}{H}$ we can say that $\cos(\theta)=\frac{a}{1}$ and so the width of the triangle is $a=\cos(\theta).$

The point on the unit circle is therefore the coordinate $(\cos\theta,\sin\theta),$

Using the unit circle to determine all values of sin θ

As we move the point $(\cos\theta,\sin\theta)$ around the circumference of the circle in an anticlockwise direction, the $y$ value of the coordinate on the unit circle gives us the value for $\sin{\theta}.$

We can do this for every point on the circumference, not just the intersection with the axes.

As we continue to turn anticlockwise beyond $360$ degrees, the values of $\sin{\theta}$ will repeat themselves, making the sine function a periodic function. We can also turn the point in the clockwise direction to obtain values for negative $\theta$ using the same principles.

This gives us the graph of the sine function for $-360^{\circ}\leq\theta\leq{360}^{\circ}$ .

The graph passes through the origin, $(0,0).$
The graph is continuous and repeats every $360^{\circ}$ (it is periodic).
The maximum value of $\sin{\theta}$ is $1$ and the minimum value of $\sin{\theta}$ is $-1.$

Step-by-step guide: Sin graph

Using the unit circle to determine all values of cos θ

As we move the point $(\cos{\theta},\sin{\theta})$ around the circumference of the circle in an anticlockwise direction, the $x$ value of the coordinate on the unit circle gives us the value for $\cos{\theta}.$

We can do this for every point on the circumference, not just the intersection with the axes.

We can continue to turn anticlockwise beyond $360$ degrees and so the values of $\cos{\theta}$ will repeat themselves, making the cosine function a periodic function (the same as the sine function). We can also turn the point in the clockwise direction to obtain values for negative $\theta$ using the same principles.

This gives us the graph of the cosine function for $-360^{\circ}\leq\theta\leq{360}^{\circ}$ .

The graph intersects the $y-$ axis at $(1,0).$
The graph is continuous and repeats every $360^{\circ}$ (it is periodic).
The maximum value of $\cos{\theta}$ is $1$ and the minimum value of $\cos{\theta}$ is $-1.$

Step-by-step guide: Cos graph

Using the unit circle to determine all values of tan θ

The values of $\tan{\theta}$ are determined slightly differently to the values of $\sin{\theta}$ and $\cos{\theta}.$

This is because $\tan{\theta}=\frac{O}{A}.$ As the opposite side of the triangle is $b=\sin{\theta}$ and the adjacent side of the triangle is $a=\cos{\theta},$ this means that $\tan{\theta}=\frac{b}{a}=\frac{\sin{\theta}}{\cos{\theta}}.$

This means that in order to determine the value of $\tan \theta$ we need to divide the $\textbf{y}$ coordinate by the $\textbf{x}$ coordinate.

As we move the point $(\cos{\theta},\sin{\theta})$ around the circumference of the circle in an anticlockwise direction, the value of $\frac{\sin{\theta}}{\cos{\theta}}$ of the coordinate gives us the value for $\tan{(\theta)}.$

We can do this for every point on the circumference, not just the intersection with the axes.

We can continue to turn anticlockwise beyond $360$ degrees and so the values of $\tan \theta$ will repeat themselves, making the tangent function a periodic function. We can also turn the point in the clockwise direction to obtain values for negative $\theta$ using the same principles.

This gives us the graph of the tangent function for $-360^{\circ}\leq\theta\leq{360}^{\circ}$ .

The graph repeats every $180^{\circ}$ (it is periodic).
The graph is not a continuous curve (also known as disjointed).
Vertical asymptotes occur at $90^{\circ}\pm{180}^{\circ}.$

An asymptote is a line that a curve gets closer and closer towards but never touches as the curve goes towards infinity. You may have seen asymptotes when looking at the graph of $y=\frac{1}{x}.$ The values of $\tan \theta$ for any of these values of $\theta$ is therefore undefined as they would all be the result of dividing by $0,$ which we cannot do.

Here you can see the curve getting closer and closer to the asymptotes as $\tan \theta$ approaches infinity.

Step-by-step guide: Tan graph

Interpreting sin cos tan graphs

We can use the sin, cos and tan graphs to determine values for $\theta$ and $\sin \theta, \cos \theta$ and $\tan \theta.$

For example, let’s look at the graph of $y=\sin\theta,$ if $\sin \theta=0.8,$ we can draw a horizontal line across from $0.8$ on the vertical axis to the graph and then down to the horizontal axis and read off the value.

So when $\sin \theta=0.8,$ we can see that $\theta=53^{\circ}.$

But this is not the only solution. If we extended the horizontal line from $0.8$ further, we also get the same value of $\sin \theta=0.8$ when $\theta=127^{\circ}.$

As the function is periodic over $360^{\circ},$ if we added $360$ to each angle, we would also have $\theta=53+360=413^{\circ}$ and $\theta=127+360=487^{\circ}.$ This can also occur for values of $\theta$ in the negative direction.

Continuing with this lesson, we are going to focus on sketching and labelling key parts of trigonometric graphs.

How to sketch sin cos tan graphs

In order to sketch sin cos and tan graphs:

Draw the axes for the required range of $\textbf{θ}.$
Mark key features of the trig function onto the graph.
Sketch the graph.

Explain how to sketch sin cos tan graphs

Sin cos tan graphs worksheet

Get your free sin cos tan graphs worksheet of 20+ questions and answers. Includes reasoning and applied questions.

COMING SOON

Sin cos tan graphs worksheet

Get your free sin cos tan graphs worksheet of 20+ questions and answers. Includes reasoning and applied questions.

COMING SOON

Sin cos tan graphs examples

Example 1: sketch y = sin θ

Using the axes below, sketch the graph of $y=\sin\theta$ for $0\leq\theta\leq{360}^{\circ}.$

Draw the axes for the required range of $\textbf{θ}.$

Here we are given the axes for the range $0\leq\theta\leq{360}^{\circ}$ and so we can move on to the next step, remembering that we still need to label the vertical axes tick marks.

2Mark key features of the trig function onto the graph.

The graph of $y=\sin \theta$ passes through the origin and crosses the horizontal axis every $180$ degrees. It has a maximum value at $1$ when $\theta=90^{\circ}$ and a minimum value at $-1$ when $\theta=270^{\circ}.$

Marking these points onto the graph and labelling the vertical axis with the values of $1$ and $-1,$ we have

3Sketch the graph.

Joining the points together using a smooth curve, we get the sketch of the graph $y=\sin\theta$ for $0\leq\theta\leq{360}^{\circ}$ to be,

Example 2: sketch y = cos θ

Using the axes below, sketch the graph of $y=\cos\theta$ for $0\leq\theta\leq{360}^{\circ}.$

Draw the axes for the required range of $\textbf{θ}.$

Here we are given the axes for the range $-1\leq \cos \theta\leq 1$ and so we can move on to the next step, remembering that we will need to label the horizontal axes tick marks.

Mark key features of the trig function onto the graph.

The graph of $y=\cos \theta$ passes through the point $(0,1)$ and crosses the horizontal axis at $90^{\circ}$ and again for every $180$ degrees. It has a maximum value at $1$ when $\theta=0^{\circ}$ and a minimum value at $-1$ when $\theta=180^{\circ}.$

Marking these points onto the graph and labelling the horizontal axis with the values of $0, 90, 180, 270,$ and $360,$ we have,

Sketch the graph.

Joining the points together using a smooth curve, we get the sketch of the graph $y=\cos \theta$ for $0\leq \theta \leq{360}^{\circ}$ to be,

Example 3: sketch y = tan θ

Using the axes below, sketch the graph of $y=\tan \theta$ for $0\leq\theta\leq{360}^{\circ}.$

Draw the axes for the required range of $\textbf{θ}.$

Here we are given the axes for the range $0\leq\theta\leq{360}^{\circ}$ with tick marks labelled on each axis so we can move on to the next step.

Mark key features of the trig function onto the graph.

The graph of $y=\tan \theta$ passes through the origin and crosses the horizontal axis every $180$ degrees. It has an asymptote at $\theta=90^{\circ}$ which occurs every $180$ degrees and the graph does not have a maximum or minimum value (it extends up and down towards the asymptote).

Marking these points onto the graph, we have,

Note that the arrows are indicating the direction of the graph either side of the asymptotes and do not feature in the final sketch.

We can also use the trigonometric identity that $\tan45=1.$ So, other useful points to add on are $(45,1),(135,-1),(225,1)$ and $(315,-1).$

Sketch the graph.

Joining the points together using a smooth curve between each pair of asymptotes, we get the sketch of the graph $y=\tan \theta$ for $0\leq\theta\leq{360}^{\circ}$ to be,

Example 4: sketch y = cos θ for a different range of θ

Using the axes below, sketch the graph of $y=\cos\theta$ for $90\leq\theta\leq{270}^{\circ}.$

Draw the axes for the required range of $\textbf{θ}.$

Here we are given the axes for the range $90\leq\theta\leq{270}^{\circ}$ and so we can move on to the next step, remembering that we will need to label the vertical axes tick marks.

Mark key features of the trig function onto the graph.

The graph of $y=\cos \theta$ crosses the horizontal axis at $90^{\circ}$ and again for every $180$ degrees. It has a minimum value at $-1$ when $\theta=180^{\circ}.$

Marking these points onto the graph and labelling the vertical axis with $1$ and $-1,$ we have,

Sketch the graph.

Joining the points together using a smooth curve, we get the sketch of the graph $y=\cos \theta$ for $90\leq\theta\leq{270}^{\circ}$ to be,

Example 5: sketch y = sin θ for a different range of θ

Using the axes below, sketch the graph of $y=\sin\theta$ for $-90\leq\theta\leq{90}^{\circ}.$

Draw the axes for the required range of $\textbf{θ}.$

Here we are given the axes for the range $-90\leq\theta\leq{90}^{\circ}$ and so we can move on to the next step, remembering that we still need to label the vertical axes tick marks.

Mark key features of the trig function onto the graph.

The graph of $y=\sin \theta$ passes through the origin. It has a maximum value at $1$ when $\theta=90^{\circ}$ and a minimum value at $-1$ when $\theta=270^{\circ}.$ As the function is periodic over $360$ degrees, we can subtract $360$ from $270$ to obtain the value of $-90^{\circ}.$ Here, $\sin(-90)=-1.$

Marking these points onto the graph and labelling the vertical axis with the values of $1$ and $-1,$ we have,

Sketch the graph.

Joining the points together using a smooth curve, we get the sketch of the graph $y=\sin \theta$ for $-90\leq\theta\leq{90}^{\circ}$ to be,

Example 6: sketch y = tan θ for a different range of θ

Using the axes below, sketch the graph of $y=\tan\theta$ for $270\leq\theta\leq{540}^{\circ}.$

Draw the axes for the required range of $\textbf{θ}.$

Here we are given the axes for the range $270\leq\theta\leq{540}^{\circ}$ with tick marks labelled on each axis so we can move on to the next step.

Mark key features of the trig function onto the graph.

The graph of $y=\tan \theta$ passes through the origin and crosses the horizontal axis every $180$ degrees. As an asymptote would feature at $\theta=90^{\circ}$ and they occur every $180$ degrees, we need to add $180$ to $90$ to get the location of the next asymptote at $\theta=270^{\circ}.$

The next asymptote would then occur at $\theta=270+180=450^{\circ}.$ The graph does not have a maximum or minimum value (it extends up and down towards the asymptote).

Marking these points onto the graph, we have,

Note that the arrows are indicating the direction of the graph either side of the asymptotes and do not feature in the final sketch.

Sketch the graph.

Joining the points together using a smooth curve between each pair of asymptotes, we get the sketch of the graph $y=\tan \theta$ for $270\leq\theta\leq{540}^{\circ}$ to be,

Common misconceptions

Sine and cosine graphs switched

The sine and cosine graphs are very similar and can easily be confused with one another. A tip to remember is that you “sine up” from $0$ for the sine graph so the line is increasing whereas you “cosine down” from $1$ so the line is decreasing for the cosine graph.

Sin Cos Tan Graphs Image 22 Sin Cos Tan Graphs Image 23

Asymptotes are drawn incorrectly for the graph of the tangent function

The tangent function has an asymptote at $90^{\circ}$ because this value is undefined. As the curve repeats every $180^{\circ},$ the next asymptote is at $270^{\circ}$ and so on.

The graphs are sketched using a ruler

Each trigonometric graph is a curve and therefore the only time you are required to use a ruler is to draw a set of axes. Practice sketching each curve freehand and label important values on each axis.

Value given out of range

When finding a value of $\theta$ using a trigonometric graph, you must make sure that the value of $\theta$ is within the range specified in the question.

For example, the range of values for $\theta$ is given as $0^{\circ}\leq\theta\leq{360}^{\circ}$ and only the value of $\theta=240^{\circ}$ is written for the solution, whereas the solution $\theta=300^{\circ}$ is also correct.

Practice sin cos tan graphs questions

Sin Cos Tan Graphs question 1

Sin Cos Tan Graphs question 1-1

Sin Cos Tan Graphs question 1 c

Sin Cos Tan Graphs question 1 d

The sine graph $y=\sin \theta$ passes through the origin and crosses the horizontal axis every $180$ degrees. It has a maximum value at $1$ when $\theta=90^{\circ}$ and a minimum value at $-1$ when $\theta=270^{\circ}.$

Sin Cos Tan Graphs question 2

Sin Cos Tan Graphs question 2-1

Sin Cos Tan Graphs question 2 answer

Sin Cos Tan Graphs question 2 d

The cosine graph $y=\cos \theta$ passes through the point $(0,1)$ and crosses the horizontal axis at $90^{\circ}$ and again for every $180$ degrees. It has a maximum value at $1$ when $\theta=0^{\circ}$ and a minimum value at $-1$ when $\theta=180^{\circ}.$

Sin Cos Tan Graphs question 3

Sin Cos Tan Graphs question 3-1

Sin Cos Tan Graphs question 3-2

Sin Cos Tan Graphs question 3 answer

The tangent graph $y=\tan \theta$ passes through the origin and crosses the horizontal axis every $180$ degrees. It has an asymptote at $\theta=90^{\circ}$ which occurs every $180$ degrees and the graph does not have a maximum or minimum value (it extends up and down towards the asymptote).

Sin Cos Tan Graphs practice question 4

Sin Cos Tan Graphs question 4

Sin Cos Tan Graphs question 4 answer

Sin Cos Tan Graphs question 4 d

The graph of $y=\tan \theta$ between the range of $90\leq\theta\leq{270}^{\circ}$ passes through the horizontal axis at $180^{\circ}.$ It has asymptotes at $\theta=90^{\circ}$ and $\theta=270^{\circ}.$ The graph does not have a maximum or minimum value and extends towards the asymptote in both directions (up and down).

Sin Cos Tan Graphs question 5

Sin Cos Tan Graphs question 5-1

Sin Cos Tan Graphs question 5 c

Sin Cos Tan Graphs question 5 d

The graph of $y=\cos \theta$ passes through the point $(0,1)$ and crosses the horizontal axis at $90^{\circ}$ and again for every $180$ degrees. This means that it also crosses the horizontal axis at $-90^{\circ}.$ It has a maximum value at $1$ when $\theta=0^{\circ}.$

Sin Cos Tan Graphs question 6

Sin Cos Tan Graphs question 6-1

Sin Cos Tan Graphs question 6-2

Sin Cos Tan Graphs question 6 answer

This means that it repeats itself exactly every $360^{\circ}$ and so if we add $360$ to every value of $\theta,$ we get the points $(360,0),(450,1),(540,0),(630,-1),$ and $(720,0).$

Sin cos tan graphs GCSE questions

1. (a) Below is the graph of $y=\cos \theta$ for $0\leq\theta\leq{360}^{\circ}.$ On the same axes below, sketch the graph of $y=\sin\theta.$

Sin cos tan graphs GCSE question 1

(b) What values of $\theta$ satisfy the equation $\sin \theta=\cos \theta$ for $0\leq\theta\leq{360}^{\circ}?$

(4 marks)

Show answer

(a)

Passes through all five points

(0,0),(90,1),(180,0), (270,-1),(360,0)

(1)

Smooth curve

(1)

Correct sketch:

Sin cos tan graphs GCSE question 1-1

(b)

\theta=45^{\circ}

(1)

\theta=225^{\circ}

(1)

2. (a) Below is the graph of $y=\tan \theta$ for $0\leq\theta\leq{360}^{\circ}.$ Use the graph to estimate the value of $\tan{225}.$

Sin cos tan graphs GCSE question 2

(b) What other value of $\theta$ between the range of $0\leq\theta\leq{360}^{\circ}$ also has the same value as $\tan{225}$

(2 marks)

Show answer

(a) $\tan{225}=1$

(1)

(b) $\theta=45^{\circ}$

(1)

3. (a) Below is the graph of $y=\cos{(2\theta)}$ for $0\leq\theta\leq{360}^{\circ}.$ On the same set of axes, sketch the graph of $y=\cos \theta.$

Sin cos tan graphs GCSE question 3

(b) Use the graph to approximate the value of $\theta$ when $\cos\theta=\cos{2\theta}$ for $-180\leq\theta\leq{-90}^{\circ}$

(4 marks)

Show answer

(a)

Passes through all five points

(0,1),(90,0),(180,-1),(270,0),(360,1)

(1)

Smooth curve

(1)

Correct sketch:

Sin cos tan graphs GCSE question 3-1

(b)

Their value of $\theta=[112-118]^{\circ}$

(1)

The negative of their value of $\theta=-[112-118]^{\circ}$

(1)

Learning checklist

You have now learned how to:

Recognise, sketch and interpret graphs of trigonometric functions (with arguments in degrees)

y= \sin{x}, \; y=\cos{x}

and

y=\tan{x}

for angles of any size

The next lessons are

Still stuck?

Prepare your KS4 students for maths GCSEs success with Third Space Learning. Weekly online one to one GCSE maths revision lessons delivered by expert maths tutors.