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Types of angles Angles in a triangle Angle rulesThis topic is relevant for:
Here we will learn about vertically opposite angles including how to find missing angles which are vertically opposite each other at the same vertex.
There are also angles in polygons worksheets based on Edexcel, AQA and OCR GCSE exam style questions, along with further guidance on where to go next if you’re still stuck.
Vertically opposite angles are angles that are opposite one another at a specific vertex and are created by two straight intersecting lines.
Vertically opposite angles are equal to each other.
These are sometimes called vertical angles.
Here the two angles labelled
You can try out the above rule by drawing two crossing lines and measuring the angles opposite to one another.
You will also notice that angle
Note because the sum of angles
Before we start looking at specific examples it is important we are familiar with some key words, terminology and symbols required for this topic.
We normally label angles in two main ways:
1By giving the angle a ‘name’ which is normally a lower case letter such as
2By referring to the angle as the three letters that define the angle. The middle letter refers to the vertex at which the angle is e.g. see the diagram for the angle we call ABC:
Angles on one part of a straight line always add up to
However see the next diagram for an example of where
Note – you can try out the above rule by drawing out the above diagrams and measuring the angles using a protractor.
Angles around a point will always equal
Two angles are supplementary when they add up to
Two angles are complementary when they add up to
In order to solve problems involving angles you should follow these steps:
Get your free vertically opposite angles worksheet of 20+ questions and answers. Includes reasoning and applied questions.
DOWNLOAD FREEGet your free vertically opposite angles worksheet of 20+ questions and answers. Includes reasoning and applied questions.
DOWNLOAD FREEFind the value of angle
The angle labelled
2 Clearly identify which of the unknown angles the question is asking you to find the value of.
The angle labelled
3 Solve the problem and give reasons where applicable.
4 Clearly state the answer using angle terminology.
Find the values of angles
Identify which angles are vertically opposite to one another.
The angle labelled
Clearly identity which of the unknown angles the question is asking you to find the value of.
The angles labelled
You will notice that
Solve the problem and give reasons where applicable.
Clearly state the answer using angle terminology.
Find the values of the angles labelled
Identify which angles are vertically opposite to one another.
The angle labelled
The angle labelled
Clearly identity which of the unknown angles the question is asking you to find the value of.
The angles labelled
Solve the problem and give reasons where applicable.
Clearly state the answer using angle terminology.
Using vertically opposite angles find the value of
Identify which angles are vertically opposite to one another.
The angle labelled
The angle labelled
Clearly identity which of the unknown angles the question is asking you to find the value of.
We are not being asked to find an angle we are being asked to find the value of
Solve the problem and give reasons where applicable.
The four angles total
Clearly state the answer using angle terminology.
In the diagram below
Find the value of angle
Identify which angles are vertically opposite to one another.
The angle of size
Clearly identity which of the unknown angles the question is asking you to find the value of.
Find angle
Solve the problem and give reasons where applicable.
Angle
Clearly state the answer using angle terminology.
Angle
Two angles with values of
Prove the two angles are both
Identify which angles are vertically opposite to one another.
The angles labelled
Clearly identity which of the unknown angles the question is asking you to find the value of.
You are being asked to prove the size of each angle is
Solve the problem and give reasons where applicable.
Therefore the size of the two angles can be found by substitution
Angle 1:
Angle 2:
Clearly state the answer using angle terminology.
Therefore both angles are
Vertically opposite angles is part of our series of lessons to support revision on angle rules. You may find it helpful to start with the main angle rules lesson for a summary of what to expect, or use the step by step guides below for further detail on individual topics. Other lessons in this series include:
1. Find the value of the angle labelled x :
Angle x is vertically opposite the given angle of 67^{\circ} so it is the same.
2. Find the value of the angle labelled x :
Angle x is vertically opposite the given angle of 146^{\circ} so it is the same.
3. Find the value of the angle labelled x :
Angle x is vertically opposite the given angle of 98^{\circ} so it is the same.
4. Find the value of the angle labelled x and y :
Angle x is vertically opposite the given angle of 112^{\circ} so it is the same.
Angle x and angle y lie on a straight line so they must add up to 180 .
5. Two angles with values of 2x and 50^{\circ} are vertically opposite one another. Find the value of x .
Angle 2x is vertically opposite the given angle of 50^{\circ} so it is the same.
To solve for x , we divide 50 by 2 .
6. Two angles with values of 6x+10 and 10x-70 are vertically opposite one another. Find the value of x
Angle 6x + 10 is vertically opposite angle of 10x − 70 so they are the same.
Solving the equation, 6x + 10 = 10x − 70 , leads to the correct value for x .
1. Find the size of angles a and b .
(2 marks)
a = 142^{\circ} (because vertically opposite angles are equal)
(1)
b: 180 − 142 = 38^{\circ} (because angles on a straight line add to 180)
(1)
a = 142^{\circ}, b = 38^{\circ}
2.
(a) Write an equation involving x.
(b) Use your equation to find the size of the angles.
(4 marks)
(a)
2x + 14 = 3x − 5
(1)
(b)
14 = x − 5
(1)
x = 19
(1)
Angles:
2 \times 19 + 14 = 52
= 52^{\circ}
(1)
3. Prove that triangle ABC is a right angle triangle
(3 marks)
Angle ACB = 24^{\circ} since they are vertically opposite
(1)
66 + 24 = 90
(1)
180 − 90 = 90 (angles in a triangle add up to 180 ),
so angle BAC is 90^{\circ} and this is a right angle triangle.
(1)
You have now learned how to:
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