EmSAT Achieve Exam > EmSAT Achieve Notes > Mathematics for EmSAT Achieve > Angle Sum Property of a Triangle & Exterior Angle Property
Angle Sum Property of a Triangle & Exterior Angle Property | Mathematics for EmSAT Achieve PDF Download
Angle Sum Property of a Triangle Theorem
In the given triangle, ∆ABC, AB, BC, and CA represent three sides. A, B and C are the three vertices and ∠ABC, ∠BCA and ∠CAB are three interior angles of ∆ABC.
Theorem 1: Angle sum property of triangle states that the sum of interior angles of a triangle is 180°.
Proof:
Consider a ∆ABC, as shown in the figure below. To prove the above property of triangles, draw a line 
parallel to the side BC of the given triangle.
Since PQ is a straight line, it can be concluded that:
∠PAB + ∠BAC + ∠QAC = 180° ………(1)
Since PQ||BC and AB, AC are transversals,
Therefore, ∠QAC = ∠ACB (a pair of alternate angle)
Also, ∠PAB = ∠CBA (a pair of alternate angle)
Substituting the value of ∠QAC and ∠PAB in equation (1),
∠ACB + ∠BAC + ∠CBA= 180°
Thus, the sum of the interior angles of a triangle is 180°.
Exterior Angle Property of a Triangle Theorem
Theorem 2: If any side of a triangle is extended, then the exterior angle so formed is the sum of the two opposite interior angles of the triangle.
In the given figure, the side BC of ∆ABC is extended. The exterior angle ∠ACD so formed is the sum of measures of ∠ABC and ∠CAB.
Proof:
From figure 3, ∠ACB and ∠ACD form a linear pair since they represent the adjacent angles on a straight line.
Thus, ∠ACB + ∠ACD = 180° ……….(2)
Also, from the angle sum property, it follows that:
∠ACB + ∠BAC + ∠CBA = 180° ……….(3)
From equation (2) and (3) it follows that:
∠ACD = ∠BAC + ∠CBA
This property can also be proved using the concept of parallel lines as follows:
In the given figure, side BC of ∆ABC is extended. A line 
parallel to the side AB is drawn, then: Since 
is the transversal,
∠CAB = ∠ACE ………(4) (Pair of alternate angles)
Also, 
is the transversal
Therefore, ∠ABC = ∠ECD ……….(5) (Corresponding angles)
We have, ∠ACB + ∠BAC + ∠CBA = 180° ………(6)
Since the sum of angles on a straight line is 180°
Therefore, ∠ACB + ∠ACE + ∠ECD = 180° ………(7)
Since, ∠ACE + ∠ECD = ∠ACD(From figure 4)
Substituting this value in equation (7);
∠ACB + ∠ACD = 180° ………(8)
From the equations (6) and (8) it follows that,
∠ACD = ∠BAC + ∠CBA
Hence, it can be seen that the exterior angle of a triangle equals the sum of its opposite interior angles.
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FAQs on Angle Sum Property of a Triangle & Exterior Angle Property - Mathematics for EmSAT Achieve
| 1. What is the Angle Sum Property of a Triangle? |  |
Ans. The Angle Sum Property of a Triangle states that the sum of the three interior angles of a triangle is always equal to 180 degrees. This means that if we measure the angles of any triangle and add them up, the result will always be 180 degrees.
| 2. How can I use the Angle Sum Property to find a missing angle in a triangle? | |
Ans. To find a missing angle in a triangle using the Angle Sum Property, you can subtract the sum of the known angles from 180 degrees. For example, if two angles of a triangle measure 40 degrees and 60 degrees, you can find the measure of the third angle by subtracting 40 + 60 from 180, which gives you 80 degrees.
| 3. What is the Exterior Angle Property of a Triangle? | |
Ans. The Exterior Angle Property of a Triangle states that the measure of an exterior angle of a triangle is equal to the sum of the measures of the two interior angles that are not adjacent to it. In other words, if you extend one side of a triangle, the angle formed outside the triangle is equal to the sum of the two opposite interior angles.
| 4. How can I use the Exterior Angle Property to find a missing angle in a triangle? | |
Ans. To find a missing angle in a triangle using the Exterior Angle Property, you can subtract the measure of the known interior angle from 180 degrees. For example, if one interior angle of a triangle measures 70 degrees and the exterior angle adjacent to it measures 120 degrees, you can find the measure of the missing interior angle by subtracting 120 - 70 from 180, which gives you 10 degrees.
| 5. Can the Angle Sum Property or Exterior Angle Property be applied to any type of triangle? | |
Ans. Yes, both the Angle Sum Property and the Exterior Angle Property can be applied to any type of triangle, including equilateral, isosceles, and scalene triangles. The properties hold true for all triangles regardless of their side lengths or angle measures.
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