How to Prove the Angle Sum Property of a Triangle: 7 Steps (2024)

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1Proving the Angle Sum Property

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Co-authored bywikiHow Staff

Last Updated: September 27, 2021

It is common knowledge that the sum of all the interior angles of a triangle equals 180°, but how do we know that? To prove that the sum of all angles of a triangle is 180 degrees, you need to understand some common geometric theorems. Using a few of these geometric concepts, there is a simple proof that can be written.

Part 1

Part 1 of 2:

Proving the Angle Sum Property

  1. 1

    Draw a line parallel to side BC of the triangle that passes through the vertex A. Label the line PQ. Construct this line parallel to the bottom of the triangle.[1]

  2. 2

    Write the equation angle PAB + angle BAC + angle CAQ = 180 degrees. Remember, all of the angles that comprise a straight line must be equal to 180°. Because angle PAB, angle BAC, and angle CAQ combine together to make line PQ, their angles must sum to 180°. Call this Equation 1.[2]

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  3. 3

    State that angle PAB = angle ABC and angle CAQ = angle ACB. Because you constructed line PQ parallel to side BC of the triangle, the alternate interior angles (PAB and ABC) made by the transversal line (line AB) are congruent. Similarly, the alternate interior angles (CAQ and ACB) made by the transversal line AC are also congruent.[3]

    • Equation 2: angle PAB = angle ABC
    • Equation 3: angle CAQ = angle ACB
    • It is a geometric theorem that alternate interior angles of parallel lines are congruent.[4]
  4. 4

    Substitute angle PAB and angle CAQ in Equation 1 for angle ABC and angle ACB (as found in Equation 2 and Equation 3) respectively. Knowing that the alternate interior angles are equal lets you substitute the angles of the triangle for the angles of the line.[5]

    • Thus we get, Angle ABC + angle BAC + angle ACB = 180°.
    • In other words, in the triangle ABC, angle B + angle A + angle C = 180°. Thus, the sum of all the angles of a triangle is 180°.

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Part 2

Part 2 of 2:

Understanding the Angle Sum Property

  1. 1

    Define the angle sum property. The angle sum property of a triangle states that the angles of a triangle always add up to 180°.[6] Every triangle has three angles and whether it is an acute, obtuse, or right triangle, the angles sum to 180°.

    • For example, in triangle ABC, angle A + angle B + angle C = 180°.
    • This theorem is useful for finding the measure of an unknown angle when you know the other two.
  2. 2

    Study examples. To really grasp this concept, it can be helpful to study some examples. Look at a right triangle, where one of the angles is 90° and the other angles each measure 45°. Summing 90° + 45° + 45° = 180°. Study other triangles of various shapes and sizes and sum their angles. You will see that they always add up to 180°.[7]

    • For the right triangle example: angle A = 90°, angle B = 45°, and angle C = 45°. The theorem states that angle A + angle B + angle C = 180°. Adding the angles gives you 90° + 45° + 45° = 180°. Therefore, left hand side (L.H.S.) equals right hand side (R.H.S.).
  3. 3

    Use the theorem to solve for an unknown angle. Using simple algebra, you can use the angle sum theorem to solve for an unknown angle if you know the other two angles of the triangle. Rearrange the basic equation to solve for the unknown angle.

    • For example, in triangle ABC, angle A = 67° and angle B = 43°, but angle C is unknown.
    • angle A + angle B + angle C = 180°
    • 67° + 43° + angle C = 180°
    • angle C = 180° - 67° - 43°
    • angle C = 70°

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  • Question

    How do I prove this using alternative angles?

    How to Prove the Angle Sum Property of a Triangle: 7 Steps (8)

    Community Answer

    Take a triangle ABC, and have a line parallel to BC passing through A. Now we have line DAE II BC.Therefore,Angle B = angle DAB (alternate angles)Angle C = angle EAC (alternate angles)DAE is a line, therefore angle DAB + A + EAC = 180 degreesBut angle B = DAB and C = EAC Hence proven, Angle A + B + C = 180 degrees.

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    How do I prove that angles of a quadrilateral equal 360?

    How to Prove the Angle Sum Property of a Triangle: 7 Steps (9)

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    Draw your diagonals. Four triangles appear, forming 12 angles. We know that the sum of these angles is going to be 180 x 4, so 720°. The angles that join in the middle of the polygon form a whole angle, 360°. So the sum of the other angles, which equal the sum of the angles of the quadrilaterals is 720-360°.This demonstration shows that if you add a side to the polygon, you add a triangle, so 180° to the total, and the center stays 360°.Which gives you the formula for the sum of the angles based on the number of sides N: 180 x N - 360. which you can factor as 180 (N-2).

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    How can I prove also using the 'alternate opposite angle' method? (Sum of all angles of a triangle)

    How to Prove the Angle Sum Property of a Triangle: 7 Steps (10)

    Community Answer

    Your exterior angle will be alternately and oppositely equal to the interior angle, since the lines between which the triangle lies in the proof diagram will be parallel. The sum of the angles touching the line with only one vertex will be 180, as they all lie on the same line. The alternate opposite exterior angles will be equal to the alternate opposite interior angle because of the alternate opposite interior angle . The exterior angle A would be equal to angle D, B to E and C to C. A + B + C =180 (all lie on the same line, 2 exterior 1 interior angle), A = D (alternately opposite interior angles), B = E (same reason).4.C=C5.therefore C + D + E=180Hence proved

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      About this article

      How to Prove the Angle Sum Property of a Triangle: 7 Steps (24)

      Co-authored by:

      wikiHow Staff

      wikiHow Staff Writer

      This article was co-authored by wikiHow Staff. Our trained team of editors and researchers validate articles for accuracy and comprehensiveness. wikiHow's Content Management Team carefully monitors the work from our editorial staff to ensure that each article is backed by trusted research and meets our high quality standards. This article has been viewed 190,385 times.

      127 votes - 63%

      Co-authors: 13

      Updated: September 27, 2021

      Views:190,385

      Article SummaryX

      To prove the angle sum property of a triangle, label the corners of the triangle with A, B, and C. Draw a line parallel to side BC that passes through the vertex A, and label the line PQ. Write the equation angle PAB + angle BAC + angle CAQ = 180°. Next, write that angle PAB is equal to angle ABC and angle CAQ equals angle ACB and substitute them in the original equation. This proves that the sum of all of the angles is 180°. To understand how to use this theorem to solve for an unknown angle, keep reading!

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      How to Prove the Angle Sum Property of a Triangle: 7 Steps (2024)

      FAQs

      How do you prove the angle sum property of a triangle Class 7? ›

      Prove the angle sum property of the triangle.
      1. Step 1: First, draw a line PQ that passes through the vertex A and is parallel to side BC of the triangle ABC.
      2. Step 2: The sum of the angles on a straight line is equal to 180°.
      3. Step 3: Since line PQ is parallel to BC.

      How to prove triangle angle sum theorem? ›

      We can draw a line parallel to the base of any triangle through its third vertex. Then we use transversals, vertical angles, and corresponding angles to rearrange those angle measures into a straight line, proving that they must add up to 180°.

      What is the angle sum property of 7 sides? ›

      The sum of the interior angles of a heptagon is equal to 900° which can be calculated using the interior angle formula of a regular polygon, (n - 2) × 180° where n is the number of sides. For a heptagon, the value of n is 7. Thus, by using the formula, the sum of the interior angles will be 900°.

      What is an example of the angle sum property of a triangle? ›

      Angle Sum Property of a triangle states that the sum of all the interior angles of a triangle is equal to 180°. For example, In a triangle PQR, ∠P + ∠Q + ∠R = 180°.

      What is the proof of angle properties? ›

      Adjacent angles add to 180o, for example a + b = 180o, a + c = 180. Corresponding angles are equal, for example a = e, b = f, c = g, d= h. Interior angles add to 180o, for example c + e = 180o, d + f = 180. Alternate angles are equal, c = f, d = e.

      How do you prove an angle? ›

      The alternate interior angles theorem describes an angle's proof according to the statement: 'If two parallel straight segments A and B are crossed by a transversal segment C, the alternate interior angles are congruent. '

      What is the exterior angle sum property of a triangle Class 7? ›

      What is the Exterior Angle Property? An exterior angle of a triangle is equal to the sum of its two opposite non-adjacent interior angles. The sum of the exterior angle and the adjacent interior angle that is not opposite is equal to 180º.

      What has 7 sides or angles? ›

      A heptagon is a two-dimensional shape with 7 sides and 7 angles. It belongs to the class of polygons in two-dimensional geometry.

      What is the sum of 7 exterior angles? ›

      Irrespective of number of sides, the sum of the measures of all the exterior angles of a polygon is always 360°. Measure of each exterior angle of n sided polygon = 360°/n. Measure of each exterior angle of 7 sided polygon = 360°/7. Sum of the measure of exterior angles of 7 sided polygon = 7×(360°/7) = 360°.

      How do you prove the SSS property of a triangle? ›

      SSS (Side-Side-Side)

      If all the three sides of one triangle are equivalent to the corresponding three sides of the second triangle, then the two triangles are said to be congruent by SSS rule. In the above-given figure, AB= PQ, BC = QR and AC=PR, hence Δ ABC ≅ Δ PQR.

      How do you prove angle addition postulates? ›

      The Angle Addition Postulate states that the sum of two adjacent angle measures will equal the angle measure of the larger angle that they form together. The formula for the postulate is that if D is in the interior of ∠ ABC then ∠ ABD + ∠ DBC = ∠ ABC. Adjacent angles are two angles that share a common ray.

      How do you prove the exterior angle property of a triangle? ›

      The exterior angle of a given triangle equals the sum of the opposite interior angles of that triangle. If an equivalent angle is taken at each vertex of the triangle, the exterior angles add to 360° in all the cases. In fact, this statement is true for any given convex polygon and not just triangles.

      How do you prove angle congruence? ›

      The complement theorem states that if angle A and angle B are both complementary to the same angle, then A and B are congruent. The supplement theorem states that if angle A and angle B are both supplementary to the same angle, then A and B are congruent.

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