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? ›

Proof of the Angle Sum Property

Step 1: Draw a line PQ that passes through the vertex A and is parallel to side BC of the triangle ABC. Step 2: We know that the sum of the angles on a straight line is equal to 180°. In other words, ∠PAB + ∠BAC + ∠QAC = 180°, which gives, Equation 1: ∠PAB + ∠BAC + ∠QAC = 180°

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°.

The three interior angles in a triangle will always add up to 180°.

It then presents four main rules for proving triangles are congruent: 1) three sides are equal (SSS rule), 2) two sides and the included angle are equal (SAS rule), 3) two angles and a non-included side are equal (AAS rule), and 4) a right angle, hypotenuse, and one other side are equal (RHS rule).

The sum of all three angles of a triangle is 180°. Each angle in an equilateral triangle is 60°. In an isosceles triangle, the length of at least two sides is equal. In the right-angle triangle, the square of the hypotenuse is equal to the sum of the square of the other two sides.

Triangles proofs are done by completing two-column proofs which consist of statements and reasons to reach a final proven conclusion. This conclusion would consist of any of the five congruent triangle theorems (SSS, SAS, ASA, AAS, or HL).

Draw line a through points A and B. Draw line b through point C and parallel to line a. Since lines a and b are parallel, <)BAC = <)B'CA and <)ABC = <)BCA'. It is obvious that <)B'CA + <)ACB + <)BCA' = 180 degrees.

Draw a line on the hardboard and arrange the cut-outs of three angles at a point O as shown in Fig. 3. The three cut-outs of the three angles A, B and C placed adjacent to each other at a point form a line forming a straight angle = 180°. It shows that sum of the three angles of a triangle is 180º.

Triangle Properties

The sum of all the angles of a triangle (of all types) is equal to 180°.

How to find the sum of angles? ›

The formula for finding the sum of the measure of the interior angles is (n - 2) * 180. To find the measure of one interior angle, we take that formula and divide by the number of sides n: (n - 2) * 180 / n.

A heptagon is a polygon that has seven sides. It is a closed figure having 7 vertices. A heptagon is also sometimes called Septagon. Octagon ( 8 sided polygon) and so on.

A "unique triangle" is a triangle for which there is no other triangle that has the same dimensions and shape. Duplicates of such triangles will all be congruent to one another. The word "unique" means "being the only one of its kind".

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.

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.

Expert-Verified Answer

Draw line a through points A and B. Draw line b through point C and parallel to line a. Since lines a and b are parallel, <)BAC = <)B'CA and <)ABC = <)BCA'. It is obvious that <)B'CA + <)ACB + <)BCA' = 180 degrees.

In order to use AAS, all that is necessary is identifying two equal angles in a triangle, then finding a third side adjacent to only one of the angles in each of the triangles such that the two sides are equal. This is enough to prove the two triangles are congruent.