You know the measure of the exterior angle which forms a linear pair with the vertex angle. Describe two ways you can find measures of the interior angles of the triangle.

Question

asked Jan 23, 2021 191k views

1 Answer

Zerowords · Answer 1 · 2021-01-29T03:16:06+0000

Answer:

Explanation:

A linear pair are two given angles whose sum is equal to
180^(o) .

Let the exterior angle be represented by
x^(o) , and the three interior angles of the triangle be represented by
a^(o) ,
b^(o) and
c^(o) .

Assume that the vertex angle
c^(o) is the linear pair to the exterior angle
x^(o) .

i.e
x^(o) +
c^(o) =
180^(o) (sum of angles on a straight line)

Thus,

i.
a^(o) +
b^(o) =
x^(o) (sum of two opposite interior angles is equal to an exterior angle)

⇒
a^(o) =
x^(o) -
b^(o)

Also,

b^(o) =
x^(o) -
a^(o)

But,

a^(o) +
b^(o) +
c^(o) =
180^(o) (sum of angles in a triangle)

⇒
c^(o) =
180^(o) - (
a^(o) +
b^(o) )

and

a^(o) +
b^(o) =
180^(o) -
c^(o)

ii.
a^(o) +
b^(o) +
c^(o) =
180^(o) (sum of angles in a triangle)

a^(o) =
180^(o) - (
b^(o) +
c^(o) )

Also,

a^(o) +
b^(o) =
x^(o)

⇒
b^(o) =
x^(o) -
a^(o)

c^(o) =
180^(o) -
x^(o)