________________________________________________________
Option A
As we know, a triangle has 180° in total and has three angles.
⇒ Angle 1 + Angle 2 + Angle 3 = 180
We are given the following:
- 1st angle = 50°
- 2nd angle = 40°
Let the 3rd angle be known as "x".
For the triangle to be classified as an isoceles triangle, two angles must be of same measure. Thus, there are two possibilities.
⇒ 50 + 40 + 40 = 180 [Angle 2 = Angle 3]
-------------- Or -------------
⇒ 50 + 40 + 50 = 180 [Angle 1 = Angle 3]
Possibility-1:
- ⇒ 50 + 40 + 40 = 180
- ⇒ 50 + 80 = 180
- ⇒ 130 = 180 (False)
Possibility-2:
- ⇒ 50 + 40 + 50 = 180
- ⇒ 100 + 40 = 180
- ⇒ 140 = 180 (False)
Therefore, the triangle cannot be an isoceles triangle.
________________________________________________________
Option B
As we know, a triangle has 180° in total and has three angles.
⇒ Angle 1 + Angle 2 + Angle 3 = 180
We are given the following:
- 1st angle = 50°
- 2nd angle = 40°
Let the 3rd angle be known as "x".
For the triangle to be classified as an obtuse triangle, the third angle must be a measure greater than 90°. Therefore,
- ⇒ 50 + 40 + (x > 90) = 180
- ⇒ 90 + (x > 90) = 180
- ⇒ (x > 90) = 180 - 90
- ⇒ (x > 90) = 90 (False)
This is false because 90 is not greater than 90. Therefore, the triangle is not an obtuse triangle.
________________________________________________________
Option C
As we know, a triangle has 180° in total and has three angles.
⇒ Angle 1 + Angle 2 + Angle 3 = 180
We are given the following:
- 1st angle = 50°
- 2nd angle = 40°
Let the 3rd angle be known as "x".
For the triangle to be classified as a right triangle, the third angle must be a measure equivalent to 90°. Therefore,
- ⇒ 50 + 40 + 90 = 180
- ⇒ 90 + 90 = 180
- ⇒ 180 = 180 (True)
Therefore, this triangle is a right triangle.
________________________________________________________
Option D
As we know, a triangle has 180° in total and has three angles.
⇒ Angle 1 + Angle 2 + Angle 3 = 180
We are given the following:
- 1st angle = 50°
- 2nd angle = 40°
Let the 3rd angle be known as "x".
For the triangle to be classified as an equiangular triangle, all the angles must be equivalent (60°). Therefore,
- ⇒ 1st angle = 2nd angle = 3rd angle
- ⇒ 50 = 40 = 3rd angle (False, because 50 is not equivalent to 40)
Therefore, this triangle is not an equiangular triangle.
________________________________________________________
In conclusion, we can conclude that Option C (Right triangle) is correct.