Sum and Difference of Angles: Identifying and defining elements

Is it possible...?Isosceles triangle Using variables Calculate Angles in Quadrilaterals Using quadrilaterals Angle bisector Applying the formula Generate a random angle Identify the greater value Using angles in a triangle Finding the size of angles in a triangle

Question 1

Angle A is equal to 30°.
Angle B is equal to 60°.
Angle C is equal to 90°.

Can these angles form a triangle?

Question 2

Angle A equals 56°.
Angle B equals 89°.
Angle C equals 17°.

Can these angles make a triangle?

Question 3

Angle A equals 90°.
Angle B equals 115°.
Angle C equals 35°.

Can these angles form a triangle?

Question 4

In a right triangle, the sum of the two non-right angles is...?

Question 5

Can a triangle have more than one obtuse angle?

Examples with solutions for Sum and Difference of Angles: Identifying and defining elements

Exercise #1

Angle A is equal to 30°.
Angle B is equal to 60°.
Angle C is equal to 90°.

Can these angles form a triangle?

Video Solution

Step-by-Step Solution

We add the three angles to see if they equal 180 degrees:

$30+60+90=180$
The sum of the angles equals 180, so they can form a triangle.

Answer

Yes

Exercise #2

Angle A equals 56°.
Angle B equals 89°.
Angle C equals 17°.

Can these angles make a triangle?

Video Solution

Step-by-Step Solution

We add the three angles to see if they are equal to 180 degrees:

$56+89+17=162$

The sum of the given angles is not equal to 180, so they cannot form a triangle.

Answer

No.

Exercise #3

Angle A equals 90°.
Angle B equals 115°.
Angle C equals 35°.

Can these angles form a triangle?

Video Solution

Step-by-Step Solution

We add the three angles to see if they are equal to 180 degrees:

$90+115+35=240$
The sum of the given angles is not equal to 180, so they cannot form a triangle.

Answer

No.

Exercise #4

In a right triangle, the sum of the two non-right angles is...?

Video Solution

Step-by-Step Solution

In a right-angled triangle, there is one angle that equals 90 degrees, and the other two angles sum up to 180 degrees (sum of angles in a triangle)

Therefore, the sum of the two non-right angles is 90 degrees

$90+90=180$

Answer

90 degrees

Exercise #5

Can a triangle have more than one obtuse angle?

Video Solution

Step-by-Step Solution

If we try to draw two obtuse angles and connect them to form a triangle (i.e., only 3 sides), we will see that it is not possible.

Therefore, the answer is no.

Answer

Question 1

What kind of triangle is shown in the diagram below?

Question 2

What is the size of each angle in an equilateral triangle?

Exercise #6

What kind of triangle is shown in the diagram below?

Video Solution

Step-by-Step Solution

We calculate the sum of the angles of the triangle:

$117+53+21=191$

It seems that the sum of the angles of the triangle is not equal to 180°,

Therefore, the figure can not be a triangle and the drawing is incorrect.

Answer

The triangle is incorrect.

Exercise #7

What is the size of each angle in an equilateral triangle?