How many triangles can be drawn having its angles as 45°, 64° and 72°? Give reason for your answer.
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Answered by
5
Here is your's solution;
◆ No triangle can be drawn.
◆◆ Justification ◆◆
◆ A triangle can only be drawn when the three angles of the triangles have the sum less than or equal to 180°.
◆ We can say that the triangle must obey the Angle Sum Property Of The Triangles.
That Means;
45° + 64° + 72° =180°
=> 181° is not equal to 180°.
◆◆ So No Triangle's can be made ◆◆
HOPE IT HELPS
◆ No triangle can be drawn.
◆◆ Justification ◆◆
◆ A triangle can only be drawn when the three angles of the triangles have the sum less than or equal to 180°.
◆ We can say that the triangle must obey the Angle Sum Property Of The Triangles.
That Means;
45° + 64° + 72° =180°
=> 181° is not equal to 180°.
◆◆ So No Triangle's can be made ◆◆
HOPE IT HELPS
DonDj:
Plz mark it as brainlest if it helps
Any doubt you can ask
Answered by
0
Answer:
Step-by-step explanation:
No triangle can be formed because.....
45'+64' +72' = 180' ( interior angle sum property of a triangle )
181' =/= 180'
which implies,
181' is not equal to 180'..
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