Two angles of a triangle are equal and the third angle is greater than each of those angles by 30 degree. determine all te angles of the triangle
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Answered by
462
Let the two equal angles be x°.
Then, the third angke will (x+30)°.
We know that sum of three angles of a triangle is 180°.
So, the equation formed is
2x+x+30° = 180°
On solving the equation, we will get x as 50°.
So, two equal angles of the triangle are 50° and the third angle is 80°.
Hope it helps.
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Thank You.
Then, the third angke will (x+30)°.
We know that sum of three angles of a triangle is 180°.
So, the equation formed is
2x+x+30° = 180°
On solving the equation, we will get x as 50°.
So, two equal angles of the triangle are 50° and the third angle is 80°.
Hope it helps.
Please mark my answer as brainliest.
Thank You.
Answered by
325
Answer:
Step-by-step explanation:
Please mark th brainliest
Let's consider the two angles as x
and the third angle be x +30
So x +x+x+30=180
3x+30=180
3x=180-30
3x=50
X=150/3
X=50
Now x+30=50+30=80
So the angles are50 ,50,80
Hope it helps
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