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Question
Question 5
In a Δ ABC, ∠C = 3 ∠B = 2 (∠A + ∠B). Find the three angles.
In a Δ ABC, ∠C = 3 ∠B = 2 (∠A + ∠B). Find the three angles.
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Solution
Given that,
∠C=3∠B=2(∠A+∠B)3∠B=2∠A+2∠B∠B=2∠A2∠A−∠B=0⋯ (i)
We know that the sum of the measures of all angles of a triangle is 180°. Therefore,
∠A+∠B+∠C=180∘∠A+∠B+3∠B=180∘∠A+4∠B=180∘⋯ (ii)
Multiplying equation (i) by 4, we obtain
8∠A−4∠B=0⋯ (iii)
Adding equations (ii) and (iii), we obtain
9∠A=180∘∠A=20∘
From equation (ii), we obtain
20∘+4∠B=180∘4∠B=160∘∠B=40∘∠C=3∠B=3×40∘=120∘
Therefore, ∠A,∠B,∠C are 20∘,40∘, and 120∘ respectively.
∠C=3∠B=2(∠A+∠B)3∠B=2∠A+2∠B∠B=2∠A2∠A−∠B=0⋯ (i)
We know that the sum of the measures of all angles of a triangle is 180°. Therefore,
∠A+∠B+∠C=180∘∠A+∠B+3∠B=180∘∠A+4∠B=180∘⋯ (ii)
Multiplying equation (i) by 4, we obtain
8∠A−4∠B=0⋯ (iii)
Adding equations (ii) and (iii), we obtain
9∠A=180∘∠A=20∘
From equation (ii), we obtain
20∘+4∠B=180∘4∠B=160∘∠B=40∘∠C=3∠B=3×40∘=120∘
Therefore, ∠A,∠B,∠C are 20∘,40∘, and 120∘ respectively.
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