sin(2A+2B-2C) =1 and tan(B+C-A) =√3, find A, B and C
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Step-by-step explanation:
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Answered by
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Answer:
A = 60°, B = 52.5°, C = 67.5°
Step-by-step explanation:
sin(2A+2B-2C) =1
=> 2A+2B-2C = 90°
=> (A+B-C) = 45 ____(1)
tan(B+C-A) =√3
=> B+C-A = 60° ___(2)
Adding 1 and 2,
(A+B-C) + (B+C-A) = 45° + 60
2B = 105°
=> B = 52.5°
Now, substituting the value of B in (1)
A+52.5-C = 45
=> C-A = 7.5 ___(3)
We know that sum of all angles of triangle are 180°
A+B+C = 180°
=> A+52.5+C = 180
=> A+C = 127.5 ____(4)
Adding (3) and (4),
(C-A) + (A+C) = 7.5 + 127.5
=> 2C = 135
=> C = 67.5
Substituting the value of C in (4),
A+67.5 = 127.5
=> A = 127.5-67.5
=> A = 60°
Hope it helps
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