In ΔABC, ∠A is an obtuse angle. If sin A = 3/5, sin B = 5/13, find sin C.
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Answer:
sinC = 16/65
Step-by-step explanation:
Given,
In ΔABC,
∠A is an obtuse angle
sin A = 3/5,
=> cos A = -4/5
(°.° A is obtuse, it lies in 2nd quadrant )
and,
sin B = 5/13,
=> cos B = 12/13
To find: sin C
We know that, in a triangle
∠A+∠B+∠C = 180
=> ∠A + ∠B = 180- ∠C
=> sin ( ∠A + ∠B ) = sin ( 180- ∠C )
=> sinA cosB + cosA sinB = sinC
=> sinC = (3/5)(12/13) + (-4/5)(5/13)
=> sin C = 36/65 - 20/65
=> sin C = 16/65
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