1
Prove that
sin A - cos A+1. 1
______________ = ______
sin A + cos A - 1 secA-tanA
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Answered by
2
Step-by-step explanation:
=
cos(a)
1
−
cos(a)
sin(a)
1
\frac{ \sin(a) \ - cos(a) + 1 }{ \sin(a) + \cos(a) - 1 } = \frac{ \ \cos(a) }{1 - \sin(a) }
sin(a)+cos(a)−1
sin(a) −cos(a)+1
=
1−sin(a)
cos(a)
(1 - \sin(a) )( \sin(a ) - \cos(a) + 1 ) = \cos(a) ( \sin(a) + \cos(a) - 1) (1−sin(a))(sin(a)−cos(a)+1)=cos(a)(sin(a)+cos(a)−1)
sinA - cosA +1 - sin²A -sinA cos A - sinA = sin A cos A + cos²A - cos A
1 - sin² A = cos ² A
sin²A + cos²A = 1
1=1 ( sin²A + cos²A is always equal to 1 this is an identity)
LHS = RHS
HENCE PROVED
Hope it will help you
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