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simple hai but i will post ans tomorrow you can comment
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dhruvseth:
Kal paper ha
brilliantest answer mark karoge
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Step-by-step explanation:
LHS = ( tan\theta+sec\theta-1 ) / ( tan\theta-sec\theta+1 )
RHS = (sin\theta+1) / cos\theta
Lets Start from LHS
LHS = ( tan\theta+sec\theta-1 ) / (tan\theta-sec\theta+1 )
= ( tan\theta+sec\theta-(sec^{2}\theta-tan^2\theta )) / ( tan\theta-sec\theta+1 )
= (tan\theta+sec\theta-[(sec\theta+tan\theta)(sec\theta-tan\theta)])/(tan\theta-sec\theta+1 )
= (tan\theta+sec\theta[tan\theta-sec\theta+1]) / (tan\theta-sec\theta+1 )
= tan\theta+sec\theta
= [sin\theta/cos\theta] + [1/cos\theta]
= [(sin\theta+1) /cos\theta] = RHS
Hence Proved,
LHS=RHS
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