Prove that:
Give in image
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theta = A
So, we can proceed our solution as under :
LHS
(tan A + sec A - 1)/(tan A - sec A + 1)
= (tan A + sec A - sec²A + tan²A)/(tan A - sec A + 1)
= [tan A + sec A - {(sec A+tan A) (sec A - tan A)}]/[tan A - sec A + 1]
= [tan A + sec A (1 - sec A + tan A)]/(tan A - sec A + 1)
= tan A + sec A
= sin A/cos A + 1/cos A
= ( 1 + sin A ) / cos A
= RHS
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