2
Question
cosA−sinA+1cosA+sinA−1=cscA+cotA, using the identity csc2A=1+cot2A
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Solution
LHS
=cosA−sinA+1cosA+sinA−1=cotA−(1−cscA)cotA+(1−cscA)=cotA−(1−cscA)cotA+(1−cscA)×cotA−(1−cscA)cotA−(1−cscA)=[cotA−(1−cscA)]2cot2A−(1−cscA)2=cot2A+(1−cscA)2−2cotA(1−cscA)cot2A−(1+csc2A−2cscA)=cot2A+1+csc2A−2cscA−2cotA+2cotAcscAcot2A−1−csc2A+2cscA=csc2A+csc2A−2cscA−2cotA+2cotAcscA−1−1+2cscA=2csc2A−2cscA−2cotA+2cotAcscA2cscA−2=2cscA(cscA−1)+2cotA(cscA−1)2(cscA−1)=2(cscA−1)(cscA+cotA)2(cscA−1)=cscA+cotA=RHSHence, proved
LHS
=cosA−sinA+1cosA+sinA−1
=cotA−(1−cscA)cotA+(1−cscA)
=cotA−(1−cscA)cotA+(1−cscA)×cotA−(1−cscA)cotA−(1−cscA)
=[cotA−(1−cscA)]2cot2A−(1−cscA)2
=cot2A+(1−cscA)2−2cotA(1−cscA)cot2A−(1+csc2A−2cscA)
=cot2A+1+csc2A−2cscA−2cotA+2cotAcscAcot2A−1−csc2A+2cscA
=csc2A+csc2A−2cscA−2cotA+2cotAcscA−1−1+2cscA
=2csc2A−2cscA−2cotA+2cotAcscA2cscA−2
=2cscA(cscA−1)+2cotA(cscA−1)2(cscA−1)
=2(cscA−1)(cscA+cotA)2(cscA−1)
=cscA+cotA
=RHS
Hence, proved
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