Question

Show that (sinA - cosA+1 )÷(sinA +cosA-1)=1÷(secA-tanA)

Answer 1

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Answer 2

Step-by-step explanation:

LHS = sinA-cosA+1/sinA+cosA-1

divide both numerator and denominator by cosA

[math]LHS = (tanA - 1 + secA) / (tanA + 1 - secA)[/math]

Now

[math]sec^2 A = 1 + tan^2 A [/math]

[math]sec^2 A - tan^2 A = 1[/math]

Using above relation at denominator of LHS

[math]LHS = (tanA - 1 + secA) / (tanA - secA + sec^2 A - tan^2 A)[/math]

[math]LHS = (tanA - 1 + secA) / ((secA - tanA) (-1 + secA + tanA))[/math]

[math] LHS = 1 / (secA-tanA)[/math]

[math]LHS = RHS[/math]

Hence Proved.

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