How do you simplify $tanA - cscA secA (1 - 2cos^2 A)$ ?

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Answer 1 · 2015-11-13T17:33:21

Start by putting all of the terms into sine and cosine. This will make it easier to spot identities and see what might cancel out.

$sin A / cos A - 1/sinA 1/cos A ( 1-2cos^2A)$

Multiply through the parenthesis..

$sin A / cos A - 1/(sin A cos A)+(2cos^2A) /(sin Acos A)$

Now we should find a common denominator. If we multiply the top and bottom of the tangent term by $sinA$ , we get a denominator of $sin A cos A$ .

$sin^2 A / (sin A cos A) - 1/(sin A cos A)+(2cos^2A) /(sin A cos A)$

Combine the numerators.

$(sin^2A -1 + 2cos^2A)/(sinAcosA)$

Now we split the $2cosA$ term into $cosA + cosA$ . I rearranged a little to make the next step more aparent.

$(sin^2A + cos^2A +cos^2A - 1)/(sinAcosA)$

$sin^2A + cos^2A = 1$

Making this substitution into the numerator we get.

$(1 +cos^2A - 1)/(sinAcosA)$

The $1$ s cancel out leaving;

$cos^2A/(sinAcosA)$

The bottom $cosA$ cancels one from the top, leaving;

$cosA/sinA$

This is the identity for;

$cotA$

How do you simplify tanA - cscA secA (1 - 2cos^2 A)tanA - cscA secA (1 - 2cos^2 A)?