How do you factor $sec^4 x-2 sec^2 x tan^2 +tan^4 x$ ?

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How do you factor $sec^4 x-2 sec^2 x tan^2 +tan^4 x$ ?

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Answer 1 · 2016-05-17T09:23:57

$sec(x)^4-2sec(x)^2tan(x)^2+tan(x)^4 = 1$

Explanation:

Remember the polynomial identity
$(a - b)^2= a^2-2a b + b^2$
Let $a = sec(x)^2$ and $b = tan(x)^2$ so we have
$sec(x)^4-2sec(x)^2tan(x)^2+tan(2)^4 =(sec(x)^2-tan(x)^2)^2$
but $sec(x)^2-tan(x)^2 = 1/(cos(x)^2)-(sin(x)^2)/(cos(x)^2)=(1-sin(x)^2)/cos(x)^2$
Also we know $sin(x)^2+cos(x)^2=1$ so putting all together
we get
$sec(x)^4-2sec(x)^2tan(x)^2+tan(x)^4 = 1$

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How do you factor $sec^4 x-2 sec^2 x tan^2 +tan^4 x$ ?

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How do you factor sec^4 x-2 sec^2 x tan^2 +tan^4 x sec^4 x-2 sec^2 x tan^2 +tan^4 x?

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How do you factor $sec^4 x-2 sec^2 x tan^2 +tan^4 x$ ?