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Nima M · Answer 1 · 2018-05-20T02:00:34+0000

Let E the expression of the left side of the equation:

$E=\sec^6(x) (\sec (x)\tan (x)) - \sec^4(x) (\sec (x)\tan (x))\\\\ E=\sec^7(x)\tan(x)-\sec^5(x)\tan(x)\\\\ E=\sec^5(x)\tan(x)(\sec^2(x)-1)$

We must know that
$\tan^2(x)+1=\sec^2(x)\iff \sec^2(x)-1=\tan^2(x)$ . So, using in the equation above:

$E=\sec^5(x)\tan(x)(\underbrace{\sec^2(x)-1}_(\tan^2(x)))\\\\ E=\sec^5(x)\tan(x)(\tan^2(x))\\\\ \boxed{E=\sec^5(x)\tan^3(x)}$

Then, the equation is true.

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