Problem of the Week

Updated at Jan 22, 2018 10:28 AM

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Nov 18, 2024

This week we have another calculus problem:

How would you differentiate \(\sec{x}+{x}^{7}\)?

Let's start!

\[\frac{d}{dx} \sec{x}+{x}^{7}\]

Use Sum Rule: \(\frac{d}{dx} f(x)+g(x)=(\frac{d}{dx} f(x))+(\frac{d}{dx} g(x))\).

\[(\frac{d}{dx} \sec{x})+(\frac{d}{dx} {x}^{7})\]

Use Trigonometric Differentiation: the derivative of \(\sec{x}\) is \(\sec{x}\tan{x}\).

\[\sec{x}\tan{x}+(\frac{d}{dx} {x}^{7})\]

Use Power Rule: \(\frac{d}{dx} {x}^{n}=n{x}^{n-1}\).

\[\sec{x}\tan{x}+7{x}^{6}\]

Done