Find the second derivative of f(x)=sec(x).

The derivative of sec x is equal to sec x tan x. The derivative of the first derivative can be determined using the rule of products. The derivative is equal to sec x sec^2 x + tan x * sec x tan x. The simplified answer is sec^3 x + sec^2 x tan x equal to sec^2 x ( sec x + tanx )

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JeanaShupp JeanaShupp · Answer 2 · 2019-09-18T08:43:35+02:00

Answer: [tex]f"(x)=\sec x\tan^2 x+\sec^3 x[/tex]

Step-by-step explanation:

The given function : [tex]f(x)=\sec x[/tex]

First we find the first derivative of the function, so differentiate both sides , with respect to x, we get

[tex]f'(x)=\sec x\tan x[/tex]

Now, to find the second derivative, we differentiate again it with respect to x, we get

[tex]f"(x)=(\sec x)'\tan x+\sec x(\tan x)'\\\\\Rightarrow\ f"(x)=(\sec x\tan x)\tan x+\sec x(sec^2x)\\\\\Rightarrow\ f"(x)=\sec x\tan^2 x+\sec^3 x[/tex]

Hence, the second derivative of [tex]f(x)=\sec x[/tex] is [tex]f"(x)=\sec x\tan^2 x+\sec^3 x[/tex]