How do you find the derivative of tanx^2tanx2?

1 Answer
Steve M
Nov 22, 2016

dy/dx = 2xsec^2(x^2) dydx=2xsec2(x2)

Explanation:

If you are studying maths, then you should learn the Chain Rule for Differentiation, and practice how to use it:

If y=f(x) y=f(x) then f'(x)=dy/dx=dy/(du)(du)/dx

I was taught to remember that the differential can be treated like a fraction and that the "dx's" of a common variable will "cancel" (It is important to realise that dy/dx isn't a fraction but an operator that acts on a function, there is no such thing as "dx" or "dy" on its own!). The chain rule can also be expanded to further variables that "cancel", E.g.

dy/dx = dy/(dv)(dv)/(du)(du)/dx etc, or (dy/dx = dy/color(red)cancel(dv)color(red)cancel(dv)/color(blue)cancel(du)color(blue)cancel(du)/dx)

So with y = tan(x^2) , Then:

{ ("Let "u=x^2, => , (du)/dx=2x), ("Then "y=tanu, =>, dy/(du)=sec^2u ) :}

Using dy/dx=(dy/(du))((du)/dx) we get:

dy/dx = (sec^2u)(2x)
:. dy/dx = 2xsec^2(x^2)

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