How do I find d/dxln (tan (x^2))?

1 Answer
GiĆ³
Jan 28, 2015

I would use the Chain Rule.
In a way it is like those russian dolls called Matrioskas where you have a smaller doll inside another. To get to the last one you have to open the big ones first.

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(Picture source: https://ghaiaesoterico.wordpress.com/2013/08/20/lenda-de-matrioska/)

Here the smallest doll is the function x^2 but to get to it you have first to "open" tan and ln.

To open in this case means to derive.

So you get:

d/dxln(tan(x^2))=1/(tan(x^2))*1/(cos^2(x^2))*2x

Remember that:
d/dxln(x)=1/x
d/dxtan(x)=1/(cos^2(x))
d/dxx^2=2x

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