How do you differentiate y = tan^3(x^3)?

1 Answer
Jim H
Jul 27, 2015

Use the chain rule twice.

Explanation:

It is important to remember the convention for powers of trigonometric functions:

tan^3(x^3) means "raise x to the third power, then find the tangent of that number and finally raise that tangent to the third power". In notation:

(tan(x^3))^3

The outermost function is the (second) cube.
And we know that d/dx (u^3) = 3u^2 (du)/dx
In this case u = tan(x^3)

So we get

dy/dx = 3(tan(x^3))^2 * d/dx(tan(x^3))

Now we need the derivative of tan(x^3).

We'll use the chain rule again:

d/dx(tanu) = sec^2u (du)/dx

We get

d/dx(tan(x^3)) = sec^2(x^3)* d/dx(x^3)

= sec^2(x^3)* 3x^2

Putting it all together, we have:

y = tan^3(x^3)

dy/dx = 3tan^2(x^3)*sec^2(x^3)*3x^2

Which can be written:

dy/dx = 9x^2tan^2(x^3)sec^2(x^3)

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