How do you find the derivative of #y=arcsin(x^4)#?

1 Answer
Steve M
Dec 13, 2016

# dy/dx = (4x^3)/sqrt(1-x^8) #

Explanation:

When tackling the derivative of inverse trig functions. I prefer to rearrange and use Implicit differentiation as I always get the inverse derivatives muddled up, and this way I do not need to remember the inverse derivatives. If you can remember the inverse derivatives then you can use the chain rule.

#y=arcsin(x^4) <=> siny=x^4 #

Differentiate Implicitly:

# cosydy/dx = 4x^3 # ..... [1]

Using the #sin"/"cos# identity;

# sin^2y+cos^2y -= csc^2y #
# :. (x^4)^2+cos^2y=1 #
# :. cos^2y=1-x^8 #
# :. cosy=sqrt(1-x^8) #

Substituting into [1]
# :. sqrt(1-x^8)dy/dx=4x^3 #
# :. dy/dx = (4x^3)/sqrt(1-x^8) #

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