What is the derivative of $sqrt(2x)$ ?

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Answer 1 · 2014-12-13T13:54:28

Power rule: $(dy)/(dx)[x^n]=n*x^(n-1)$

Power rule + chain rule: $(dy)/(dx)[u^n]=n*u^(n-1)*(du)/(dx)$

Let $u=2x$ so $(du)/(dx)=2$

We're left with $y=sqrt(u)$ which can be rewritten as $y=u^(1/2)$

Now, $(dy)/(dx)$ can be found using the power rule and the chain rule.

Back to our problem: $(dy)/(dx)= 1/2 * u^(-1/2)*(du)/(dx)$

plugging in $(du)/(dx)$ we get:

$(dy)/(dx)= 1/2 * u^(-1/2)*(2)$

we know that: $2/2=1$

therefore, $(dy)/(dx)=u^(-1/2)$

Plugging in the value for $u$ we find that:
$(dy)/(dx)=2x^(-1/2)$

What is the derivative of sqrt(2x)sqrt(2x)?