If $y = 8/(3x^2)$ , what is the value of $y'$ ?

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Answer 1 · 2016-09-20T02:31:51

There is no problem that I can see in the reasoning used.

If you check your answer using the quotient rule, you get the same derivative.

Here's the check:

$y' = (0 xx 3x^2 - 6x xx 8)/(3x^2)^2$

$y' = (-48x)/(9x^4)$

$y' = -16/(3x^3)$

We get the same derivative (since $-16/3x^(-3) = -16/(3x^3))$ , using a different method.

Hopefully this helps!

Answer 2 · 2016-09-20T14:43:37

There are many routes to the correct answer. Your method is fine.

I would have thought of the details this way:

$8/(3x^2) = 8/3 * 1/x^2 = 8/3x^-2$ .

I get the exact from you got:

$y' = -16/3x^-3$ .

Another possibility (that I find needlessly complicated) is to use the product rule on $8/3*x^-2$

$y' = d/dx(8/3) * x^-2 + 8/3 * d/dx(x^-2)$

$= 0 * x^-2 + 8/3 * (-2x*-3)$

$= -16/3x^-3$ .

Needlessly complicated? I think so.

Incorrect? No it is not incorrect.

(If I try to go to Chicago, there are many ways to get there. If I end up in Chicago, the way I chose worked.)

If y = 8/(3x^2)y = 8/(3x^2), what is the value of y'y'?