How do you find the derivative of F(x)= (2x^3-1)/x^2F(x)=2x31x2?

2 Answers
Psykolord1989 .
Dec 9, 2017

The quotient rule states that given a function F(x) = (g(x))/(h(x)), (dF)/dx = ((dg)/(dx) * h(x) - g(x) * (dh)/dx)/(h(x))^2F(x)=g(x)h(x),dFdx=dgdxh(x)g(x)dhdx(h(x))2. See explanation for solution.

Explanation:

The quotient rule states that given a function F(x) = (g(x))/(h(x)), (dF)/dx = ((dg)/(dx) * h(x) - g(x) * (dh)/dx)/(h(x))^2F(x)=g(x)h(x),dFdx=dgdxh(x)g(x)dhdx(h(x))2

The power rule can help us find the derivatives of both numerator and denominator quickly.

g(x) = 2x^3-1, (dg)/dx = 6x^2g(x)=2x31,dgdx=6x2
h(x) = x^2, (dh)/dx = 2x, h^2(x)=x^4h(x)=x2,dhdx=2x,h2(x)=x4

Thus...

(dF)/dx = ((6x^2)(x^2) - (2x^3-1)(2x))/x^4 = (6x^4-4x^4+2x)/(x^4) = (2x^4+2x)/x^4 = 2 + 2/x^3dFdx=(6x2)(x2)(2x31)(2x)x4=6x44x4+2xx4=2x4+2xx4=2+2x3

Of note, the function will approach -oo as x->0x0

Jim H
Dec 10, 2017

I would rewrite: F(x) = 2x-1/x^2F(x)=2x1x2

Explanation:

f'(x) = 2+2/x^3 = (2x^3+2)/x^3

using d/dx(-1x^-2) = 2x^-3

and rewriting as a single quotient.

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