How do you differentiate g(x)=6-5x^3?

2 Answers
Anthony R.
Jun 7, 2017

g'(x)=-15x^2

Explanation:

Differentiate each term:

d/dx[6]=0 (You should know that the derivative of any constant is always 0)

Apply the Power rule: d/dx[x^n]=nx^(n-1)

g'(x)=d/dx[-5x^3]

g'(x)=-5d/dx[x^3]

g'(x)=-5*3x^(3-1)

g'(x)=-5*3x^2

g'(x)=-15x^2

Marvin V.
Jun 7, 2017

f'=-15x^2

Explanation:

We use the power rule to differentiate the equation.
The power rule states nx^(n-1), where n is our exponent. We bring down the exponent and multiple it with our base -5x in this case. So, 3(-5x)=-15x, then we subtract one from our original exponent so, x^(3-1)=x^2.
Regarding the 6, six is a constant the d/dx of a constant is always zero.

Our final answer is f'=0-15x^2 or just f'=-15x^2

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