Derivative of q^2-3

Mathabo Linala

Mathabo Linala

Answered question

2022-07-25

Derivative of q^2-3

Answer & Explanation

Eliza Beth13

Eliza Beth13

Skilled2023-05-31Added 130 answers

To find the derivative of the function q23, we can use the power rule of differentiation.
The power rule states that for any function of the form f(x)=xn, where n is a constant, the derivative is given by:
ddx(xn)=n·xn1
In this case, our function is q23, where q is the independent variable.
Using the power rule, we can differentiate each term separately:
ddq(q2)ddq(3)
For the first term, q2, we apply the power rule with n=2:
ddq(q2)=2·q21=2q
The derivative of the constant term, 3, is zero, as the derivative of a constant is always zero.
Putting it all together, the derivative of the function q23 is:
ddq(q23)=2q0=2q
Therefore, the derivative of q23 with respect to q is 2q.

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