Derivatives of some common functions
Fortunately, we don't have to follow the steps on the previous page in order to differentiate most functions since there are differentiation rules that can be used.
-
dy/dx c = 0
- The derivative of a constant is zero.
- Example: dy/dx 7 = 0
dy/dx c × x = c
- The rate of change of a linear function is its slope.
- Example: dy/dx 3 × x = 3
dy/dx (xn) = n × x(n-1)
- Example: dy/dx (x4) = 4 × x 3
dy/dx (log x) = 1/x
- The derivative of the log of x is its inverse.
- Example: dy/dx (log (x + 1)) = 1 / (x + 1)
dy/dx (eax) = a eax
- Example: dy/dx (e3x) = 3 e3x
dy/dx (sin x) = cos x
- Example: dy/dx (sin y) = cos y
dy/dx (cos x) = -sin x
- Example: dy/dx (cos
) = - sin
By using the derivative rules in combination, we can find the derivatives of many other functions.
Do you want to see the graphs of the derivatives of a few functions?
Graphing interactive workbench