TheRainMan713 said:Homework Statement
I'm trying to find a formula for the nth derivative for the function f(x)=x1/3
The Attempt at a Solution
I know that it has alternating signs so it start with (-1)n+1 and I know the exponent for it is x(1/3-n) but I'm having a hard time figuring out the coefficient of x.
For the fourth derivative I have 1/3(1/3-1)(1/3-2)(1/3-3)x(1/3-4)The example our teacher gave us was x-1 which was much easier in my opinion...
The nth derivative of a function is the derivative of the derivative of the function, n times. It represents the rate of change of a function after n times of differentiation.
The nth derivative of a function is calculated by taking the derivative of the function n times using the appropriate differentiation rules. For example, if the function is f(x), the nth derivative would be denoted as f(n)(x).
Finding the nth derivative of a function is important in various fields of science and engineering, such as physics, economics, and statistics. It allows us to analyze the behavior and characteristics of a function at different levels of complexity and can provide valuable insights into the behavior of systems.
The nth derivative and the n+1th derivative of a function are different in that the nth derivative represents the rate of change after n times of differentiation, while the n+1th derivative represents the rate of change after n+1 times of differentiation. In other words, the n+1th derivative is one level of complexity higher than the nth derivative.
Yes, the nth derivative of a function can be negative, positive, or zero depending on the function and the value of n. A negative nth derivative indicates that the function is decreasing at a certain point, while a positive nth derivative indicates that the function is increasing at that point.