Calculating the partial derivative by its definition

This online calculator performs numerical differentiation of a function of several variables - the approximate calculation of all partial derivatives of a function at a given point - over all variables.

The function is given by an analytic expression, so to find the derivative we use the method of going to the limit by successive approximations until a given accuracy is reached, similar to the method used in Calculation of the derivative as a limit at a point to calculate the derivative of a function of one variable.
Defining the partial derivative of a function f(x_1, x_2, ..., x_n) at a point (a_1, a_2, ..., a_n) on a variable x_k:

{\frac  {\partial f}{\partial x_{k}}}(a_{1},\cdots ,a_{n})=\lim _{{\Delta x\to 0}}{\frac  {f(a_{1},\ldots ,a_{k}+\Delta x_k,\ldots ,a_{n})-f(a_{1},\ldots ,a_{k},\ldots ,a_{n})}{\Delta x_k}}

The calculator computes the value of the expression \frac{\Delta y}{\Delta x_k} in constantly decreasing steps \Delta x_k until the desired accuracy is reached. At each approximation n (n = 0, 1, 2, ... ) the incremental step of the variable x_k decreases according to the rule \Delta x_k = \Delta x_k_n = \frac {\Delta x_k_0}{a^n}, where the initial step \Delta x_k_0 and the parameter a > 1 can be set in the calculator (by default, the initial step is 0. 1 and the parameter a is 10).

PLANETCALC, Calculating the partial derivative by its definition

Calculating the partial derivative by its definition

Digits after the decimal point: 4
The file is very large. Browser slowdown may occur during loading and creation.

URL copied to clipboard
PLANETCALC, Calculating the partial derivative by its definition

Comments