Description
This symbol represents convolution, a mathematical operation on two functions resulting in a third function. The convolution is obtained by taking the integral of the product of the two functions after reflecting one of the two function about the y-axis and shifting it.
This symbol represents convolution, a mathematical operation on two functions resulting in a third function. The convolution is obtained by taking the integral of the product of the two functions after reflecting one of the two function about the y-axis and shifting it. A convolution is commutative, meaning that it does not matter which of the two function is reflected and shifted.
A convolution, denoted by the symbol \(*\), is a mathematical operation on two functions resulting in a third function. The convolution is obtained by taking the integral of the product of the two functions after reflecting one of the two function about the y-axis and shifting it. A convolution is commutative, meaning that it does not matter which of the two function is reflected and shifted. A convolution plays a big role in the definition and implementation of FIR filters. (General form of a Finite Impulse Response Filter)