Limit Processes

A limit process is a way mathematicians analyze what happens to a function or a sequence as the input approaches a particular point. It helps us understand the value a function gets close to, even if it doesn’t actually reach that point. For example, as we get closer to a specific number, the function’s output may approach a certain value. Limits are fundamental in calculus because they allow us to study rates of change and accumulation, enabling precise analysis of continuous phenomena. Essentially, limits examine the behavior near a point, rather than the exact value at that point.