Curve Sketching Definition
Curve Sketching is a collection of various techniques which can be used to create the approximate graph of any given function. That can help us analyze different features and behavior of the graph. Curve Sketching involves analysis of many aspects of a given function such as changes in function as input changes, maximum and minimum values, intercepts, domain, range, asymptotes, etc. Curve Sketching is used to visualize and understand the shape and behavior of any given function.
Curve Sketching
Curve Sketching as its name suggests helps us sketch the approximate graph of any given function which can further help us visualize the shape and behavior of a function graphically. Curve sketching isn’t any sure-shot algorithm that after application spits out the graph of any desired function but it is an active role approach for a visual representation of a function that needs analysis of various features of graphs, such as intercepts, asymptotes, extrema, and concavity, to gain a better understanding of how the function behaves.
In this article, we will explore all the fundamentals of curve sketching and its solved examples. Other than that we will also explore all the aspects in detail which will help us analyze and sketch the function more efficiently.