Q. 3
Question
What is the difference between an antiderivative of a function and the indefinite integral of a function?
Step-by-Step Solution
Verified Answer
A an antiderivative of a function is only a function that has a derivative f' and the indefinite integral of a function is a family of the function of all antiderivative of function f.
1Step 1. Given information.
The given topics on which we have to differentiate are an antiderivative of a function and the indefinite integral of a function.
2Step 2. Difference.
An antiderivative of a function is only a function that has a derivative f' and the indefinite integral of a function is a family of the function of all antiderivative of function f.
Other exercises in this chapter
Q. 1 TB
If g'(x)=h(x), then is g an antiderivative of h or is h an antiderivative of g?
View solution Q. 2 TB
State the definition of the definite integral of a function f on an interval [a,b].
View solution Q. 3 TB
State the Mean Value Theorem.
View solution Q. 4
Explain why we call the collection of antiderivatives of a function f a family. How are the antiderivatives of a function related?
View solution