Evaluating the Integral from a to a: A Mathematical Explanation and Result

Integral from a to a of f(x) with respect to x

The integral from a to a of f(x) with respect to x can be evaluated as follows:

∫[a to a] f(x) dx = F(a) – F(a)

where F(x) is the antiderivative (or primitive) of f(x)

The integral from a to a of f(x) with respect to x can be evaluated as follows:

∫[a to a] f(x) dx = F(a) – F(a)

where F(x) is the antiderivative (or primitive) of f(x).

Since the limits of integration are the same (a to a), this means that the interval of integration is a single point, and the integral evaluates to zero.

Therefore,

∫[a to a] f(x) dx = 0.

More Answers:

Understanding Integral Notation: A Powerful Tool for Calculating Area and Accumulation
Understanding Definite Integrals: A Guide to Calculating Accumulated Area in Mathematics
Mastering the Fundamental Concept of Calculus: The Indefinite Integral and its Application in Finding Antiderivatives

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