Area under the curve Definition - Calculus II Key Term

Definition

The area under the curve represents the integral of a function over a given interval on a graph. It quantifies the accumulated value between the curve and the x-axis.

5 Must Know Facts For Your Next Test

The area under the curve can be approximated using methods such as Riemann sums, trapezoidal rule, and Simpson's rule.
The definite integral from $a$ to $b$ of a function $f(x)$ gives the exact area under the curve between these two points.
$\int_a^b f(x) \, dx$ is used to denote the definite integral which calculates this area.
If $f(x)$ is above the x-axis, the area is positive; if below, it is negative.
Understanding geometric interpretation helps in visualizing problems related to work done by forces or total distance traveled.

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Related terms

Definite Integral:

A type of integral that calculates the net area under a curve over an interval $[a, b]$.

Riemann Sum:

A method for approximating the total area under a curve by summing up areas of multiple rectangles.

Trapezoidal Rule:

\text{An approximation method for calculating integrals by dividing} \ [a,b]\ \text{into intervals and estimating areas using trapezoids.}

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Area under the curve

Definition

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