Integral Mathematics

The definition of a definite integral is the calculation of the area under a curve between two points on the x-axis.

The definition of a definite integral is the calculation of the average value of a function between two points on the x-axis.

The definition of a definite integral is the calculation of the area above a curve between two points on the x-axis.

The definition of a definite integral is the calculation of the slope of a curve between two points on the x-axis.

20

40

30

36

Area under the curve

Length of the curve

Slope of the curve

Intersection points of the curve

14/3

46/3

10/3

8/3

The definite integral calculates the area under the curve.

The definite integral calculates the slope of the curve.

The definite integral calculates the maximum value of the curve.

The definite integral calculates the derivative of the curve.

2

-1

0

1

The fundamental theorem of calculus relates differentiation and integration.

The fundamental theorem of calculus is a theorem that states that the integral of a function can be found by evaluating the derivative of the function.

The fundamental theorem of calculus is a mathematical principle that states that the area under a curve can be found by evaluating the antiderivative of the function.

The fundamental theorem of calculus states that the derivative of a function is equal to the integral of the function.

e^2 + ln(2) - e + 1

e^2 + ln(2) - e - 1

e^2 + ln(2) - e + 2

e^2 + ln(2) - e

The definite integral of a function is equal to the difference between the antiderivative evaluated at the upper and lower limits of integration.

The definite integral of a function is equal to the derivative of the antiderivative.

Definite integrals and antiderivatives are unrelated concepts in calculus.

The definite integral of a function is equal to the antiderivative evaluated at a single point.

10

14

8

12