カテゴリー 全て - area - function - integrals - limits

によって Lorenzo Bonaria 5年前.

679

Definite Integrals - area under a curve

A definite integral calculates the area under a curve by evaluating the antiderivative of a function over a specified interval. When the upper and lower limits are the same, the integral equals zero.

Definite Integrals - area under a curve

Definite Integrals

Average value of a funcion

equals to the definite integral of f(x) over the interval [a;b] diivided by the upper limit minus the lower limit

Area between two curves

If you have two functions f(x) greater or equal to g(x) over the interval [a;b] the area between them equals to the definite integral of f(x) minus g(x) over the interval [a;b]

Area under a curve

By integration
definite integral of the function y=f(x) over the interval [a;b]

Somtitimes positive sometimes negative

The limits aren't given

you need to find the intersections with the x axis

The function is negative in the interval

you need to put an absolute value at the start or you need to change the sign at the end

The function is not given

you need to find the equation of the function

The solution of the definite integral is the antiderivative of f(x) over the interval [a;b]. Then substitute the upper limit (b) into the integral and subtract the value given by substituting the lower limit (a) into the integral

By approximation
divided area in inner or outer rectangles

Coventions

Changing the upper and the lower limit the integral is the same by putting a minus ahead
when the limits are the same [a;a] the integral equals to 0

Properties of definite integral

if a function is less or equal to another one then the integrals are respectively less or equal to each other like the functions
if theres a constant in a integral it's possible to take it out the integral
the definite integral of the function f(x) plus g(x) equals to the sum of the two integrals of the singular functions in the same order and interval
if a

Math vocabulary

derivative, integral, limit, general symbols, etc.