We continue in the evaluation of double integrals over non-rectangular regions. In the previous post, we solve a double integral over a type I region. In this post, we evaluate the double integral of a function over a type II region.
Example
Solution
Practice
Goal: Evaluate a double integral over a nonrectangular region
In the previous post, we stated that, in order to evaluate a double integral over a general, non-rectangular region we need to express this region as a type I or type II, The following theorems allow to reach this goal.
Theorem I
Double integrals over nonrectangular regions
Suppose g(x,y) is the extension to the rectangle R of the integrable function f(x,y) defined on the region D where D is inside R. Then g(x,y) is integrable and we define the double integral f(x,y) over D by:
Objective: recognize when a function f(x,y) is integrable over a general region.
General regions of integration
Let's consider the following figure:
We assume that the region D is a piecewise smooth and continuous function. The function g should be integrable over the region R. This happens as long as the region D is bounded by simple curves. We consider two types of planar bounded regions as stated in the following definition:
Definition
Example
Objectives:
1) Calculate the volume of a rectangular region
2) Calculate the volume of a region bounded above by a function f(x,y) with f(x,y) ≥ 0.
Applications of double integrals
As we saw from the definition of double integrals, a double integral is a volume of a region R. In this post, we'll study the volume of a rectangular region and the volume of a region bounded by a function f(x,y) provided that f(x,y) ≥ 0.
Volume of a rectangular region
If the region is rectangular, we just calculate the double integral of the constant function f(x,y) = 1.
Definition
The area of the region R is given by:
Example
Solution
Volume of a region bounded above by a function f(x,y) ≥ 0.
Example
Goal: Evaluate an iterated integral in two ways
Remember the Fubini's theorem concerning the double integral of a function of two variables f(x,y) that is continuous over a rectangular region R:
Example
Let's consider the function f(x, y) = 3x²- y over the rectangular region
Solution
Using the Fubini's theorem, evaluate the following integral in two ways:
Practice
Property VI of double integrals (reminder)
In the case where the function f(x,y) is expressed as a product of two functions g(x) of x only and h(y) of y only, then over the region R = {(x,y)/ a ≤ x ≤ b., c≤ y ≤ d}, the double integral of f(x, y) over the region R can be written as:
Example
Solution
It is clear that the given function f(x,y) is a product of a function of x and a function y. Here we have: g(x) = cosx and h(y) = e^y. By substituting g(x), h(y), a and b in the equality above, we obtain:
Practice
a) Use the properties of double integrals and the Fubini's theorem to evaluate:
Objective: apply the fifth property of the double integrals
Example:
The fifth property of the integral states:
This inequality represents also:
In the given inequality m = 2 and M = 13. Let's substitute them and f(x,y) in the inequality above:
Let's calculate the integral of the left and that of the right and then substitute:
Practice
