MULTIPLE INTEGRALS 2 2 Iterated Integrals In this
- Slides: 19
MULTIPLE INTEGRALS 2. 2 Iterated Integrals In this section, we will learn how to: Express double integrals as iterated integrals.
INTRODUCTION Once we have expressed a double integral as an iterated integral, we can then evaluate it by calculating two single integrals.
INTRODUCTION Suppose that f is a function of two variables that is integrable on the rectangle R = [a, b] x [c, d]
INTRODUCTION We use the notation to mean: § x is held fixed § f(x, y) is integrated with respect to y from y = c to y = d
PARTIAL INTEGRATION This procedure is called partial integration with respect to y. § Notice its similarity to partial differentiation.
PARTIAL INTEGRATION Now, is a number that depends on the value of x. So, it defines a function of x:
PARTIAL INTEGRATION Equation 1 If we now integrate the function A with respect to x from x = a to x = b, we get:
ITERATED INTEGRAL The integral on the right side of Equation 1 is called an iterated integral.
ITERATED INTEGRALS Equation 2 Thus, means that: § First, we integrate with respect to y from c to d. § Then, we integrate with respect to x from a to b.
ITERATED INTEGRALS Similarly, the iterated integral means that: § First, we integrate with respect to x (holding y fixed) from x = a to x = b. § Then, we integrate the resulting function of y with respect to y from y = c to y = d.
ITERATED INTEGRALS Example 1
FUBUNI’S THEOREM Theorem 4 If f is continuous on the rectangle R = {(x, y) |a ≤ x ≤ b, c ≤ y ≤ d} then
ITERATED INTEGRALS Example 2
ITERATED INTEGRALS Example 3
ITERATED INTEGRALS To be specific, suppose that: § f(x, y) = g(x)h(y) § R = [a, b] x [c, d]
ITERATED INTEGRALS Then, Fubini’s Theorem gives:
ITERATED INTEGRALS In the inner integral, y is a constant. So, h(y) is a constant and we can write: since is a constant.
ITERATED INTEGRALS Equation 5 Hence, in this case, the double integral of f can be written as the product of two single integrals: where R = [a, b] x [c, d]
ITERATED INTEGRALS Example 4
- Change of variables multiple integrals
- Law of iterated expectations
- Law of iterated expectation
- Iterated local search
- Iterated integral
- Iterated conditional modes
- Example of mimd
- Multiple baseline across settings
- Exploration 1-3a introduction to definite integrals
- Properties of indefinite integrals
- Product rule integration
- Max min inequality definite integrals
- Average rate of change with integrals
- Convolution
- Integrals involving powers of secant and tangent
- Circuit training properties of definite integrals
- Hard trig integrals
- Chain rule integrals
- Convolution integral example
- Materi integral garis