15.2 - Double Integral Over More General Regions

Theorem

Let be a continuous on . Suppose is a product. Then

Proof:

Example. $\int R \int \frac{x}{y} d A$ over $R = [- 1, 2] \times [1, 2]$

$D$ Domain

= volume under the graph of and over
One can define it precisely using Riemann sum.

Theorem

Assume that and are integrable on a domain . Then

For any constant

Regions between two graphs

Each vertical strip is labeled by its x-coord

The range of the vertical strips is from to

For a vertical strip at the bounds for are from to

Example. Evaluate $\int D \int e^{x + y} d A$ over $D$ defined by $x \geq 1, y \geq 1, x + y \leq 5$

Finish the computation next time…

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MATH 20C Lecture 26

15.2 - Double Integral Over More General Regions

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