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Unformatted text preview: So (dds785) – HW10 – radin – (54915) 1 This printout should have 16 questions. Multiplechoice questions may continue on the next column or page – find all choices before answering. 001 10.0 points The graph of the function z = f ( x, y ) = 8 x is the plane shown in z 8 x y Determine the value of the double integral I = integraldisplay integraldisplay A f ( x, y ) dxdy over the region A = braceleftBig ( x, y ) : 0 ≤ x ≤ 2 , ≤ y ≤ 6 bracerightBig in the xyplane by first identifying it as the volume of a solid below the graph of f . 1. I = 83 cu. units 2. I = 85 cu. units 3. I = 87 cu. units 4. I = 84 cu. units 5. I = 86 cu. units 002 10.0 points Evaluate the integral I = integraldisplay 1 integraldisplay 2 1 (3 x + x 2 y ) dydx . 1. I = 1 2 2. I = 0 3. I = 2 4. I = 3 2 5. I = 1 003 10.0 points Evaluate the iterated integral I = integraldisplay 2 1 braceleftBig integraldisplay 2 1 parenleftBig x y + y x parenrightBig dy bracerightBig dx . 1. I = 3 2 ln2 2. I = 3 ln2 3. I = 3 2 ln3 4. I = 3 ln 3 2 5. I = 2 ln3 6. I = 2 ln 3 2 004 10.0 points Evaluate the iterated integral I = integraldisplay ln 3 parenleftBigg integraldisplay ln 4 e 2 x y dx parenrightBigg dy ....
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This note was uploaded on 10/25/2010 for the course M 408 L taught by Professor Cepparo during the Fall '08 term at University of Texas at Austin.
 Fall '08
 Cepparo
 Calculus

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