Chapter62003

Chapter62003 - Chapter 6 Test 3 December 9, 2003 Name 1....

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Chapter 6 Test December 9, 2003 Name 1. Evaluate π ccc 6 π ccc 3 H csc 2 x cos x L dx. 2. Evaluate e 2x cos x dx. 3. Solve the intial value problem. Support your answer by overlaying your solution on a slope field for the differential equation. dy ccccccc dx = sin J x cccc 2 N ,y H −π L = 1 2 π π 2 π 1 1 2 3 4. Solve the following differential equation by the technique of separation of variables : dy dx = H sin x L e 2y + cos x J π cccc 2 N = 0. 5. Evaluate cos è!!! xd x . 6. Evaluate 1 3 x 4 ln x dx. 7. Evaluate 1 cccccccccccccccc cccccccccccccccc cccc y H tan H ln y LL dy. 8. Evaluate 1 cccccccccccccc t è!!!!! t 2 3 dt. 9. Evaluate tan 1 J x cccc 2 N dx. 10. Evaluate i k j j 4 2 x + 3 cccccccc 5x y { z z dx. 11. Suppose that when you were born, your parents placed a lump sum of 10 thousand dollars in a bank account that compounds continuously H with the idea of saving for college tuition L . If the rate of interest were to remain fixed at 5 %, H a L Find how long it would take for the money to triple to 30 thousand dollars.
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This note was uploaded on 08/29/2010 for the course MATH 44323 taught by Professor Anderson during the Spring '09 term at Berkeley.

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Chapter62003 - Chapter 6 Test 3 December 9, 2003 Name 1....

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