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Unformatted text preview: Problems 1-6 1. Solve for : a. DE: IC: b. DE: IC: 2. Find the continuous function except for . DE: IC: 3. Verify that the solution of DE: IC: is which satisfies the following initial-value problem 4. Derive the solution DE: IC: assuming 5. Show that of the problem is a continuous function. provided is a continuous and and are differentiable. Hint: Use the chain rule: 6. Show that there is no continuous function which satisfies unless , and find the solution in this case. Answers and Hints 1. a. b. for and for 2. 6. ...
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This note was uploaded on 03/27/2012 for the course MAP 3202 taught by Professor Hatim during the Fall '11 term at Valencia.
- Fall '11