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Unformatted text preview: Group project 1: MAC 2302 (Sec 0693) Due on 9th June,2011. Please write in detail your solution in a separate paper clearly.You also need to present the problem in class on the due date. Total Points: 30 Problem 1. a) Verify that V = 1 √ t e x 2 / 4 Kt is a solution of ∂ 2 V ∂x 2 = 1 K ∂V ∂t b) Transform ∂V ∂t = K ∂ 2 V ∂x 2 hV to ∂W ∂t = K ∂ 2 W ∂x 2 with the transformation V = e ht W Group project 1: MAC 2302 (Sec 0693) Due on 9th June,2011. Please write in detail your solution in a separate paper clearly.You also need to present the problem in class on the due date. Total Points: 30 Problem 2. Find the curve for which the angle between the tangent and radius vector at any point is twice the vectorial angle. Group project 1: MAC 2302 (Sec 0693) Due on 9th June,2011. Please write in detail your solution in a separate paper clearly.You also need to present the problem in class on the due date....
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 Spring '08
 TUNCER
 Vector Space, total points, separate paper

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