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Unformatted text preview: a can be found by the following integral (A) ( ) ∫ − a dx x a 2 2 (B) ∫ − π 2 2 2 dx x a (C) ∫ − a dx x a 2 2 4 (D) ∫ − a dx x a 2 2 6. Velocity distribution of a fluid flow through a pipe varies along the radius and is given by ) ( r v . The flow rate through the pipe of radius a is given by (A) 2 ) ( a a v (B) 2 2 ) ( ) ( a a v v + (C) ∫ a dr r v ) ( (D) ∫ a rdr r v ) ( 2 For a complete solution, refer to the links at the end of the book....
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This note was uploaded on 06/12/2011 for the course EML 3041 taught by Professor Kaw,a during the Spring '08 term at University of South Florida - Tampa.
- Spring '08