Explanation Given: The parametric equations x = ( a + u cos v 2 ) cos v , y = ( a + u cos v 2 ) sin v and z = u sin v 2 where − 1 ≤ u ≤ 1 , 0 ≤ v ≤ 2 π , a = 3 . The graph of the given Möbius strip for a = 3 , Graph: The vector valued function is, r ( u , v ) = x ( u , v ) i + y ( u , v ) j + z ( u , v ) k The given parametric equation is x = ( a + u cos v 2 ) cos v , y = ( a + u cos v 2 ) sin v and z = u sin v 2 , Such that, the vector valued function is, r ( u , v ) = ( a + u cos v 2 ) cos v i + ( a + u cos v 2

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ISBN: 9780357762554

Author: Larson

Publisher: Cengage

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Chapter 15.5, Problem 58E

To determine

To graph: The Möbius strip for a=2 which is represented by the parametric equations x=(a+ucosv2)cosv, y=(a+ucosv2)sinv and z=usinv2 where −1≤u≤1,0≤v≤2π, a=3 using a computer algebra system.

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Chapter 15.5, Problem 57E

Chapter 15.6, Problem 1E

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Chapter 15 Solutions

CALCULUS EARLY TRANSCENDENTAL FUNCTIONS

Ch. 15.1 - Vector Field Define a vector field in the plane...Ch. 15.1 - Prob. 2E Ch. 15.1 - Potential Function Describe how to find a...Ch. 15.1 - Prob. 4E Ch. 15.1 - Prob. 5E Ch. 15.1 - In Exercise 5-8, match the vector field with its...Ch. 15.1 - In Exercise 5-8, match the vector field with its...Ch. 15.1 - In Exercise 5-8, match the vector field with its...Ch. 15.1 - Prob. 9E Ch. 15.1 - Prob. 10E

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To graph: The Möbius strip for a = 2 which is represented by the parametric equations x = ( a + u cos v 2 ) cos v , y = ( a + u cos v 2 ) sin v and z = u sin v 2 where − 1 ≤ u ≤ 1 , 0 ≤ v ≤ 2 π , a = 3 using a computer algebra system.

Solution Summary: The author illustrates the Möbius strip for a=2 represented by the parametric equations.

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To graph: The Möbius strip for a=2 which is represented by the parametric equations x=(a+ucosv2)cosv, y=(a+ucosv2)sinv and z=usinv2 where −1≤u≤1,0≤v≤2π, a=3 using a computer algebra system.

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Chapter 15 Solutions