Explanation Given information: The flow is assumed to be steady, the flow is two dimensional. Write the expressions for the velocity component in r -direction. u r = V cos θ ( 1 − a 2 r 2 ) .......(I) Here, the constant magnitude of velocity of the fluid flow approaching the cylinder is V , the radius of the cylinder is a , the radial distance from the centre of the cylinder is r , and the velocity component in r -direction is u r . Write the expression for the velocity component in θ -direction. u θ = − V sin θ ( 1 + a 2 r 2 ) .......(II) Here, the constant magnitude of velocity of the fluid flow approaching the cylinder is V , the radius of the cylinder is a , the radial distance from the centre of the cylinder is r , the velocity component in θ -direction is u θ . Write the expression for the linear strain rate in r -direction. ε r r = ∂ u r ∂ r .......(III) Here, the velocity gradient in r -direction is ∂ u r ∂ r , the linear strain rate in r -direction is ε r r . Write the expression for the linear strain rate in θ -direction. ε θ θ = 1 r ( ∂ u θ ∂ θ + u r ) .......(IV) Here, the velocity gradient in θ -direction is ∂ u θ ∂ r , the linear strain rate in θ -direction is ε θ θ , the velocity component in r -direction is u r , the radial distance from the centre of the cylinder is r . Substitute V cos θ ( 1 − a 2 r 2 ) for u r in the Equation (III) ε r r = ∂ ∂ r ( V cos θ ( 1 − a 2 r 2 ) ) = V cos θ ( 0 − a 2 ( − 2 r 2 ) ) = 2 a 2 r 3 V cos θ Substitute − V sin θ ( 1 + a 2 r 2 ) for u θ in the Equation (IV)

4th Edition

ISBN: 9781259877766

Author: CENGEL

Publisher: MCG

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Chapter 4, Problem 116P

To determine

The two linear strain rates in the rθ plane.

Whether fluid line segments stretch (or shrink) in this flow field.

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Chapter 4, Problem 114P

Chapter 4, Problem 117P

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Chapter 4 Solutions

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The two linear strain rates in the r θ plane. Whether fluid line segments stretch (or shrink) in this flow field.

Solution Summary: The author explains the two linear strain rates in the rtheta plane. The flow is assumed to be steady and two dimensional.

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The two linear strain rates in the rθ plane.

Whether fluid line segments stretch (or shrink) in this flow field.

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Chapter 4 Solutions

The two linear strain rates in the r θ plane. Whether fluid line segments stretch (or shrink) in this flow field.

Solution Summary: The author explains the two linear strain rates in the rtheta plane. The flow is assumed to be steady and two dimensional.

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The two linear strain rates in the rθ plane. Whether fluid line segments stretch (or shrink) in this flow field.

Want to see the full answer?

Chapter 4 Solutions

The two linear strain rates in the rθ plane.

Whether fluid line segments stretch (or shrink) in this flow field.