1. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The physical model of an axially moving viscoelastic beam

2. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The natural frequencies changing with the axial speeds for different support rigidity parameters: (a) the first mode, (b) the second mode

3. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The natural frequencies changing with the axial speeds for different beam stiffnesses: (a) the first mode, (b) the second mode

4. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The effect of the viscosity coefficients on the stability boundaries for the summation parametric resonance of the first and second modes

5. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The effect of the mean axial speeds on the stability boundaries for the summation parametric resonance of the first and second modes

6. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The effect of the stiffness on the stability boundaries for the summation parametric resonance of the first and second modes

7. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The stability boundaries for the summation parametric resonances of the first and second modes for different models

8. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The effects of the viscosity coefficients on the stability boundaries for the first two principal parametric resonances: (a) the first mode, (b) the second mode

9. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The effects of the mean axial speeds on the stability boundaries for the first two principal parametric resonances: (a) the first mode, (b) the second mode

10. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The effects of the stiffnesses on the stability boundaries for the first two principal parametric resonances: (a) the first mode, (b) the second mode

11. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The stability boundaries for the first two principal parametric resonances for different models: (a) the first mode, (b) the second mode

12. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The comparisons of the first two natural frequencies of the linear generating system: (a) the first mode, (b) the second mode

13. Date of download: 1/2/2018
Copyright © ASME. All rights reserved.
From: Parametric Stability of Axially Accelerating Viscoelastic Beams With the Recognition of Longitudinally Varying Tensions
J. Vib. Acoust. 2011;134(1): doi: /
Figure Legend:
The comparison of the analytical and numerical stability boundaries for different parametric resonances in plane σ-γ1: (a) summation parametric resonance of the first and second modes, (b) first principal parametric resonance, and (c) second principal parametric resonance