MCQOPTIONS
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MCQOPTIONS
This section includes 13 Mcqs, each offering curated multiple-choice questions to sharpen your Finite Element Method knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
What is the physical interpretation of the weight function w3 in the following weak form of the continuity equation?-∫Ωew3\((\frac{\partial v_x}{\partial x}+\frac{\partial v_y}{\partial y})\)dxdy=0 |
| A. | Hydrostatic pressure |
| B. | Axial force |
| C. | Surface traction |
| D. | Body force |
| Answer» B. Axial force | |
| 2. |
In matrix algebra, if a matrix is positive definite, then all its eigenvalues are greater than zero. |
| A. | True |
| B. | False |
| Answer» B. False | |
| 3. |
For the vector form of the finite element model of momentum and continuity equations MΔ+K11Δ+K12P=0 what is the order of matrix F if the order of M is 2n x 2n? |
| A. | 2n x 1 |
| B. | 1 x 2n |
| C. | m x 2n |
| D. | 2n x m |
| Answer» B. 1 x 2n | |
| 4. |
For the vector form of the finite element model of momentum and continuity equations MΔ+K11Δ+K12P=0, what is the correct expression for mass matrix M? |
| A. | M=∫ΩcρψTψdx |
| B. | M=∫ΩcfψTψdx |
| C. | M=∫ΩctψTψdx |
| D. | M=∫ΩcPψTψdx |
| Answer» B. M=∫ΩcfψTψdx | |
| 5. |
Which equation is the correct vector form of the finite element model of momentum and continuity equations in the flow domain? |
| A. | MΔ+K11Δ+K12P=0 |
| B. | MΔ+K11Δ+K22P=F1 |
| C. | MΔ+K22Δ+K12P=F1 |
| D. | MΔ+K11Δ+K12P=F1 |
| Answer» E. | |
| 6. |
Which option is not correct concerning the velocity variables, vx and vy in the weak form of the momentum and continuity equation? |
| A. | They are primary variables |
| B. | The minimum continuity requirement for interpolation is that they are linear in x and y |
| C. | The minimum continuity requirement for interpolation is that they are constant |
| D. | They are continuous across the inter-element boundary |
| Answer» D. They are continuous across the inter-element boundary | |
| 7. |
Which option is not correct concerning the pressure variable, P in the weak form of the momentum and continuity equation? |
| A. | P is a primary variable |
| B. | P is a part of the secondary variables |
| C. | P=constant is the minimum continuity requirement for interpolation |
| D. | It is discontinuous across inter-element boundaries |
| Answer» B. P is a part of the secondary variables | |
| 8. |
If a governing equation represents volume change in an element, then the weight function in its weak form must be like a force that causes the volume change. |
| A. | True |
| B. | False |
| Answer» B. False | |
| 9. |
Using constitutive relations, what is the value of τxyif μ=0.3 and v=4xy-6y? |
| A. | 0.24x |
| B. | 2.4x |
| C. | 0.12x |
| D. | 1.2x |
| Answer» E. | |
| 10. |
Using constitutive relations, what is the value of τxxif μ=0.3 and v=4x? |
| A. | 0.24 |
| B. | 2.4 |
| C. | 0.12 |
| D. | 1.2 |
| Answer» C. 0.12 | |
| 11. |
For a governing equation, what does one conclude from the weak formulation if it does not contain boundary integral involving weight function? |
| A. | Integration by parts is used |
| B. | Integration by parts is not used |
| C. | The weight function is as a primary variable |
| D. | The weight function is to be made continuous across inter-element boundaries |
| Answer» C. The weight function is as a primary variable | |
| 12. |
In the formulation of governing equations, which option does not signify the characteristics of a weight function? |
| A. | Weight functions are multiplied to governing equations to obtain weak forms |
| B. | Weight functions are interpreted from the physical setup of the problem |
| C. | Weight function must denote a non-dimensional quantity |
| D. | Weight function can be interpreted as a velocity |
| Answer» D. Weight function can be interpreted as a velocity | |
| 13. |
In velocity-pressure formulation in FEM, which step is not used in the development of a weak form? |
| A. | Multiply governing equations with weight functions |
| B. | Integrating over the element domain |
| C. | Integrating by parts |
| D. | Performing coordinate transformation |
| Answer» E. | |