Explore topic-wise MCQs in Finite Element Method.

This section includes 10 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.

Gauss points are also the points used for numerical evaluation of _____

A. Surfaces
B. k<sup>e</sup>
C. Elements
D. Planes
Answer» C. Elements
2.

For degenerate four noded quadrilateral element the errors are _____

A. Constant
B. Uniform
C. Higher
D. Lesser
Answer» D. Lesser
3.

For quadrilateral with 2X2 integration gives _____ sets of stress values.

A. One
B. Two
C. Three
D. Four
Answer» E.
4.

The stresses are evaluated at the __________

A. Nodal points
B. Nodal displacements
C. Gauss points
D. Elements
Answer» D. Elements
5.

The stresses in the quadratic element are not ______

A. Linear
B. Uniform
C. Constant
D. Undefined
Answer» D. Undefined
6.

Stiffness integration for quadratic element for 2*2 matrix is ____

A. N<sub>t</sub>=(1- )(1- )
B. k<sub>ij</sub>= ( sum_{IP=1}^{4} )W<sub>IP</sub> <sub>IP</sub>
C. N<sub>t</sub>=(1- )
D. N<sub>t</sub>= ( frac{1}{4} )(1- )(1- )
Answer» C. N<sub>t</sub>=(1- )
7.

The extension of Gaussian quadrature to two-dimensional integrals of the form of _____

A. I ( sum_{i=1}^{n} sum_{j=1}^{n} )w<sub>i</sub>w<sub>j</sub>f( <sub>i</sub>, <sub>j</sub>)
B. Natural co-ordinates
C. w<sub>1</sub>f( <sub>1</sub>)+w<sub>2</sub>f( <sub>2</sub>)
D. w<sub>1</sub>f( <sub>1</sub>)
Answer» B. Natural co-ordinates
8.

Two point formula of a quadratic approach is _____

A. X direction
B. w<sub>1</sub>f( <sub>1</sub>)+w<sub>2</sub>f( <sub>2</sub>)
C. N<sub>t</sub>=(1- )(1- )
D. =D
Answer» C. N<sub>t</sub>=(1- )(1- )
9.

One point formula in quadratic approach is ____

A. w<sub>1</sub>f( <sub>1</sub>)
B. = D
C. N<sub>t</sub>=(1- )(1- )
D. Constant matrix
Answer» B. = D
10.

Which method of approach is useful for evaluating four noded quadratic elements?

A. Numerical integration
B. Penality approach method
C. Gaussian quadrature approach
D. Rayleighs method
Answer» D. Rayleighs method