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MCQOPTIONS
This section includes 682 Mcqs, each offering curated multiple-choice questions to sharpen your Electrical Engineering knowledge and support exam preparation. Choose a topic below to get started.
| 651. |
Gauss law for electric field uses surface integral. State True/False |
| A. | true |
| B. | false |
| Answer» B. false | |
| 652. |
Line integral is used to calculate |
| A. | force |
| B. | area |
| C. | volume |
| D. | length |
| Answer» E. | |
| 653. |
The potential in a lamellar field is |
| A. | 1 |
| B. | 0 |
| C. | -1 |
| D. | ∞ |
| Answer» C. -1 | |
| 654. |
The energy stored in the inductor 100mH with a current of 2A is |
| A. | 0.2 |
| B. | 0.4 |
| C. | 0.6 |
| D. | 0.8 |
| Answer» B. 0.4 | |
| 655. |
Find the potential between a(-7,2,1) and b(4,1,2). Given E = (-6y/x2 )i + ( 6/x) j + 5 k. |
| A. | -8.014 |
| B. | -8.114 |
| C. | -8.214 |
| D. | -8.314 |
| Answer» D. -8.314 | |
| 656. |
If V = 2x2y – 5z, find its electric field at point (-4,3,6) |
| A. | 47.905 |
| B. | 57.905 |
| C. | 67.905 |
| D. | 77.905 |
| Answer» C. 67.905 | |
| 657. |
A field in which a test charge around any closed surface in static path is zero is called |
| A. | solenoidal |
| B. | rotational |
| C. | irrotational |
| D. | conservative |
| Answer» E. | |
| 658. |
The integral form of potential and field relation is given by line integral. State True/False |
| A. | true |
| B. | false |
| Answer» B. false | |
| 659. |
Which of the following Maxwell equations use curl operation? |
| A. | maxwell 1st and 2nd equation |
| B. | maxwell 3rd and 4th equation |
| C. | all the four equations |
| D. | none of the equations |
| Answer» B. maxwell 3rd and 4th equation | |
| 660. |
Curl cannot be employed in which one of the following? |
| A. | directional coupler |
| B. | magic tee |
| C. | isolator and terminator |
| D. | waveguides |
| Answer» E. | |
| 661. |
Find the curl of the vector A = yz i + 4xy j + y k |
| A. | xi + j + (4y – z)k |
| B. | xi + yj + (z – 4y)k |
| C. | i + j + (4y – z)k |
| D. | i + yj + (4y – z)k |
| Answer» E. | |
| 662. |
Find the curl of A = (y cos ax)i + (y + ex)k |
| A. | 2i – ex j – cos ax k |
| B. | i – ex j – cos ax k |
| C. | 2i – ex j + cos ax k |
| D. | i – ex j + cos ax k |
| Answer» C. 2i – ex j + cos ax k | |
| 663. |
Is the vector is irrotational. E = yz i + xz j + xy k |
| A. | yes |
| B. | no |
| Answer» B. no | |
| 664. |
The curl of a curl of a vector gives a |
| A. | scalar |
| B. | vector |
| C. | zero value |
| D. | non zero value |
| Answer» C. zero value | |
| 665. |
The curl of curl of a vector is given by, |
| A. | div(grad v) – (del)2v |
| B. | grad(div v) – (del)2v |
| C. | (del)2v – div(grad v) |
| D. | (del)2v – grad(div v) |
| Answer» C. (del)2v – div(grad v) | |
| 666. |
Which of the following theorem use the curl operation? |
| A. | green’s theorem |
| B. | gauss divergence theorem |
| C. | stoke’s theorem |
| D. | maxwell equation |
| Answer» D. maxwell equation | |
| 667. |
Identify the nature of the field, if the divergence is zero and curl is also zero. |
| A. | solenoidal, irrotational |
| B. | divergent, rotational |
| C. | solenoidal, irrotational |
| D. | divergent, rotational |
| Answer» D. divergent, rotational | |
| 668. |
Find the divergence of the field, P = x2yz i + xz k |
| A. | xyz + 2x |
| B. | 2xyz + x |
| C. | xyz + 2z |
| D. | 2xyz + z |
| Answer» C. xyz + 2z | |
| 669. |
Find whether the vector is solenoidal, E = yz i + xz j + xy k |
| A. | yes, solenoidal |
| B. | no, non-solenoidal |
| C. | solenoidal with negative divergence |
| D. | variable divergence |
| Answer» B. no, non-solenoidal | |
| 670. |
Curl is defined as the angular velocity at every point of the vector field. State True/False. |
| A. | true |
| B. | false |
| Answer» B. false | |
| 671. |
Find the divergence of the vector F= xe-x i + y j – xz k |
| A. | (1 – x)(1 + e-x) |
| B. | (x – 1)(1 + e-x) |
| C. | (1 – x)(1 – e) |
| D. | (x – 1)(1 – e) |
| Answer» B. (x – 1)(1 + e-x) | |
| 672. |
Find the divergence of the vector yi + zj + xk. |
| A. | -1 |
| B. | 0 |
| C. | 1 |
| D. | 3 |
| Answer» C. 1 | |
| 673. |
The divergence concept can be illustrated using Pascal’s law. State True/False. |
| A. | true |
| B. | false |
| Answer» B. false | |
| 674. |
Compute the divergence of the vector xi + yj + zk. |
| A. | 0 |
| B. | 1 |
| C. | 2 |
| D. | 3 |
| Answer» E. | |
| 675. |
The divergence of a vector is a scalar. State True/False. |
| A. | true |
| B. | false |
| Answer» B. false | |
| 676. |
. Find the gradient of the function sin x + cos y. |
| A. | cos x i – sin y j |
| B. | cos x i + sin y j |
| C. | sin x i – cos y j |
| D. | sin x i + cos y j |
| Answer» B. cos x i + sin y j | |
| 677. |
The gradient can be replaced by which of the following? |
| A. | maxwell equation |
| B. | volume integral |
| C. | differential equation |
| D. | surface integral |
| Answer» D. surface integral | |
| 678. |
Find the gradient of the function given by, x2 + y2 + z2 at (1,1,1) |
| A. | i + j + k |
| B. | 2i + 2j + 2k |
| C. | 2xi + 2yj + 2zk |
| D. | 4xi + 2yj + 4zk |
| Answer» C. 2xi + 2yj + 2zk | |
| 679. |
Curl of gradient of a vector is |
| A. | unity |
| B. | zero |
| C. | null vector |
| D. | depends on the constants of the vector |
| Answer» D. depends on the constants of the vector | |
| 680. |
Divergence of gradient of a vector function is equivalent to |
| A. | laplacian operation |
| B. | curl operation |
| C. | double gradient operation |
| D. | null vector |
| Answer» B. curl operation | |
| 681. |
The mathematical perception of the gradient is said to be |
| A. | tangent |
| B. | chord |
| C. | slope |
| D. | arc |
| Answer» D. arc | |
| 682. |
Gradient of a function is a constant. State True/False. |
| A. | true |
| B. | false |
| Answer» C. | |