MCQOPTIONS
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MCQOPTIONS
This section includes 10 Mcqs, each offering curated multiple-choice questions to sharpen your Network Theory knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
The driving point impedance of an LC network is given by Z(s)=(s4+4s2+3)/(s3+2s). By taking the continued fraction expansion using second Cauer form, find the value of L4. |
| A. | 5 |
| B. | 2/5 |
| C. | 3/5 |
| D. | 4/5 |
| Answer» B. 2/5 | |
| 2. |
The driving point impedance of an LC network is given by Z(s)=(s4+4s2+3)/(s3+2s). By taking the continued fraction expansion using second Cauer form, find the value of C3. |
| A. | 25/s |
| B. | 2/25s |
| C. | 25/3s |
| D. | 25/4s |
| Answer» C. 25/3s | |
| 3. |
The driving point impedance of an LC network is given by Z(s)=(s4+4s2+3)/(s3+2s). By taking the continued fraction expansion using second Cauer form, find the value of L2. |
| A. | 1/5 |
| B. | 2/5 |
| C. | 3/5 |
| D. | 5/4 |
| Answer» E. | |
| 4. |
The driving point impedance of an LC network is given by Z(s)=(s4+4s2+3)/(s3+2s). By taking the continued fraction expansion using second Cauer form, find the value of C1. |
| A. | 2/3 |
| B. | 2/2 |
| C. | 1/2 |
| D. | 4/2 |
| Answer» B. 2/2 | |
| 5. |
The driving point impedance of an LC network is given by Z(s)=(2s5+12s3+16s)/(s4+4s2+3). By taking the continued fraction expansion using first Cauer form, find the value of L5. |
| A. | 2 |
| B. | 2/5 |
| C. | 2/7 |
| D. | 2/3 |
| Answer» E. | |
| 6. |
The driving point impedance of an LC network is given by Z(s)=(2s5+12s3+16s)/(s4+4s2+3). By taking the continued fraction expansion using first Cauer form, find the value of C4. |
| A. | 1/2 |
| B. | 1/4 |
| C. | 3/4 |
| D. | 1 |
| Answer» D. 1 | |
| 7. |
The driving point impedance of an LC network is given by Z(s)=(2s5+12s3+16s)/(s4+4s2+3). By taking the continued fraction expansion using first Cauer form, find the value of L3. |
| A. | 8 |
| B. | 8/3 |
| C. | 8/5 |
| D. | 8/7 |
| Answer» C. 8/5 | |
| 8. |
The driving point impedance of an LC network is given by Z(s)=(2s5+12s3+16s)/(s4+4s2+3). By taking the continued fraction expansion using first Cauer form, find the value of C2. |
| A. | 1 |
| B. | 1/2 |
| C. | 1/3 |
| D. | 1/4 |
| Answer» E. | |
| 9. |
Find the first reminder obtained by taking the continued fraction expansion in the driving point impedance of an LC network is given by Z(s)=(2s5+12s3+16s)/(s4+4s2+3). By taking the continued fraction expansion using first Cauer form. |
| A. | 4s<sup>3</sup>+10s |
| B. | 12s<sup>3</sup>+10s |
| C. | 4s<sup>3</sup>+16s |
| D. | 12s<sup>3</sup>+16s |
| Answer» B. 12s<sup>3</sup>+10s | |
| 10. |
The driving point impedance of an LC network is given by Z(s)=(2s5+12s3+16s)/(s4+4s2+3). By taking the continued fraction expansion using first Cauer form, find the value of L1. |
| A. | s |
| B. | 2s |
| C. | 3s |
| D. | 4s |
| Answer» C. 3s | |