MCQOPTIONS
Saved Bookmarks
MCQOPTIONS
This section includes 16 Mcqs, each offering curated multiple-choice questions to sharpen your Discrete Mathematics knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
Let the multiplication of the 3 consecutive terms in GP be 8 then midlle of those 3 terms would be _______ |
| A. | 2 |
| B. | 3 |
| C. | 4 |
| D. | 179 |
| Answer» B. 3 | |
| 2. |
If a, b, c are in GP then relation between a, b, c can be ___________ |
| A. | 2b = 2a + 3c |
| B. | 2a = b+cc) b =(a |
| C. | b =(ac)1/2 |
| D. | 2c = a + c |
| Answer» D. 2c = a + c | |
| 3. |
Which of the following sequeces in GP will have common ratio 3, where n is an Integer? |
| A. | gn = 2n2 + 3n |
| B. | gn = 2n2 + 3 |
| C. | gn = 3n2 + 3n |
| D. | gn = 6(3n-1) |
| Answer» E. | |
| 4. |
In the given Geometric progression, ‘225‘ would be a term in it. |
| A. | True |
| B. | FalseView Answer |
| Answer» C. | |
| 5. |
In the given Geometric progression the term at position 11 would be ___________ |
| A. | 235 |
| B. | 245 |
| C. | 35 |
| D. | None of the mentionedView Answer |
| Answer» B. 245 | |
| 6. |
In the given Geometric progression find the number of terms. |
| A. | 11 |
| B. | 13 |
| C. | 15 |
| D. | None of the mentionedView Answer |
| Answer» E. | |
| 7. |
Let the sequence be 2, 8, 32, 128,……… then this sequence is _______________ |
| A. | An arithmetic sequence |
| B. | A geometic progression |
| C. | A harmonic sequence |
| D. | None of the mentioned |
| Answer» C. A harmonic sequence | |
| 8. |
IF_A,_B,_C_ARE_IN_GP_THEN_RELATION_BETWEEN_A,_B,_C_CAN_BE?$ |
| A. | 2b = 2a + 3c |
| B. | 2a = b+c |
| C. | b =(ac)<sup>1/2</sup> |
| D. | 2c = a + c |
| Answer» D. 2c = a + c | |
| 9. |
Let_the_multiplication_of_the_3_consecutive_terms_in_GP_be_8_then_midlle_of_those_3_terms_would_be:$ |
| A. | 2 |
| B. | 3 |
| C. | 4 |
| D. | 179 |
| Answer» B. 3 | |
| 10. |
Which of the following sequeces in GP will have common ratio 3,where n is an Integer? |
| A. | g<sub>n</sub> = 2n<sup>2</sup> + 3n |
| B. | g<sub>n</sub> = 2n<sup>2</sup> + 3 |
| C. | g<sub>n</sub> = 3n<sup>2</sup> + 3n |
| D. | g<sub>n</sub> = 6(3<sup>n-1</sup>) |
| Answer» E. | |
| 11. |
In the given Geometric progression, ‘225‘ would be a term in it.$ |
| A. | |
| B. | True |
| Answer» C. | |
| 12. |
State whether the given statement is true or false |
| A. | False |
| B. | True |
| Answer» B. True | |
| 13. |
For the given geometric progression find the first fractional term? |
| A. | |
| B. | 2<sup>-1</sup> |
| C. | 2<sup>-2</sup> |
| Answer» B. 2<sup>-1</sup> | |
| 14. |
For the given Geometric progression find the position of first fractional term? |
| A. | |
| B. | 17 |
| C. | 20 |
| Answer» D. | |
| 15. |
In the given Geometric progression the term at position 11 would be |
| A. | |
| B. | 2<sup>35</sup> |
| C. | 2<sup>45</sup> |
| Answer» B. 2<sup>35</sup> | |
| 16. |
Let the sequence be 2, 8, 32, 128,……… then this sequence is |
| A. | An airthmetic sequence |
| B. | A geometic progression |
| C. | A harmonic sequence |
| D. | None of the mentioned |
| Answer» C. A harmonic sequence | |