All Categories MCQs
Topic Notes: All Categories
General Description
Plato
- Biography: Ancient Greek philosopher (427–347 BCE), student of Socrates and teacher of Aristotle, founder of the Academy in Athens.
- Important Ideas:
- Theory of Forms
- Philosopher-King
- Ideal State
2431
What is the next number in the series: 144, 128, 112, 96, ...?
Answer:
80
The pattern here is a constant subtraction of 16 from the previous term (144 - 16 = 128, 128 - 16 = 112). Following this rule, subtracting 16 from 96 leaves exactly 80.
2432
Identify the next number in the pattern: 99, 88, 77, 66, ...
Answer:
55
This series consists of multiples of 11 in descending order. The common difference is a subtraction of 11 (99 - 11 = 88). Continuing this pattern, 66 - 11 results in 55.
2433
Which number completes the series: 75, 62, 49, 36, ...?
Answer:
23
The numbers in this series decrease by exactly 13 each time (75 - 13 = 62, 62 - 13 = 49). To find the next number, we subtract 13 from 36, which yields 23.
2434
Find the next term: 200, 188, 176, 164, ...
Answer:
152
The sequence follows a decreasing arithmetic progression with a common difference of 12 (200 - 188 = 12). Subtracting 12 from the last term, 164 - 12, gives the answer 152.
2435
What number follows in the series: 150, 135, 120, 105, ...?
Answer:
90
This sequence decreases by a constant difference of 15 between consecutive terms (150 - 135 = 15). Therefore, the next term is found by subtracting 15 from 105, resulting in 90.
2436
Identify the missing term in the descending series: 82, 73, 64, 55, ...
Answer:
46
The pattern involves subtracting 9 from the preceding number to obtain the next one (82 - 9 = 73, 73 - 9 = 64). Applying this logic, 55 - 9 equals 46.
2437
Find the next number in the sequence: 55, 48, 41, 34, ...
Answer:
27
By checking the difference between terms (55 - 48 = 7), we observe that the series decreases by a constant value of 7 at each step. Subtracting 7 from 34 gives 27.
2438
What is the next term in the series: 100, 90, 80, 70, ...?
Answer:
60
This is a descending arithmetic progression where each term decreases by exactly 10. Subtracting 10 from the last term (70 - 10) provides the next number in the series, which is 60.
2439
Find the missing number: 12, 27, 42, 57, ...
Answer:
72
The sequence follows a constant additive pattern. The difference between consecutive terms is 15 (27 - 12 = 15). Adding 15 to the last provided term (57 + 15) results in 72.
2440
What will be the next number in the series: 1, 14, 27, 40, ...?
Answer:
53
This arithmetic series progresses by adding 13 to the previous number. Checking the differences: 14 - 1 = 13, and 27 - 14 = 13. Applying this rule to the last term, 40 + 13 equals 53.