Explore topic-wise MCQs in General Aptitude.

This section includes 546 Mcqs, each offering curated multiple-choice questions to sharpen your General Aptitude knowledge and support exam preparation. Choose a topic below to get started.

101.

. Which demand refer o the demand for goods that are needed for final consumption

A. Direct demand
B. Derived Demand
C. Indirect Demand
D. None of these.
Answer» B. Derived Demand
Discussion
102.

which stage attracts the maximum number of tourists

A. Growth stage
B. Maturity stage
C. introduction stage
D. None of
Answer» C. introduction stage
Discussion
103.

A tourism policy includes

A. Rules
B. Regulations
C. Objectives and strategies
D. All of the above
Answer» E.
Discussion
104.

Golden Temple is located in ----------

A. Amirtsar
B. Hyderabad
C. Ahammedabad
D. Chennai
Answer» B. Hyderabad
Discussion
105.

The value statistics measures

A. Tourist expenditure
B. Twists days
C. Accommodation
D. None of these.
Answer» B. Twists days
Discussion
106.

In how many ways can the letters of the word SOFTWARE be arranged so that all the vowels be together?

A. 102
B. 360
C. 1440
D. 4320
Answer» E.
Discussion
107.

A group of 7 is to be formed from 6 boys and 4 girls. In how many ways can this be done, if the boys are in majority?

A. 100
B. 80
C. 90
D. 120
Answer» B. 80
Discussion
108.

How many words can be formed from the letters of the word GOLDEN when all the vowels are not together?

A. 480
B. 520
C. 720
D. 120
Answer» B. 520
Discussion
109.

How many ten-digit numbers can be formed using all the digits of 2435753228 such that odd digits appear only in even places?

A. 2! 3! 5!
B. (5!)2
C. \(\frac{(5!)^2}{3!}\)
D. \(\frac{(5!)^2}{3! (2!)^2}\)
Answer» E.
Discussion
110.

In a tournament, 14 teams play league matches. If each team plays against every other team once only then how many matches are played?

A. 105
B. 91
C. 85
D. 78
Answer» C. 85
Discussion
111.

How many five digits numbers can be formed with 1, 2, 3, 4, 5 (without repeating any digit) which are divisible by 5?

A. 24
B. 48
C. 120
D. 72
Answer» B. 48
Discussion
112.

Find the number of ways in which 448 mobile phones can be shared equally among students.

A. 14
B. 12
C. 16
D. 18
Answer» B. 12
Discussion
113.

In how many ways can we select 2 numbers out of 100 numbers?

A. 5050
B. 5000
C. 4950
D. 4900
Answer» D. 4900
Discussion
114.

Find the number of ways in which 594 mobile can be equally divided in the students.

A. 17
B. 14
C. 16
D. 15
Answer» D. 15
Discussion
115.

If \({}_{}^{2n}{C_3}:\;{}_{}^n{C_2} = 44\;:3\), then the value of n is

A. 6
B. 3/2
C. 11
D. 17/2
E. None of the above/More than one of the above
Answer» B. 3/2
Discussion
116.

How many different 6-digit numbers can be formed from the digits 4, 5, 2, 1, 8, 9 ?

A. 480
B. 360
C. 720
D. 840
Answer» D. 840
Discussion
117.

Find the value of \(^{9}p_{2}\)

A. 72
B. 64
C. 75
D. 60
Answer» B. 64
Discussion
118.

In how many different ways can the letters of the word ‘BANKING’ be arranged?

A. 2550
B. 2540
C. 2530
D. 2520
Answer» E.
Discussion
119.

How many different 5 digit numbers can be formed from the digits 9, 0, 4, 1, 6, so that '0' is in the tenth place?

A. 24
B. 84
C. 120
D. 48
Answer» B. 84
Discussion
120.

In how many ways can we arrange ‘n’ things in a row?

A. (n+1)!
B. (n‐1)!
C. 2n!
D. n!
Answer» E.
Discussion
121.

In how many ways can a team of 5 members be selected from 7 members?

A. 20
B. 12
C. 21
D. 17
Answer» D. 17
Discussion
122.

A student has 1234 marbles. He wants to arrange them in equal numbers of rows and columns. The minimum number of marbles that he need more for this purpose are:

A. 62
B. 9
C. 3
D. 1
Answer» B. 9
Discussion
123.

In how many ways can we arrange ‘n’ flowers in a garland?

A. (n‐1)!
B. \(\frac{1}{2}\)(n‐1)!
C. n!
D. \(\frac{1}{2}\)n!
Answer» B. \(\frac{1}{2}\)(n‐1)!
Discussion
124.

From a group of 8 men and 7 women, in how many ways can 6 men and 4 women be selected?

A. 740
B. 840
C. 754
D. 980
Answer» E.
Discussion
125.

If nP3= nP2, then find the value of n.

A. 3
B. 7
C. 9
D. 5
Answer» B. 7
Discussion
126.

How many four-digit numbers can be formed with digits 2, 5, 6, 7 and 8? (Repeating digits are not allowed)

A. 120
B. 115
C. 110
D. 113
Answer» B. 115
Discussion
127.

In how many ways can a man and a woman be chosen out of 10 men and 8 women?

A. 18
B. 80
C. 40
D. 10
Answer» C. 40
Discussion
128.

How many numbers greater than 100 and less than 10,000 can be formed with the digits 9, 8, 7, 6, 5 without repetitions?

A. 120
B. 72
C. 180
D. 24
Answer» D. 24
Discussion
129.

A customer can order different number of pizzas, if he has options with 3 different crusts, 2 sauces and 10 different toppings are:

A. 120
B. 60
C. 216
D. 64
Answer» C. 216
Discussion
130.

For a sports meet, a winners' stand comprising three wooden blocks is in the following form : There are six different colours available to choose from and each of the three wooden blocks is to be painted such that no two of them has the same colour. In how many different ways can the winners' stand be painted?

A. 120
B. 81
C. 66
D. 36
Answer» B. 81
Discussion
131.

Each of A, B and C is a different digit among 1 to 9. How many different values of the sum of A, B and C are possible, if ABA X AA = ACCA ?

A. 1
B. 3
C. 7
D. 8
Answer» D. 8
Discussion
132.

In how many different ways can the letters of the world "LEADING" be arranged in such a way that the vowels always come together?

A. 360
B. 480
C. 720
D. None of these
Answer» B. 480
Discussion
133.

How many minimum number of colors will be required to paint all the sides of a cube without the adjacent sides having the same colors ?

A. 3
B. 4
C. 5
D. 6
Answer» B. 4
Discussion
134.

In how many ways can the letters of the word ‘TANHAJI’ be arranged where each such letter appears exactly once?

A. 3600
B. 7200
C. 2450
D. 2520
Answer» E.
Discussion
135.

In how many ways can we sort the letters of the word MANAGEMENT so that the comparative position of vowels and consonants remains the same as in MANAGEMENT.

A. 1280
B. 720
C. 960
D. 1080
Answer» E.
Discussion
136.

Four persons P, Q, R, and S are to be seated in a row. all facing the same direction, but not necessarily in the same order. P and R cannot sit adjacent to each other. S should be seated to the right of Q. The number of distinct seating arrangements possible is:

A. 6
B. 2
C. 8
D. 4
Answer» B. 2
Discussion
137.

During a break, 130 students have gone to the canteen to buy cakes and coke. 80 students bought cake and 57 students bought coke. If every student has purchased at least one thing, find the number of students who have purchased both.

A. 7
B. 15
C. 17
D. 12
Answer» B. 15
Discussion
138.

Find the number of ways in which a committee consisting of 5 men and 3 women can be formed from 7 men and 5 women?

A. 210
B. 139
C. 317
D. 295
Answer» B. 139
Discussion
139.

How many five - digit prime numbers can be obtained by using all the digits 1, 2, 3, 4 and 5 without repetition of digits?

A. Zero
B. One
C. Nine
D. Ten
Answer» B. One
Discussion
140.

In how many different ways can the letters of the word ‘ABRIDGMENT’ be arranged such that it begins with the letter ‘T’ and each such letter appears exactly once?

A. 6!
B. 10!
C. 9!
D. 8!
Answer» D. 8!
Discussion
141.

In a group of 7 boys and 8 girls, 5 students have to be selected. In how many ways can it be done so that the team consists of two boys and three girls?

A. 1263
B. 760
C. 864
D. 1176
Answer» E.
Discussion
142.

From a group of 7 men and 6 women , a committee of 5 person with more males than females is to be formed . In how many ways can this be done ?

A. 564
B. 645
C. 735
D. 756
Answer» E.
Discussion
143.

Given below are two statementsStatement I : A committee of 4 can be made out of 5 men and 3 women containing at least one woman in 65 ways.Statement II : The number of words which can be formed using letters of the word ARRANGE' so that vowels always occupy even place is 36. In light of the above statements, choose the correct answer from the options given below

A. Both Statement I and Statement II are true
B. Both Statement I and Statement II are false
C. Statement I is true but Statement II is false
D. Statement I is false but Statement II is true
Answer» B. Both Statement I and Statement II are false
Discussion
144.

A person has 4 coins each of different denominations, say Rupee 1, 2 , 5 and 10. What is the number of different sums of money the person can form (using one or more coins at a time)?

A. 6
B. 15
C. 12
D. 11
Answer» C. 12
Discussion
145.

In how many different arrangements can 5 men and 5 women sit around a table so that no two men sit together?

A. 5040
B. 2520
C. 2880
D. 1440
Answer» D. 1440
Discussion
146.

At the end of a business conference all the ten people present all shake hands with each other once. How many handshakes will there be together?

A. 20
B. 45
C. 55
D. 90
Answer» C. 55
Discussion
147.

In how many different ways can 3 red balls, 2 blue balls and 4 yellow balls be arranged so that the balls of the same color come together?

A. 1742
B. 1732
C. 1728
D. 1750
Answer» D. 1750
Discussion
148.

If 2nC3 : nC2 = 12 : 1, then the value of n is ?

A. 6
B. 5
C. 4
D. 3
Answer» C. 4
Discussion
149.

In how many different ways can the letters of the word ELEPHANT be arranged where each such letter appears exactly once?

A. \(\frac{{7!}}{{2!}}\)
B. 7!
C. 8!
D. \(\frac{{8!}}{{2!}}\)
Answer» E.
Discussion
150.

In how many different ways can the letters of the word ‘INCREASE’ be arranged?

A. 10800
B. 10080
C. 20601
D. 20160
Answer» E.
Discussion