IPMAT (I) 2022 QA MCQ | Previous Year IPMAT - Indore Paper
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
The set of real values of x for which the inequality ≤ < holds is
- A.
[2, 81)
- B.
(2, 27)
- C.
[2, 81]
- D.
(2, 27]
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Given, ≤ <
⇒ ≤ <
⇒ ≤ <
⇒ ≤ <
⇒ ≤ < 4
⇒ ≤ <
⇒ 2 ≤ x < 81
∴ x ∈ [2, 81)
Hence, option (a).
Workspace:
The set of all possible values of f(x) for which (81)x + (81)f(x) = 3 is
- A.
(0.25, 3)
- B.
(-∞, 4)
- C.
(-∞, 0.25)
- D.
(3, 4)
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
(81)x + (81)f(x) = 3
⇒ (3)4x + (3)4f(x) = 3
⇒ (3)4x-1 + (3)4f(x)-1 = 1 ...(1)
Now, power of a positive number is always greater than 0.
∴ (3)4x-1 > 0 and (3)4f(x)-1 > 0
From (1): Sum of two positive numbers is 1. This is only possible when both number are less than 1.
⇒ (3)4f(x)-1 < 1
⇒ 4f(x) - 1 < 0
⇒ f(x) < 1/4 or 0.25
∴ f(x) ∈ (-∞, 0.25)
Hence, option (c).
Workspace:
The value of k for which the following lines
x − y − 1 = 0
2x + 3y − 12 = 0
2x − 3y + k = 0
are concurrent is
- A.
1
- B.
-1
- C.
0
- D.
12
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Three lines are cocurrent when they meet at a single point i.e., the equations representing these lines have a common solution.
Consider,
x − y − 1 = 0 ...(1) and
2x + 3y − 12 = 0 ...(2)
(2) + 3 × (1)
⇒ 5x -15 = 0
⇒ x = 3
Putting x = 3 in (1) we get y = 2
∴ (x, y) = (3, 2) is the common solution for first two lines.
Hence, (3, 2) should also satisfy the 3rd equation.
⇒ 2 × 3 − 3 × 2 + k = 0
⇒ k = 0
Hence, option (c).
Workspace:
The lengths of the sides of a triangle are x, 21 and 40, where x is the shortest side. A possible value of x is
- A.
18
- B.
20
- C.
19
- D.
16
Answer: Option B
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
The three sides are x, 21 and 40.
In a triangle:
difference of other two sides < any side < sum of other two sides.
⇒ 40 - 21 < x < 40 + 21
⇒ 19 < x < 61
Only option (b) satisfies this condition.
Hence, option (b).
Workspace:
In a right-angled triangle ABC, the hypotenuse AC is of length 13 cm. A line drawn connecting the midpoints D and E of sides AB and AC is found to be 6 cm in length. The length of BC is
- A.
12 cm
- B.
5 cm
- C.
2√3 cm
- D.
8 cm
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
In a triangle, the line joining the mid-points of two sides is parallel to the third side and half of it.
D and E are midpoints of AB and AC respectively. Hence, DE will be parallel to BC and half of BC.
⇒ DE = BC/2
⇒ BC = 12.
Hence, option (a).
Workspace:
If the five-digit number abcde is divisible by 6 , then which of the following numbers is not necessarily divisible by 6?
- A.
edcba
- B.
eee
- C.
bbadcacede
- D.
cdbae
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
For a number to be divisible by 6, the sum of its digits should be divisible by 3 and it's units digit should be even.
Since, abcde is divisible by 6,
a + b + c + d + e = multiple of 3, and
e is an even number
Option (a): edcba
Here the units digit is a which is not necessarily even, hence edcba is not definitely divisible by 6.
Option (b): eee
Here units digit e is even and sum of the digits = 3e which is a multiple of 3, hence eee is definitely divisible by 6.
Option (c): bbadcacede
Here units digit e is even and sum of the digits = 2(a + b + c + d + e) which is a multiple of 3, hence eee is definitely divisible by 6.
Option (d): cdbae
Here units digit e is even and sum of the digits = (a + b + c + d + e) which is a multiple of 3, hence eee is definitely divisible by 6.
Hence, option (a).
Workspace:
In how many ways can the letters of the word MANAGEMENT be arranged such that no two vowels appear together?
- A.
75600
- B.
25200
- C.
37800
- D.
21600
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Vowels: A, A, E, E
Consonants = M, N, G, M, N, T
We first arrange the consonants in = 180 ways.
This can be represented as: C C C C C C
Now we have 6 places for 4 vowels: | C | C | C | C | C | C |
Out of 7 places we can select 4 places for vowels in 7C4 = 35 ways
4 vowels can be arranged in these 4 places in = 6 ways.
∴ Total number of ways of arranging = 180 × 35 × 8 = 37,800
Hence, option (c).
Workspace:
In a room, there are n persons whose average height is 160 cm. If m more persons, whose average height is 172 cm, enter the room, then the average height of all persons in the room becomes 164 cm. Then m : n is
- A.
1 : 2
- B.
1 : 3
- C.
3 : 1
- D.
2 : 1
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Average height of n persons initially = 160
∴ Sum of the heights of these n persons = 160n
Sum of the heighs of m persons joining = 172m
Total height of (n + m) persons = 160n + 172m
⇒ Average = 164 =
⇒ 164n + 164m = 160n + 172m
⇒ 4n = 8m
⇒ m : n = 1 : 2
Hence, option (a).
Workspace:
The sum of the first 15 terms in an arithmetic progression is 200 , while the sum of the next 15 terms is 350 . Then the common difference is
- A.
7/9
- B.
2/3
- C.
4/9
- D.
1/3
Answer: Option B
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
The sum of the first 15 terms in an arithmetic progression is 200 , while the sum of the next 15 terms is 350 . Then the common difference is
Sum of n terms of an AP = n/2 × [2a + (n - 1)d]
Sum of first 15 terms = 200
∴ 200 = 15/2 × (2a + 14d)
⇒ 2a + 14d = 80/3 ...(1)
Sum of first 30 terms = 200 + 350 = 550
∴ 550 = 30/2 × (2a + 29d)
⇒ 2a + 29d = 110/3 ...(2)
(2) - (1), we get
15d = 30/3
⇒ d = 10/15 = 2/3
Hence, option (b).
Workspace:
Suppose a, b and c are integers such that a > b > c > 0, and A = . Then the value of the determinant of A
- A.
can be positive or negative
- B.
is positve
- C.
is negative
- D.
is zero
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
A = .
Determinant of A = a(cb - a2) + b(ac - b2) + c(ba - c2)
= 3abc - a3 - b3 - c3
= - (a3 + b3 + c3 - 3abc)
= - (a + b + c)(a2 + b2 + c2 - ab - bc - ca)
(a + b + c)(a2 + b2 + c2 - ab - bc - ca) > 0 for a, b, c > 0
∴ Determinant of A = - (a + b + c)(a2 + b2 + c2 - ab - bc - ca) is always negative.
Hence, option (c).
Workspace:
If A = then A2022 is
[Note: There is an error in this question and hence was discarded.]
- A.
None of these
- B.
- C.
- D.
Answer: Option B
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Workspace:
For 0 < θ < π/4, let a = ((sinθ)sinθ)(log2cosθ), b = ((cosθ)sinθ)(log2sinθ), c = ((sinθ)cosθ)(log2cosθ) and d = ((sinθ)sinθ)(log2sinθ). Then, the median value in the sequence a, b, c, d is
- A.
(a + b)/2
- B.
(a + d)/2
- C.
(b + c)/2
- D.
(c + d)/2
Answer: Option B
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
0 < θ < π/4, let's take θ = 30°
sin30° = 1/2 = 0.5, cos30° = √3/2 = 0.866
a = ((sinθ)sinθ)(log2cosθ),
⇒ a = ((1/2)1/2)(log20.866)
b = ((cosθ)sinθ)(log2sinθ),
⇒ b = ((0.866)1/2)(log21/2),
c = ((sinθ)cosθ)(log2cosθ)
⇒ c = ((1/2)0.866)(log20.866)
d = ((sinθ)sinθ)(log2sinθ)
⇒ d = ((1/2)1/2)(log21/2)
(1/2)0.5 > (1/2)0.866 and (log20.866) is negative
∴ c is greater than a.
Similarly, c > a > d > b.
∴ Median of these four numbers = average of 2 middle numbers = (a + d)/2
Hence, option (b).
Workspace:
Let A = {1, 2, 3} and B = {a, b}. Assuming all relations from set A to set B are equally likely, what is the probability that a relation from A to B is also a function?
- A.
1/8
- B.
1/2
- C.
1
- D.
32/26
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
For two sets A and B with m and n elements respectively.
Total relations = 2m × n
Total functions from A to B = nm
Here, A = {1, 2, 3} i.e., 3 elements and B = {a, b} i.e., 2 elements.
∴ Total relations = 23 × 2 = 64
Total functions from A to B = 23 = 8
⇒ Required probability = 8/68 = 1/8.
Hence, option (a).
Workspace:
In a 400-metre race, Ashok beats Bipin and Chandan respectively by 15 seconds and 25 seconds. If Ashok beats Bipin by 150 metres, by how many metres does Bipin beat Chandan in the race?
- A.
80
- B.
100
- C.
150
- D.
50
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
In a 400-metre race, Ashok beats Bipin and Chandan respectively by 15 seconds and 25 seconds. If Ashok beats Bipin by 150 metres, by how many metres does Bipin beat Chandan in the race?
Ashok beat Bipin by 150 metres or 15 seconds.
∴ Speed of Bipin = 150/15 = 10 m/s
Bipin takes = 400/10 = 40 seconds to complete the race.
Time taken by Ashok to complete the race = 40 - 15 = 25 seconds
Time taken by Chandan to complete the race = 25 + 25 = 50 seconds
Distance travelled by Chandan in 40 seconds = 400/50 × 40 = 320 metres.
∴ By the time (40 secs) Bipin completes the race, Chandan has completed 320 m and hence Bipin beats Chandan by 80 meters.
Hence, option (a).
Workspace:
In a bowl containing 60 ml orange juice, 40 ml of water is poured. Thereafter, 100 ml of apple juice is poured to make a fruit punch. Madhu drinks 50 ml of this fruit punch and comments that the proportion of orange juice needs to be higher for better taste. How much orange juice should be poured into the fruit punch that remained, in order to bring up the level of orange juice to 50 percentage?
- A.
100 ml
- B.
40 ml
- C.
80 ml
- D.
60 ml
Answer: Option D
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Fruit Punch contains 60 ml orange juice, 40 ml of water and 100 ml of apple juice i.e., a total of 200 ml.
Madhu drinks 50ml i.e., 1/4th of the this mixture, hence 3/4th of the mixture is left..
Total solutio left = 150 ml
Orange left = 60 × 3/4 = 45 ml
Water left = 40 × 3/4 = 30 ml
Apple left = 100 × 3/4 = 75 ml
Now let x ml of orange is added to bring orange to 50% i.e., 1/2.
∴ 45 + x = 1/2 × (150 + x)
⇒ 90 + 2x = 150 + x
⇒ x = 60 ml
Hence, option (d).
Workspace:
The curve represented by the equation + = 1 is
- A.
an ellipse with the foci on the y-axis
- B.
an ellipse with the foci on the x-axis
- C.
a hyperbola with the foci on the x-axis
- D.
a hyperbola with the foci on the y-axis
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Equation represents an ellipse.
Hence, the given curve is an ellipse. We need to figure out the foci of this ellipse.
Also, Cos√2 - cos√3 > Sin√2 - Sin√3 > 0
⇒ b2 > a2
∴ Foci is on y-axis.
Hence, option (a).
Workspace:
A set of all possible values the function f(x) = , where x ≠ 0, takes is
- A.
{1}
- B.
{1, -1}
- C.
{1, 0}
- D.
{1, 0, -1}
Answer: Option B
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Given, f(x) =
Case 1: x > 0
⇒ |x| = x
∴ f(x) = = 1
Case 2: x < 0
⇒ |x| = - x
∴ f(x) = = - 1
∴ f(x) = 1 when x > 0 while f(x) = -1 when x < 0.
⇒ f(x) can take only two values {1, -1}.
Hence, option (b).
Workspace:
When the square of the difference of two natural numbers is subtracted from the square of the sum of the same two numbers and the result is divided by four, we get
- A.
the product of the LCM and HCF of the two numbers
- B.
the HCF of the two numbers
- C.
the LCM of the two numbers
- D.
the square of the product of the two numbers
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Let the two numbers be hx and hy, where h is the HCF of thest two numbers and LCM of these numbers = hxy.
Now, (hx + hy)2 - (hx - hy)2
= (hx)2 + (hy)2 + 2h2xy - ((hx)2 + (hy)2 - 2h2xy)
= 4h2xy
= 4 × h × hxy
= 4 × HCF × LCM
Hence, option (a).
Workspace:
The cost of a piece of jewellery is proportional to the square of its weight. A piece of jewellery weighing 10 grams is INR 3600. The cost of a piece of jewellery of the same kind weighing 4 grams is
- A.
INR 1220
- B.
INR 600
- C.
INR 576
- D.
INR 1440
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Given, price ∝ (weight)2
∴ =
⇒ = =
⇒ p2 = 3600 × 4/25 = 576
Hence, option (c).
Workspace:
The sum of the squares of all the roots of the equation x2 + |x + 4| + |x − 4| − 35 = 0 is
- A.
74
- B.
175
- C.
50
- D.
148
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Given, x2 + |x + 4| + |x − 4| − 35 = 0
Here the critical points are -4 and 4.
Case 1: x ≥ 4
∴ x2 + (x + 4) + (x − 4) − 35 = 0
⇒ x2 + 2x - 35 = 0
⇒ (x + 7)(x - 5) = 0
⇒ x = - 7 or 5
Since x ≥ 4, hence x = -7 is rejected.
∴ x = 5
Case 2: - 4 ≤ x < 4
∴ x2 + (x + 4) - (x − 4) − 35 = 0
⇒ x2 - 17 = 0
⇒ x2 = 17
⇒ x = ±√17
Both these values are rejected since -4 ≤ x < 4.
Case 3: x < - 4
∴ x2 - (x + 4) - (x − 4) − 35 = 0
⇒ x2 - 2x - 35 = 0
⇒ (x - 7)(x + 5) = 0
⇒ x = -5 [Since x < -4]
∴ Possible solutions are 5 and -5
∴ Sum of squares of solutions = 25 + 25 = 50.
Hence, option (c).
Workspace:
Let A and B be two sets such that the Cartesian product A × B consists of four elements. If two elements of A × B are (1,4) and (4,1), then
- A.
None of these
- B.
A × B ≠ B × A
- C.
∅ ∈ A × B
- D.
A × B = B × A
Answer: Option D
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
2 elements of A × B are (1,4) and (4,1).
∴ 1 and 4 are elements of A and 4 and 1 are elements of B.
⇒ Both A and B have at least 2 elements.
Now, A × B has 4 elements and both A and B have at least 2 elements. This is possbile when both A and B have exactly 2 elements each.
⇒ A = {1, 4} and B = {4, 1}
⇒ A × B = {(1, 4), (1, 1), (4, 4), (4, 1)}
Also, B × A = {(4, 1), (4, 4), (1, 1), (1, 4)}
We can see that A × B = B × A.
Hence, option (d).
Workspace:
If f(x2 + f(y)) = xf(x) + y for all non-negative integers x and y, then the value of [f(0)]2 + f(0) equals _________.
- A.
2
- B.
0
- C.
6
- D.
1
Answer: Option B
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
If f(x2 + f(y)) = xf(x) + y for all non-negative integers x and y, then the value of [f(0)]2 + f(0) equals _________.
Given, f(x2 + f(y)) = xf(x) + y
Subsituting x = 1 and y = 0, we get
f(1 + f(0)) = f(1)
Now, if f(x) = f(y) it implies that x = y
Hence, 1 + f(0) = 1
⇒ f(0) = 0
∴ [f(0)]2 + f(0) = [0]2 + 0 = 0
Hence, option (b).
Workspace:
If one of the factors of the number 3728173 is randomly chosen, then the probability that the chosen factor will be a perfect square is
- A.
5/36
- B.
1/12
- C.
3/40
- D.
5/32
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Number of factors of 3728173 = (7 + 1)(8 + 1)(3 + 1) = 8 × 9 × 4 = 288
Number of factors of 3728173 which are perfect squares = (4)(5)(2) = 40
Required probability = 40/288 = 10/72 = 5/36.
Hence, option (a).
Workspace:
The number of four-digit integers which are greater than 1000 and divisible by both 2 and 3, but not by 5, is
- A.
1333
- B.
1666
- C.
1200
- D.
1500
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Required numbers
= Numbers which are divisible by both 2 and 3 - Numbers which are divisible by both 2, 3 and 5
= Numbers which are divisible by 6 - Numbers which are divisible by 30
Total number of 4 digit numbers = 9999 - 999 = 9000
Number of 4 digit numbers divisible by 6 = 9000/6 = 1500
Number of 4 digit numbers divisible by 30 = 9000/30 = 300
Required numbers = 1500 - 300 = 1200.
Hence, option (c).
Workspace:
Ayesha is standing atop a vertical tower 200 m high and observes a car moving away from the tower on a straight, horizontal road from the foot of the tower. At 11:00 AM, she observes the angle of depression of the car to be 45°. At 11:02 AM, she observes the angle of depression of the car to be 30°. The speed at which the car is moving is approximately
- A.
6.3 km per hour
- B.
8.45 km per hour
- C.
10.6 km per hour
- D.
4.39 km per hour
Answer: Option D
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
At 11 am, the car is at C and Ayesha is at A.
In △ABC, angle ACB = 45°
Tan45° = 1 =
⇒ BC = AB = 200
At 11:02 am, the car is at D and Ayesha is at A.
In △ABD, angle ADB = 30°
Tan30° = =
⇒ BD = AB√3 = 200√3
⇒ CD = 200√3 - 200 = 200(√3 - 1) = 200(0.732) = 146.4 m
∴ The car moved 146.4 m in 2 minutes.
⇒ Speed of the car = = 4.392 kmph.
Hence, option (d).
Workspace:
Directions for next 5 questions:
A showroom is open on all seven days of the week throughout the year. There are five employees Alex, Bhabha, Cathy, Dilip and Ethan who work in the showroom. Every day except Sunday, two employees are required while on Sunday three employees need to work. Every employee works for three days in a week. Some additional information is also provided:
- Every employee works on two consecutive days while the third day is not consecutive.
- Alex and Dilip work together on Tuesday and Wednesday while the other working day differs for them.
- Neither Bhabha nor Cathy works with Alex on any day.
- Cathy does not work either on Saturday or on Monday.
Number of days Bhabha and Cathy work together in a week is
- A.
0
- B.
1
- C.
3
- D.
2
Answer: Option D
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Alex and Dilip work together on Tuesday and Wednesday while the other working day differs for them.
Alex and Dilip will not work on Monday and Thursday, since no one works for 3 consecutive days.
Cathy does not work on Saturday and Monday but she needs to work on 2 consecutive days. This is possible when Cathy works on Thursday and Friday. The 3rd day Cathy works should not be consecutive, hence it can only be Sunday.
Now, Cathy does not work with Alex, hence the 3rd day Alex works can only be Saturday. Dilip and Bhabha do not work with Alex on this day.
2 people need to work on Monday, these 2 people can only be Bhabha and Ethan.
The 2nd person to work on Saturday can only be Ethan.
Since Ethan should work for 2 consecutive days but not 3, Ethan should work on Friday as well.
Now, Bhabha needs to work on 3 days. This is possible when Bhabha works on Sunday and Thursday.
3 people need to work on Sunday hence Dilip works on Sunday.
[Note: Since they are working on all 7 days throughout the year, B works on two consecutive days i.e., Sunday & Monday]
Bhabha and Cathy work together for 2 days i.e., on Thursday and Sunday.
Hence, option (d).
Workspace:
Which among the following employees do not work together on any of the days?
- A.
Bhabha and Dilip
- B.
Bhabha and Ethan
- C.
Cathy and Dilip
- D.
Dilip and Ethan
Answer: Option D
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Consider the solution to first question of this set.
Dilip and Ethan do not work together on any of the days.
Hence, option (d).
Workspace:
One of the days Alex works on is
- A.
Monday
- B.
Friday
- C.
Sunday
- D.
Saturday
Answer: Option D
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Consider the solution to first question of this set.
Alex works on Saturday.
Hence, option (d).
Workspace:
The consecutive days on which Ethan works are
- A.
Thursday and Friday
- B.
Saturday and Sunday
- C.
Friday and Saturday
- D.
Sunday and Monday
Answer: Option C
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Consider the solution to first question of this set.
Ethan works consecutively on Friday and Saturday.
Hence, option (c).
Workspace:
Employees who work on Sunday are
- A.
Bhabha, Cathy and Dilip
- B.
Bhabha, Cathy and Ethan
- C.
Alex, Dilip and Ethan
- D.
Cathy, Dilip and Ethan
Answer: Option A
Get your concepts cleared through our Self-Study Courses.
Join our Telegram Channel for CAT/MBA Preparation.
Explanation :
Consider the solution to first question of this set.
Bhabha, Cathy and Dilip work on Sunday.
Hence, option (a).
Workspace:
Feedback
Help us build a Free and Comprehensive Preparation portal for various competitive exams by providing us your valuable feedback about Apti4All and how it can be improved.