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CAT Previous Year Questions: Number Series- 2 (June 6) - CAT MCQ


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10 Questions MCQ Test Daily Test for CAT Preparation - CAT Previous Year Questions: Number Series- 2 (June 6)

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CAT Previous Year Questions: Number Series- 2 (June 6) - Question 1

How many of the integers 1, 2, … , 120, are divisible by none of 2, 5 and 7?     [2020] 

Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 1

The number of multiples of 2 between 1 and 120 = 60
The number of multiples of 5 between 1 and 120 which are not multiples of 2 = 12
The number of multiples of 7 between 1 and 120 which are not multiples of 2 and 5 = 7
Hence, number of the integers 1, 2, … , 120, are divisible by none of 2, 5 and 7 = 120 – 60 – 12 – 7 = 41

*Answer can only contain numeric values
CAT Previous Year Questions: Number Series- 2 (June 6) - Question 2

Let N, x and y be positive integers such that N = x + y, 2 < x < 10 and 14 < y < 23. If N > 25, then how many distinct values are possible for N?     [2020] 


Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 2

Possible values of x = 3,4,5,6,7,8,9
When x = 3, there is no possible value of y
When x = 4, the possible values of y = 22
When x = 5, the possible values of y=21,22
When x = 6, the possible values of y = 20.21,22
When x = 7, the possible values of y = 19,20,21,22
When x = 8, the possible values of y=18,19,20,21,22
When x = 9, the possible values of y=17,18,19,20,21,22
The unique values of N = 26,27,28,29,30,31

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*Answer can only contain numeric values
CAT Previous Year Questions: Number Series- 2 (June 6) - Question 3

How many integers in the set {100, 101, 102, …, 999} have at least one digit repeated?    [2020] 


Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 3

Total number of numbers from 100 to 999 = 900
The number of three digits numbers with unique digits:
The hundredth’s place can be filled in 9 ways ( Number 0 cannot be selected)
Ten’s place can be filled in 9 ways
One’s place can be filled in 8 ways
Total number of numbers = 9*9*8 = 648
Number of integers in the set {100, 101, 102, …, 999} have at least one digit repeated = 900 – 648 = 252

CAT Previous Year Questions: Number Series- 2 (June 6) - Question 4

What is the largest positive integer n such that  is also a positive integer?         [2019]

Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 4



which will be maximum when n - 4 = 8
n = 12

*Answer can only contain numeric values
CAT Previous Year Questions: Number Series- 2 (June 6) - Question 5

How many pairs (m, n) of positive integers satisfy the equation m2 + 105 = n2?         [2019]


Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 5

n2 - m2 = 105
(n - m)(n + m) = 1*105, 3*35, 5*21, 7*15, 15*7, 21*5, 35*3, 105*1.
n - m = 1, n + m = 105  ⇒ n = 53, m = 52
n - m = 3, n + m = 35 ⇒ n = 19, m = 16
n - m = 5, n + m = 21  ⇒ n =13, m = 8
n - m = 7, n + m = 15 ⇒ n = 11, m = 4
n - m = 15, n + m = 7 ⇒ n = 11, m = -4
n - m = 21, n + m = 5 ⇒ n = 13, m = -8
n - m = 35, n + m = 3 ⇒ n = 19, m = -16
n - m = 105, n + m = 1 ⇒ n = 53, m = -52
Since only positive integer values of m and n are required. There are 4 possible solutions.

*Answer can only contain numeric values
CAT Previous Year Questions: Number Series- 2 (June 6) - Question 6

How many factors of 24 × 35 × 104 are perfect squares which are greater than 1?        [2019]


Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 6

24 × 35 × 10
=24 × 35 × 24 × 5
= 2× 35 × 5
For the factor to be a perfect square, the factor should be even power of the number.
In 28, the factors which are perfect squares are 20, 22, 24, 26, 28 = 5
Similarly, in 35, the factors which are perfect squares are 30, 32, 34 = 3
In 54, the factors which are perfect squares are 50, 52, 54 = 3
Number of perfect squares greater than 1 = 5 × 3 × 3 - 1
= 44

*Answer can only contain numeric values
CAT Previous Year Questions: Number Series- 2 (June 6) - Question 7

In a six-digit number, the sixth, that is, the rightmost, digit is the sum of the first three digits, the fifth digit is the sum of first two digits, the third digit is equal to the first digit, the second digit is twice the first digit and the fourth digit is the sum of fifth and sixth digits. Then, the largest possible value of the fourth digit is       [2019]


Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 7

Let the six-digit number be ABCDEF
F = A + B + C, E= A + B, C = A, B = 2A, D = E + F.
Therefore D = 2A + 2B + C = 2A + 4A + A = 7A.
A cannot be 0 as the number is a 6 digit number.
A cannot be 2 as D would become 2 digit number.
Therefore A is 1 and D is 7.

CAT Previous Year Questions: Number Series- 2 (June 6) - Question 8

The product of two positive numbers is 616. If the ratio of the difference of their cubes to the cube of their difference is 157 : 3, then the sum of the two numbers is       [2019] 

Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 8

Assume the numbers are a and b, then ab = 616
We have, 


Adding ab = 616 on both sides, we get
a2 + b2 + ab + ab = 3 × 4 × 157 + 616
=> (a + b)2 = 3 × 4 × 157 + 616 = 2500
=> a + b = 50

*Answer can only contain numeric values
CAT Previous Year Questions: Number Series- 2 (June 6) - Question 9

While multiplying three real numbers, Ashok took one of the numbers as 73 instead of 37. As a result, the product went up by 720. Then the minimum possible value of the sum of squares of the other two numbers is         [2018]


Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 9

We know that one of the 3 numbers is 37.
Let the product of the other 2 numbers be x.
It has been given that 73x-37x = 720
36x = 720
x = 20
Product of 2 real numbers is 20.
We have to find the minimum possible value of the sum of the squares of the 2 numbers.
Let x=a*b
It has been given that a*b=20
The least possible sum for a given product is obtained when the numbers are as close to each other as possible.
Therefore, when a=b, the value of a and b will be √20.
Sum of the squares of the 2 numbers 20 + 20 = 40.
Therefore, 40 is the correct answer.

*Answer can only contain numeric values
CAT Previous Year Questions: Number Series- 2 (June 6) - Question 10

The number of integers x such that 0.25 ≤ 2x ≤ 200 and 2x + 2 is perfectly divisible by either 3 or 4, is         [2018]


Detailed Solution for CAT Previous Year Questions: Number Series- 2 (June 6) - Question 10

At x = 0, 2x = 1 which is in the given range [0.25, 200]
2+ 2 = 1 + 2 = 3 Which is divisible by 3. Hence, x 0 is one possible solution.
At x = 1, 2x = 2 which is in the given range [0.25, 200]
2+ 2 = 2 + 2 = 3 Which is divisible by 4. Hence, x = 1 is one possible solution.
At x = 2, 2x = 4 which is in the given range [0.25, 200]
2x + 2 = 4 + 2 = 6 Which is divisible by 3. Hence, x = 2 is one possible solution.
At x = 3, 2x = 8 which is in the given range [0.25, 200]
2x + 2 = 8 + 2 = 3 Which is not divisible by 3 or 4. Hence, x = 3 can't be a solution.
At x = 4, 2x = 16 which is in the given range [0.25, 200]
2x + 2 = 16 + 2 = 18 Which is divisible by 3. Hence, x 4 is one possible solution.
At x = 5, 2x = 32 which is in the given range [0.25, 200]
2x + 2 = 32 + 2 = 34 Which is not divisible by 3 or 4. Hence, x = 5 can't be a solution.
At x = 6, 2= 64 which is in the given range [0.25, 200]
2x + 2 = 64 + 2 = 66 Which is divisible by 3. Hence, x 6 is one possible solution.
At x = 7, 2= 128 which is in the given range [0.25, 200]
2x + 2 = 128 + 2 = 130 Which is not divisible by 3 or 4. Hence, x = 7 can't be a solution.
At x = 8, 2= 256 which is not in the given range [0.25, 200]. Hence, x can't take any value greater than 7.
Therefore, all possible values of x = {0,1,2,4,6).

Hence, we can say that 'x' can take 5 different integer values.

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