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Mathematics Mock Test - 7 - CDS MCQ


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30 Questions MCQ Test CDS (Combined Defence Services) Mock Test Series 2024 - Mathematics Mock Test - 7

Mathematics Mock Test - 7 for CDS 2024 is part of CDS (Combined Defence Services) Mock Test Series 2024 preparation. The Mathematics Mock Test - 7 questions and answers have been prepared according to the CDS exam syllabus.The Mathematics Mock Test - 7 MCQs are made for CDS 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Mathematics Mock Test - 7 below.
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Mathematics Mock Test - 7 - Question 1

A red light flashes three times per minute and a green light flashes five times in 2 min at regular intervals. If both lights start flashing at the same time, how many times do they flash together in each hour?

Detailed Solution for Mathematics Mock Test - 7 - Question 1

A red light flashes three times per minute and a green light flashes five times in 2 min at regular intervals. So red light fashes after every 1/3 min and green light flashes every 2/5 min. LCM of both the fractions is 2 min.
Hence, they flash together after every 2 min. So in an hour they flash together 30 times.

Mathematics Mock Test - 7 - Question 2

All the page numbers from a book are added, beginning at page 1. 

However, one page number was added twice by mistake. The sum obtained was 1000. Which page number was added twice?

Detailed Solution for Mathematics Mock Test - 7 - Question 2

The Correct Answer is C: 10

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Mathematics Mock Test - 7 - Question 3

A nursery has 363, 429 and 693 plants respectively of 3 distinct varieties. It is desired to place these plants in straight rows of plants of 1 variety only so that the number of rows required is the minimum. What is the size of each row and how many rows would be required?

 

Detailed Solution for Mathematics Mock Test - 7 - Question 3

The size of each row would be the HCF of 363, 429 and 693. Difference between 363 and 429 =66.

Factors of 66 are 66, 33, 22, 11, 6, 3, 2, 1.

66 need not to be checked as it is even and 363 is odd. 33 divides 363, hence would automatically divide

429 and also divides 693. Hence, 33 is the correct answer for the size of each row.

For how many rows would be required we need to follow the following process:

Minimum number of rows required = 363/33 + 429/33 + 693/33 = 11 + 13 + 21 = 45 rows.

Therefore, the correct answer is A

Mathematics Mock Test - 7 - Question 4

Sailesh is working as a sales executive with a reputed FMCG Company in Hyderabad. As per the Company’s policy, Sailesh gets a commission of 6% on all sales upto Rs. 1,00,000 and 5% on all sales in excess of this amount. If Sailesh remits Rs. 2,65,000 to the FMCG company after deducting his commission, his total sales were worth:

Detailed Solution for Mathematics Mock Test - 7 - Question 4

Let total sales be ‘x’

The commission that Sailesh will get is x – 265000

He gets 6% on sales upto 100000 and 5% on sales greater than that.

Calculating his commission on total sales:

0.06*100000 + 0.05(x-100000)

Equating,

0.05x + 1000 = x – 265000

0.95x = 266000

x= 280000

Hence, his sales were worth 280,000

Mathematics Mock Test - 7 - Question 5

Anil buys 12 toys and labels each with the same selling price. He sells 8 toys initially at 20% discount on the labeled price. Then he sells the remaining 4 toys at an additional 25% discount on the discounted price. Thus, he gets a total of Rs 2112, and makes a 10% profit. With no discounts, his percentage of profit would have been

Detailed Solution for Mathematics Mock Test - 7 - Question 5

Let the CP of the each toy be “x”. CP of 12 toys will be “12x”. Now the shopkeeper made a 10% profit on CP. This means that

12x(1.1)= 2112 or x=160 . Hence the CP of each toy is ₹160.

Now let the SP of each toy be “m”. Now he sold 8 toys at 20% discount. This means that 8m(0.8) or 6.4m

He sold 4 toys at an additional 25% discount. 4m(0.8)(0.75)=2.4m  Now 6.4m+2.4m=8.8m=2112 or m=240

Hence CP= 160 and SP=240. Hence profit percentage is 50%.

Mathematics Mock Test - 7 - Question 6

5616 ÷ 18 ÷ 8 = ?

Detailed Solution for Mathematics Mock Test - 7 - Question 6

5616 ÷ 18 = 312
312 / 8 = 39

Mathematics Mock Test - 7 - Question 7

The average weight of a class of 10 students is increased by 2 kg when one student of 30kg left and another student joined. After a few months, this new student left and another student joined whose weight was 10 less than the student who left now. What is the difference between the final and initial averages?

Detailed Solution for Mathematics Mock Test - 7 - Question 7

Change in total weight of 10 students = difference in weight of the student who joined and the student

=> weigth of first student who left = 30 + (10×2) = 50

weight of the student who joined last = 50 – 10 = 40...
Thus change in average weight = (40 – 30)/10 = 1...
 

Mathematics Mock Test - 7 - Question 8

The average of the first ten composite numbers is 

Detailed Solution for Mathematics Mock Test - 7 - Question 8

The first ten composite numbers are: 4, 6, 8, 9, 10, 12, 14, 15, 16, 18. 

Required average:

= (4 + 6 + 8 + 9 + 10 + 12 + 14 + 15 + 16 + 18) / 10
= 112 / 10
= 11.2

Mathematics Mock Test - 7 - Question 9

The incomes of Sheldon, Leonard, and Howard are in the ratio of 4 : 5 : 6 respectively and their spending are in the ratio of 6 : 7 : 8 respectively. If Sheldon saves one fourth his income, then the savings of Sheldon, Leonard, and Howard are in the ratio:

Detailed Solution for Mathematics Mock Test - 7 - Question 9

Let the incomes be 4x, 5x, 6x and the spending be 6y, 7y, 8y and savings are (4x–6y), (5x–7y) & (6x–8y)
Sheldon saves 1/4th of his income.

Therefore:

⇒ 4x – 6y = 4x / 4
⇒ 4x – 6y = x
⇒ 3x = 6y
⇒ x / y = 2
 y = x / 2

Ratio of Sheldon’s Leonard’s & Howard’s savings:

= 4x – 6y : 5x – 7y : 6x – 8y
= x : 5x – 7y : 6x – 8y
= x : 5x – 7x / 2 : 6x – 8x / 2
= x : 3x / 2 : 2x
= 2 : 3 : 4 

Mathematics Mock Test - 7 - Question 10

In a stream, Q lies in between P and R such that it is equidistant from both P and R. A boat can go from P to Q and back in 6 hours 30 minutes while it goes from P to R in 9 hours. How long would it take to go from R to P?

Detailed Solution for Mathematics Mock Test - 7 - Question 10

Since P to R is double the distance of P to Q,
Therefore, it is evident that the time taken from P to R and back would be double the time taken from P to Q and back (i.e. double of 6.5 hours = 13 hours).

Since going from P to R takes 9 hours, coming back from R to P would take 4 hours i.e. 139 = 4

So Option A is correct

Mathematics Mock Test - 7 - Question 11

A dog sees a cat. It estimates that the cat is 25 leaps away. The cat sees the dog and starts running with the dog in hot pursuit. If in every minute, the dog makes 5 leaps and the cat makes 6 leaps and one leap of the dog is equal to 2 leaps of the cat. Find the time in which the cat is caught by the dog (assume an open field with no trees).

Detailed Solution for Mathematics Mock Test - 7 - Question 11

Initial distance = 25 dog leaps
Per-minute dog makes 5 dog leaps and cat makes 6 cat leaps = 3 dog leaps
⇒  Relative speed = 2 dog leaps / minutes
⇒  An initial distance of 25 dog leaps would get covered in 12.5 minutes.

So Option D is correct

Mathematics Mock Test - 7 - Question 12

If the roots of the equation (a+ b2)x− 2b(a + c)x + (b2+c2) = 0 are equal then 

Detailed Solution for Mathematics Mock Test - 7 - Question 12

(a+ b2)x− 2b(a + c)x + (b2+c2) = 0
Roots are real and equal ∴ D = 0
D = b− 4ac = 0

⇒ [−2b(a+c)]− 4(a+ b2)(b+ c2) = 0
⇒ b2(a+ c+ 2ac) −(a2b2 + a2c2 + b4 + c2c2) = 0
⇒ b2a+ b2c+ 2acb− a2b− a2c− b4 − b2c2 = 0
⇒ 2acb− a2c− 2acb= 0
⇒ (b− ac)= 0
⇒ b2 = ac

Mathematics Mock Test - 7 - Question 13

The sum of the squares of two consecutive positive integers exceeds their product by 91. Find the integers?

Detailed Solution for Mathematics Mock Test - 7 - Question 13

Let the two consecutive positive integers be x and x + 1.

⇒ x2 + (x + 1)2 - x(x + 1) = 91
⇒ x2 + x - 90 = 0
⇒ (x + 10)(x - 9) = 0
⇒ x = -10 or 9.
x = 9 [∵ x is positive]

Hence the two consecutive positive integers are 9 and 10.

Mathematics Mock Test - 7 - Question 14

For a real number x the condition |3x - 20| + |3x - 40| = 20 necessarily holds if

Detailed Solution for Mathematics Mock Test - 7 - Question 14

Case 1: x ≥ 40/3

we get 3x-20 +3x-40 = 20

6x=80


Case 2
we get 3x - 20 + 40 - 3x = 20
we get 20 = 20
So we get x 
Case 3x  < 20/3
we get 20-3x+40-3x =20
40=6x
x = 20/3
but this is not possible
so we get from case 1,2 and 3

Now looking at options
we can say only option C satisfies for all x .
Hence 7<x<12.

Mathematics Mock Test - 7 - Question 15

Consider the function f(x) = (x + 4)(x + 6)(x + 8) ⋯ (x + 98). The number of integers x for which f(x) < 0 is:

Detailed Solution for Mathematics Mock Test - 7 - Question 15

The critical points of the function are -4, -6, -8, … , -98 ( 48 points).

For all integers less than -98  and greater than -4 f(x) > 0 always .

for x= -5, f(x) < 0

Similarly, for x= -9, -13, …., -97 (This is an AP with common difference -4)

Hence, in total there are 24 such integers satisfying f(x)< 0.

Mathematics Mock Test - 7 - Question 16

If sin (A + B) = √3 / 2 and tan (A – B) = 1. What are the values of A and B?

Detailed Solution for Mathematics Mock Test - 7 - Question 16

Mathematics Mock Test - 7 - Question 17

A right angled triangle has a height ‘p’, base ‘b’ and hypotenuse ‘h’. Which of the following value can h2 not take, given that p and b are positive integers?

Detailed Solution for Mathematics Mock Test - 7 - Question 17

We know that,
h2 = p2 + b2 Given, p and b are positive integer, so h2 will be sum of two perfect squares.

We see 
a) 72 + 52 = 74
b) 62 + 42 = 52
c) 32 + 22 = 13
d) Can’t be expressed as a sum of two perfect squares

Therefore the answer is Option D.

Mathematics Mock Test - 7 - Question 18

Three number are in the ratio of 3 : 4 : 5 and their L.C.M. is 2400. Their H.C.F. is:

Detailed Solution for Mathematics Mock Test - 7 - Question 18

Mathematics Mock Test - 7 - Question 19

Q. Find the greatest number that will divide 43, 91 and 183 so as to leave the same remainder in each case.

Detailed Solution for Mathematics Mock Test - 7 - Question 19

Given numbers are 43, 91, and 183.
Subtract smallest number from both the highest numbers.
We have three cases:
183 > 43; 183 > 91 and 91 > 43
Therrefore,
183 – 43 = 140
183 – 91 = 92
91 – 43 = 48
Now, we have three new numbers: 140, 48 and 92.

HCF (140, 48 and 92) = 4
The highest number that divides 183, 91, and 43 and leaves the same remainder is 4.

Mathematics Mock Test - 7 - Question 20

A machine costs Rs. 1025. If it is sold at a loss of 25%, what will be its cost price as a percentage of its selling price? 

Detailed Solution for Mathematics Mock Test - 7 - Question 20

A loss of 25% means a cost price of 100 corresponding to a selling price of 75. CP as a percentage of the SP would then be 133.33%

Alternatively,

Cost price = 1025
Loss% = 25%
SP = 1025 - (1025 * 25/100) = 768.75
⇒ 768.75 * (x/100) = 1025
⇒ 768.75x = 102500
⇒ x = 102500/768.75 = 133.33%

So option D is correct

Mathematics Mock Test - 7 - Question 21

E sold at table to R at a profit of 25%.R sold the same table to S for Rs. 90 thereby making a profit of 20%. Find the price at which E bought the table from Z if it is known that Z gained 25% in the transaction.

Detailed Solution for Mathematics Mock Test - 7 - Question 21

R sold the table at 20% profit at Rs. 90. Thus R's cost price x 1.2 = 90
R’s Cost price = Rs. 75

We also know that E sold it to R at 25% profit.
Thus, E’s Cost price x 1.25 = 75
⇒ E’s cost price = 60

So option D is correct

Mathematics Mock Test - 7 - Question 22

Arun took a loan of Rs. 1400 with simple interest for as many years as the rate of interest. If he paid Rs.686 as interest at the end of the loan period, what was the rate of interest?

Detailed Solution for Mathematics Mock Test - 7 - Question 22

Simple Interest (SI) = P N R / 100

P is the Principal loan amount = Rs.1400

N is the number of years of deposit

R is the rate of interest

It is given that the loan period is as many years as the rate of interest.

So, N = R

Interest at the end of the loan period (SI ) = Rs.686

So,

686 = 1400 * R * R /100

R2 = 686*100 /1400

R2 = 49

R = 7%

Mathematics Mock Test - 7 - Question 23

What will be the ratio of simple interest earned by certain amount at the same rate of interest for 5 years and that for 15 years?

Detailed Solution for Mathematics Mock Test - 7 - Question 23

Simple Interest = PRT / 100
Here P = Principal, R = Rate of interest and T = time period
Hence, Simple Interest ∝ T
Required Ratio = (Simple Interest for 5 years) / (Simple Interest for 15 years)
⇒ T1/ T2 = 5 / 15
⇒ 1 / 3 = 1 : 3

Mathematics Mock Test - 7 - Question 24

Hunar wrote two sections of CAT paper; Verbal and QA in the same order. The probability of her passing both sections is 0.6. The probability of her passing the verbal section is 0.8. What is the probability of her passing the QA section given that she has passed the Verbal section?

Detailed Solution for Mathematics Mock Test - 7 - Question 24
  • Let P(QA) = passing QA’s section
  • P(V) = passing Verbal section
  • So, P(QA/V) = P(QA∩V)/P(V) = 0.6/0.8 = 0.75
    Hence, the correct answer is option A.
Mathematics Mock Test - 7 - Question 25

Three coins are tossed. What is the probability of getting at most two tails?

Detailed Solution for Mathematics Mock Test - 7 - Question 25

Total number of outcomes possible when a coin is tossed = 2 (∵ Head or Tail)

  • Hence, total number of outcomes possible when 3 coins are tossed, n(S) = 2 x 2 x 2 = 8
    ​(∵ S = {TTT, TTH, THT, HTT, THH, HTH, HHT, HHH})

E = event of getting at most two Tails = {TTH, THT, HTT, THH, HTH, HHT, HHH}

  • Hence, n(E) = 7

Mathematics Mock Test - 7 - Question 26

If log 2 = 0.3010 and log 3 = 0.4771, the value of log5 512 is:

Detailed Solution for Mathematics Mock Test - 7 - Question 26



Mathematics Mock Test - 7 - Question 27

If log10 2 = 0.3010, then log2 10 is equal to:

Detailed Solution for Mathematics Mock Test - 7 - Question 27

Mathematics Mock Test - 7 - Question 28

A train moves past a post and a platform 264 m long in 8 seconds and 20 seconds respectively. What is the speed of the train?

Detailed Solution for Mathematics Mock Test - 7 - Question 28

Mathematics Mock Test - 7 - Question 29

Detailed Solution for Mathematics Mock Test - 7 - Question 29

Mathematics Mock Test - 7 - Question 30

 I. a2 + 11a + 30 = 0,
II. b2 + 6b + 5 = 0 to solve both the equations to find the values of a and b?

Detailed Solution for Mathematics Mock Test - 7 - Question 30

Explanation:

I. (a + 6)(a + 5) = 0
=> a = -6, -5
II. (b + 5)(b + 1) = 0
=> b = -5, -1 => a ≤ b

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