Number System Questions for SSC CHSL set-3 pdf
Download SSC CHSL Number System Questions with answers Set-3 PDF based on previous papers very useful for SSC CHSL Exams. Top-10 Very Important Questions for SSC Exam
Download Number System Questions for SSC CHSL set-3 pdf
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Question 1:Â Sum of four times a fraction and 6 times its reciprocal is 11. What is the fraction?
a)Â 3/4
b)Â 4/3
c)Â 4/7
d)Â 7/4
Question 2:Â What is the remainder when 6729 is divided by 35?
a)Â 11
b)Â 7
c)Â 9
d)Â 13
Question 3:Â A positive fraction is greater than its reciprocal by 72/77. What is the fraction?
a)Â 7/11
b)Â 11/7
c)Â 4/7
d)Â 7/4
Question 4:Â What least number must be added to 4131, so that the sum is completely divisible by 19?
a)Â 10
b)Â 11
c)Â 9
d)Â 12
Question 5:Â The sum of a number and 4 times its reciprocal is 5. What is the number?
a)Â 4
b)Â 5
c)Â 6
d)Â 7
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Question 6:Â The sum of a fraction and 7 times its reciprocal is 11/2. What is the fraction?
a)Â 7/2
b)Â 2/7
c)Â 3/4
d)Â 4/3
Question 7:Â What is the sum of all prime numbers between 60 and 80?
a)Â 272
b)Â 284
c)Â 351
d)Â 414
Question 8:Â After deducting 12% from a certain sum and then deducting 25% from the remainder, 2508 is left, then what is the initial sum?
a)Â 3500
b)Â 3450
c)Â 3970
d)Â 3800
Question 9:Â For what value of X, 211X will be a perfect square?
a)Â 4
b)Â 5
c)Â 6
d)Â 9
Question 10:Â How many numbers are there from 300 to 700 which are divisible by 2, 3 and 7?
a)Â 7
b)Â 8
c)Â 9
d)Â 10
Answers & Solutions:
1) Answer (A)
Let that fraction be $\frac{1}{x}$
$4 \times \frac{1}{x} + 6x = 11$
$\Rightarrow (4+6x^{2}) = 11 \times x$
$\Rightarrow 6x^{2}-11x+4 = 0$
$\Rightarrow(x-\frac{8}{6})(x-\frac{3}{6})=0$
$\Rightarrow x = 4/3 or 1/2$
$\Rightarrow \text{fraction} = \frac{1}{x} = 3/4 \text(or) 2$
so the answer is option A.
2) Answer (C)
35*192 = 6720 is the least nearest multiple of 35.
The remainder when 6729 is divided by 35 = 6729 – 6720 = 9
so the answer is option C.
3) Answer (B)
Let the fraction be $x$
According to ques,
=> $x-\frac{1}{x}=\frac{72}{77}$
=> $\frac{x^2-1}{x}=\frac{72}{77}$
=> $77x^2-77=72x$
=> $77x^2-72x-77=0$
=> $77x^2-121x+49x-77=0$
=> $11x(7x-11)+7(7x-11)=0$
=> $(7x-11)(11x+7)=0$
=> $x=\frac{11}{7},\frac{-7}{11}$
$\because x$ is positive, => $x=\frac{11}{7}$
=> Ans – (B)
4) Answer (B)
Factorizing 4131 = 19 $\times$ 217 + 8
Thus, on dividing 4131 by 19, the remainder is 8
$\therefore$ The number that must be added to 4131 so that the sum obtained is completely divisible by 19
= 19 – 8 = 11
=> Ans – (B)
5) Answer (A)
Let the fraction be $x$
According to ques,
=> $x+\frac{4}{x}=5$
=> $\frac{x^2+4}{x}=5$
=> $x^2+4=5x$
=> $x^2-5x+4=0$
=> $x^2-x-4x+4=0$
=> $x(x-1)-4(x-1)=0$
=> $(x-1)(x-4)=0$
=> $x=1,4$
=> Ans – (A)
6) Answer (A)
Let the fraction be $x$
According to ques,
=> $x+\frac{7}{x}=\frac{11}{2}$
=> $\frac{x^2+7}{x}=\frac{11}{2}$
=> $2x^2+14=11x$
=> $2x^2-11x+14=0$
=> $2x^2-4x-7x+14=0$
=> $2x(x-2)-7(x-2)=0$
=> $(x-2)(2x-7)=0$
=> $x=2,\frac{7}{2}$
=> Ans – (A)
7) Answer (C)
Sum of all prime numbers between 60 and 80
= 61 + 67 + 71 + 73 + 79
= 351
=> Ans – (C)
8) Answer (D)
Let initial sum = $100x$
After deducting 12%, sum left = $\frac{(100-12)}{100}\times100x=88x$
Similarly, after deducting 25%, sum left = $\frac{75}{100}\times88x=66x$
According to ques,
=> $66x=2508$
=> $x=\frac{2508}{66}=38$
$\therefore$ Initial sum = $100\times38=3800$
=> Ans – (D)
9) Answer (C)
We know that $(45)^2=2025$
So, the next number = $(46)^2=2116$
Thus, X is replaced by 6
=> Ans – (C)
10) Answer (C)
L.C.M.(2,3,7) = 42
=> Numbers from 300 to 700 which are divisible by 42 are = 336,378,420,…,672
This is an AP with first term = $a=336$ and common difference = $d=42$
Let number of terms = $n$
=> Last term = $a+(n-1)d=672$
=> $336+(n-1)42=672$
=> $(n-1)42=672-336=336$
=> $n-1=\frac{336}{42}=8$
=> $n=8+1=9$
=> Ans – (C)
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