Aspire's Library

A Place for Latest Exam wise Questions, Videos, Previous Year Papers,
Study Stuff for MCA Examinations

CUET PG MCA Previous Year Questions (PYQs)

CUET PG MCA Mathematics PYQ


CUET PG MCA PYQ
If $A=\begin{bmatrix}{\cos B} & {-\sin B} \\ {\sin B} & {\cos B}\end{bmatrix}$ then $A+{A}^T=I$ for B equal to 





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The number of 7-digit numbers whose sum of the digits equals to 10 and which is formed by using the digits 1, 2, and 3 only is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If from each of the three boxes containing 3 white and 1 black, 2 white and 2 black, 1 white and 3 black balls, one ball is drawn at random, then the probability that 2 white and 1 black balls will be drawn is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Let $f(x)=\, \vert{|x|}-1\vert$, then point(s) where $f(x)$ is not differentiable is (are):





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Letf $f:[2,\infty)\rightarrow R$ be the function defined by $f(x)=x^2-4x+5$, then the range of $f$





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The function $f(x)= \frac{[ln(1+ax)-ln(1-b x)]}{x}$ is not defined at $x=0$. What value may be assigned to $f$ at $x=0$, so that it is continuous?





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The are enclosed between the graphs of $y=x^3$ and the lines $x=0$, $y=1$, $y=8$ is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If the vertices of a triangle are O(0,0), A(a,0) and B(0,a). Then, the distance between its circumcenter and orthocenter is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The straight lines x+y-4=0, 3x+y-4=0 and x+3y-4=0 form a triangle which is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If one of the lines of $ax^2+2hxy+by^2=0$ bisects the angle between the axes in the first quadrant, the





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
What is the value of :
$[tan^2(90-\theta)-sin^2(90-\theta)] cosec^2(90-\theta) cot^2 (90-\theta)$





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If $A+B=45{^{\circ}}$, then $(1+tanA)(1+tanB)$ is equal to:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If $\vec{a}$ and $\vec{b}$ are two unit vectors such that $\vec{a}+2\vec{b}$ and $5\vec{a}-4\vec{b}$ are perpendicular to each other, then the angle between $\vec{a}$ and $\vec{b}$ is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Let $\vec{a}=\hat{i}-\hat{j}$ and $\vec{b}=\hat{i}+\hat{j}+\hat{k}$ and $\vec{c}$ be a vector such that $(\vec{a} \times \vec{c})+\vec{b}=0$ and $\vec{a}.\vec{c}=4$, then $|\vec{c}|^2$ is equal to 





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If $\vec{a}$, $\vec{b}$, $\vec{c}$ and $\vec{d}$ are the unit vectors such that $(\vec{a} \times \vec{b}).(\vec{c} \times \vec{d})=1$ and $(\vec{a}.\vec{c})=\frac{1}{2}$, then 





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Let A ={1,2,3} and consider the relation R= {(1,1), (2,2), (3,3), (1,2), (2,3), (1,3)} then R is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
A spring is being moved up and down. An object is attached to the end of the spring that undergoes a vertical displacement. The displacement is given by the equation $y = 3.50 sint + 1.20 sin2t$. Find the first two values of t (in seconds) for which y =0.





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
A ball is thrown off the edge of a building at an angle of 60° and with an initial velocity of 5 meters per second. The equation that represents the horizontal distance of the ball x is $x={{\nu}}_0(\cos \theta)t$, where ${{\nu}}_0$ is the initial velocity. $\theta$ is the angle at which it is thrown and $t$ is the time in seconds. About how far will the ball travel in 10 seconds?





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Let $n$ be a positive integer and $R=\{(a,b) \in Z\times Z\, |\, a-b\, =nm\, for\, \, some\, \, m\ne0\in Z\}$ 
Then R is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The a, b, c and d are in GP and are in ascending order such that a+d = 112 and b+c 48. If the GP is continued with a as the first term, then the sum of the first six terms is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Given below are two statements: 
Statement I : If $A\subset B$ then B can be expressed as $B=A\cup(\overline{A}\cap B)$ and P(A) > P(B).

Statement II : If A and B are independent events, then ($A$ and $\overline{B}$), ($\overline{A}$ and $B$) and ($\overline{A}$ and $\overline{B}$) are also independent 
In the light of the above statements, choose the most appropriate answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If $\vec{a}$, $\vec{b}$ and $\vec{c}$ are unit vectors, then $|\vec{a}-\vec{b}|^2+|\vec{b}-\vec{c}|^2+|\vec{c}-\vec{a}|^2 $ does not exceed





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
If $\vec{a}=\hat{i}+\hat{j}+\hat{k}$, $\vec{a}.\vec{b}=1$ and $\vec{a} \times \vec{b}=\hat{j}-\hat{k}$, then $\vec{b}$ is equal to 





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Consider the diagram given below and the following two statements:


Statement I: Events A and B can be expressed as:
$\begin{array}{ll}{A=(A\cap\overline{B})\cup Y} \\ {B=(A\cap B)\cup Z}\, \end{array}$

Statement II: Events A and B can be expressed as:
$A= X-Y$
$B=Y+Z$

In the light of the above statements, choose the most appropriate answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Given below are two statements: one is labelled as Assertion A and the other is labelled as Reason R.

Assertion A : In a class of 40 students. 22 drink Sprite, 10 drink Sprite but not Pepsi. Then the number of students who drink both Sprite and Pepsi is 15.

Reason R: For any two finite sets A and B, $n(A) = n(A - B) + n (A \cup B)$

In the light of the above statements, choose the most appropriate answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Match the list
LIST 1 LIST 2
A. If 4th term of a G.P. is square of its second term, and its first term is 3, then common ratio is _______ I. 5
B. The first term of an AP is 5 and the last term is 45 and the sum of the terms is 400. The number of terms is_____ II. -5/2
 C. The sum of three numbers which are in AP is 27 and sum of their squares is 293. Then the common difference is ______ III. 16
D. The fourth and 54th terms of an AP are, respectively, 64 and -61. The common difference is ______ IV. 3
choose the correct answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Given below are two statements: one is labelled as Assertion A and the other is labelled as Reason R 

Assertion A : The system of equations x + y + z = 4, 2x - y + 2z = 5, x - 2y - z = 3 has unique solution. 

Reason R: If A is 3 x 3 matrix and B is a 3 x 1 non-zero column matrix. then the equation AX = B has unique solution if A is non-singular. 

In the light of the above statements, choose the most appropriate answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Consider the diagram given below and the following two statements: 

Statement I: Regions X, Y and Z can be expressed as $A\cap\overline{B},\, A\cap B$ and $\, \overline{A}\cap B$ respectively 

Statement II: P(Y) = P (A) - P (X) = P (B) - P (Z) 

In the light of the above statements, choose the correct answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
In a class there are 400 students, the following table shows the number of students studying one or more of the subjects:
 SubjectNumber of Students 
 Mathematics 250
 Physics 150
 Chemistry 100
 Mathematics and Physics 100
Mathematics and Chemistry 60
Physics and Chemistry 40
Mathematics, Physics and chemistry 30
A. The number of students who study only Mathematics is 100. 
B. The number of students who study only Physics is 40. 
C. The number of students who study only Chemistry is 40. 
D. The number of students who do not study Mathematics, Physics and Chemistry is 70.
Choose the correct answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The arithmetic means of two observations is 125 and their geometric mean is 60. Find the harmonic mean of the two observations.





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The arithmetic mean and standard deviation of series of 20 items were calculated by a student as 20 cm and 5 cm respectively. But while calculating them an item 15 was misread as 30. Find the correct standard deviation.





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Given the marks of 25 students in the class as $\{m_1,m_2,m_3,..m_{25}\}$. Marks lie in the range of [1-100] and $\overline{m}$ is the mean. Which of the following quantity has the value zero?





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The terms $1,\, \log _y(x),\, \log _z(y)\, and\, 15\log _x(z)$ are in AP.

Based on this information answer the following questions. 
The Common difference of AP is 





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The terms $1,\, \log _y(x),\, \log _z(y)\, and\, 15\log _x(z)$ are in AP.

Based on this information answer the following questions. 
The value of xy is:  





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
The terms $1,\, \log _y(x),\, \log _z(y)\, and\, 15\log _x(z)$ are in AP.

Based on this information answer the following questions. 
yz is equal to : 





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Consider n events ${{E}}_1,{{E}}_2\ldots{{E}}_n$ with respective probabilities ${{p}}_1,{{p}}_2\ldots{{p}}_n$. If $P\Bigg{(}{{E}}_1,{{E}}_2\ldots{{E}}_n\Bigg{)}=\prod ^n_{i=1}{{p}}_i$, then





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Given a set of events ${{E}}_1,{{E}}_2\ldots{{E}}_n$ defined on the sample space S such that :
(i) $\forall\, i\, and\, j,\, i\ne j,\, {{E}}_i\cap{{E}}_j=\phi$
(ii) $\begin{matrix}\overset{{n}}{\bigcup } \\ ^{i=1}\end{matrix}{{E}}_i=S$
(iii) $P({{E}}_i){\gt}0,\, \forall$ 

Then the events are 





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
4 Indians, 3 Americans and 2 Britishers are to be arranged around a round table. Answer the following questions.

The number of ways arranging them is :





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
4 Indians, 3 Americans and 2 Britishers are to be arranged around a round table. Answer the following questions.

The number of ways arranging them so that the two Britishers should never come together is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
4 Indians, 3 Americans and 2 Britishers are to be arranged around a round table. Answer the following questions.

The number of ways of arranging them so that the three Americans should sit together is:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Given three identical boxes B1 B2 and B3 each containing two balls. B1 containstwo golden balls. B2 contains two silver balls and B3 contains one silver and onegolden ball. Conditional probabilities that the golden ball is drawn from B1, B2, B3are ____,______,______ respectively





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Math List I with List II:
 LIST I LIST 2
 A. In a GP, the third term is 24 and 6th term is 192. The common ratio is _____ I. 78
 B. Let Sn denotes the sum of first n terms of an AP. If S2n=3Sn, then S3n/Sn equals to _______ II. 6
 C. The sum of 3 terms of a GP is 13/12 and their product is -1. The first term is ______ III. -1
 D. The least value of n for which the sum 3+6+9+...+n is greater than 1000 is  IV. 2
Choose the correct answer from the options given below :





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Math List I with List II : $\omega \ne1$ is a cube root of unity.
 LIST I LIST II
A. The value of $\frac{1}{9}(1-\omega)(1-{\omega}^2)(1-{\omega}^4)(1-{\omega}^8)\, $ isI. 0 
B. $\omega{(1+\omega-{\omega}^2)}^7$ ________ is equal to II. 1 
C. The least positive integer n such that ${(1+{\omega}^2)}^n={(1+{\omega}^4)}^n$ isIII. -128
D. $(1+\omega+{\omega}^2)$ is equal to IV. 3
Choose the correct answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution


CUET PG MCA PYQ
Math List I with List II : $\omega \ne1$ is a cube root of unity.
 LIST I LIST II
A. $\log _4(\log _3(81))=$I. 0 
B. ${3}^{4\log _9(7)}={7}^k$, then k =II. 3 
C. ${2}^{\log _3(5)}-{5}^{\log _3(2)}=$ III. 1
D. $\log _2[\log _2(256)]=$IV. 2
Choose the correct answer from the options given below:





Go to Discussion

CUET PG MCA Previous Year PYQCUET PG MCA CUET 2022 PYQ

Solution



CUET PG MCA


Online Test Series,
Information About Examination,
Syllabus, Notification
and More.

Click Here to
View More

CUET PG MCA


Online Test Series,
Information About Examination,
Syllabus, Notification
and More.

Click Here to
View More

Ask Your Question or Put Your Review.

loading...