PPSC Lecturer Mathematics Test 4 Online Preparation MCQs

Given below on this Website Online Free Taleem is free online MCQ’s test related to PPSC of Lecturer Mathematics. All the individuals who are going to appear in PPSC Lecturer of Mathematics written test can attempt these tests in order to prepare for it in best possible way. Our tests include all the important questions MCQs of Lecturer of PPSC Mathematics, all Past Papers of Lecturer of Mathematics PPSC  that have extremely high amount of chances for been included in the actual exam which make our test undoubtedly the best source of preparation.


There will be 25 multiple choice question in the test.
Answer of the questions will change randomly each time you start this test.
Practice this test at least 5 times if you want to secure High Marks.
At the End of the Test you can see your Test score and Rating.
If you found any incorrect answer in Quiz. Simply click on the quiz title and comment below on that MCQ. So that I can update the incorrect answer on time.

Please Click Below START  Button to Take this Lecturer Mathematics Test Online.

Test Instructions:-
Test Name Lecturer Mathematics
Subject Math Test 4
Test Type MCQs Mathematics
Total Questions 25
Total Time 20 Minutes
Total Marks 100

You have 20 minutes to pass to the quiz.

PPSC Lecturer of Mathematics Practice Test 4

1 / 25

nZ is a maximal ideal of a ring Z if and only if n is:

2 / 25

The number of conjugacy classes of symmetric group of degree 3 is:

3 / 25

All subgroups of an abelian group are ................subgroups:

4 / 25

Let G be a cyclic group of order 24 generated by a then order of a10 is:

5 / 25

PPSC Past Paper of math

6 / 25

If H is a normal subgroup of G, then Na (H) = 

7 / 25

intersection of any collection of normal subgroups of a group G:

8 / 25

An indexed set of vectors (v1, v2.....,vr) in Rn is said to be .............if the vector equation x1v1 + x2v2............+xpvp = 0 has only the trivial solution:

9 / 25

Let X and Y be vectors spaces over the field F with dim X = m and dim Y = n then the dim Hom (X,Y):

10 / 25

An n x n matrix with n distinct eigenvalues is:

11 / 25

Every group of prime order is:

12 / 25

The set of all solutions to the homogeneous equation Ax = 0 when A is an m x n matrix is:

13 / 25

H is a subgroup of index ..............then H is a normal subgroup of G:

14 / 25

A group G having order ................where p is prime is always abelian:

15 / 25

If 7 cards are dealt from an ordinary deck of 52 playing cards, what is the probability that least 1 of the m will be a queen?

16 / 25

Any two conjugate subgroups of a group G are:

17 / 25

The group of Quaterninons is a non abelian group of order:

18 / 25

Z/2Z is a quotient group of order:

19 / 25

The square matrix A and its transpose have the ..............eigenvalues:

20 / 25

If a vector space V has basis of n vectors, then every basis of V must consist of exactly ...............vectors:

21 / 25

The dimension of the row space or column space of a matrix is called the .............. of the matirx:

22 / 25

Let T : U-----> V be a linear transformation from an n dimensional vector space U (F) to a vector space V(F) then:

23 / 25

A ring R is a Boolean Ring if, for all x & R:

A. X2= X

B. X2 = -X

C. X2 = 0

D. X2 = 1


24 / 25

The set Cn of all, nth roots of unity for a fixed positive integer n is a group under:

25 / 25

......................... is the set of all those elements of a group G which commutes with all other:

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