ppsc past papers of lecturer Mathematics pdf

Non-zero elements of a finite filed form ...............group:

The differential equation ydx - 2xdy = 0 represents:

Set of integers Z is:

A subspace A of a topological space X is open if and only if A is:

Let G be a group. Then the factor GIG is:

Number of non-isomorphic groups of order 8 is:

Let f be defined on R by setting  f (x) = x, if x is rational and f (x) = 1 - x if x is irrational. Then:

A tensor of rank 5 in a space of 4 dimensions has components:

Let R be the usual metric space and Z be the set of integers. Then clouser of Z is:

Let A =[0,1] be a subset of R with Euclidean metric. Then interior of A is:

A one to one linear transformation preserves:

The metric coefficients in cylindrical coordinates are: 

A subset A of a topological space X is open if and only if A is:

Finite simple abelian groups are of order:

Let M_2,3 be a vector space of all 2 x 3 matrices over R. Then dimension of Hom (M_2,3,R⁴):

Center of the group of quaternlons Q₆ is of order:

Every group of order ≤ 5 is:

Let W be a subspace of the space R³. If dim W=0 then W is a:

Let G= <a, b: b² = 1 = a₃, ab, = ab^-1>. Then the number of distinct left cosets of H = <b> in G is:

The set Z of all integers is not a vector space over the field R of real numbers under ordinary addition "+" multiplication "X" of real numbers, because:

Non-zero elements of a field form a group under:

Number of non isomorphic groups of order 8 is:

Let G be an abelian group. Then which one of the following is not true:

Let G be a group. then the derived group G is subgroup of G:

A linear transformation T:U -----> V is one-to-one if and only if kernel of T is equal to: