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IIT JAM Mathematics Practice Test- 20 - Mathematics MCQ


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30 Questions MCQ Test IIT JAM Mathematics Mock Test Series - IIT JAM Mathematics Practice Test- 20

IIT JAM Mathematics Practice Test- 20 for Mathematics 2024 is part of IIT JAM Mathematics Mock Test Series preparation. The IIT JAM Mathematics Practice Test- 20 questions and answers have been prepared according to the Mathematics exam syllabus.The IIT JAM Mathematics Practice Test- 20 MCQs are made for Mathematics 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for IIT JAM Mathematics Practice Test- 20 below.
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IIT JAM Mathematics Practice Test- 20 - Question 1

If f(x) = (x2 - 1) |x2 - 3x + 2| + cos|x| then the set of point of non-differentiability is,

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 1





Clearly the rule of the function is changing of x = 1 and 2.
So we shall test the differentiability of f(x) only at the points x = 1 and x = 2.
clearly Rf '(1) - Lf'(1)
and Rf*(2) ≠ Lf'(2)
hence f(x) is not differentiable at x = 2.

IIT JAM Mathematics Practice Test- 20 - Question 2

If we expand sin x by Taylor’s series about π/2, then a2,a7,a4,a3 are,

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 2

Given function F(x) = sin x


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IIT JAM Mathematics Practice Test- 20 - Question 3

If f(x + y) = f(x) + f(y) , and f(x) is differentiable at one point of R, then f(x) is.

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 3

Given f is differentiable at one point of R So let f is differentiable at (x = a) ∈ R
Then Lf'(a) = Rf'(a)




Thus by (1).
Lf'(b) = Rf ’(b)
Since b be any arbitrary point of R at which f is differentiable
⇒ f is differentiable on R.


Thus the values of a2,a7,a4,a3 in equation (1) are

IIT JAM Mathematics Practice Test- 20 - Question 4

 then the value of 

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 4






 

IIT JAM Mathematics Practice Test- 20 - Question 5

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 5




Hence by comparison test given series converge absolutely
⇒ option (d) is correct.

IIT JAM Mathematics Practice Test- 20 - Question 6

Let A and B be non-empty subsets of real line R, which of the following statement would be equivalent to sup A < in fB ?

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 6


as least upper bound < greatest lower bound.

IIT JAM Mathematics Practice Test- 20 - Question 7

Let V be a vector space and T transformation from V to V. then the intersection of the range of T and the null space of T is the zero subspace from of V if and only if.

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 7

Let R(T) = Range of T
N(T) = null space of T
Let R(T)∩,N(T) = {0}
⇒ R(T) and N(T) both are disjoint subspaces of V.
Now if T(T(x)) = 0, where T(x) ∈ R(T)
⇒ T(x)∈N(T)
⇒ T(x) = 0

IIT JAM Mathematics Practice Test- 20 - Question 8

Let F : R3 → R2 be a linear mapping defined by f(x,y,z) = (3x + 2y - 4z, x - 5y + 3z). then the matrix of F relative to the basis {(1,1,1),(1,1,0),(1,0,0)} and {(1,3),(2,5)} is,

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 8

IIT JAM Mathematics Practice Test- 20 - Question 9

Consider the matrix  then the eigenvalues of matrix B = A2 + 2A + I are,

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 9

Here the eigenvalues of A are : 3 + i , 1 - i, 3i
⇒ The eigenvalues of A2 are (3 + i)2,(1 - i)2,(3i)2
⇒ 8 + 6i, - 2i, - 9
Now the eigenvalues of 2A are: 6 + 2i, 2 - 2i, 6i
Thus eigenvalues of A2 + 2A + 1 are
15 + 8i, 3 - 4i, - 8 + 6i

IIT JAM Mathematics Practice Test- 20 - Question 10

Let X be a proper closed subset of [0,1]. Which of the following statements is always true ?

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 10

 proper closed subset of [0,1] but X not countable

 be a proper closed subset of [0,1] but it cannot contain an open interval.
⇒ None of given options are true.
⇒ (d) is correct.

IIT JAM Mathematics Practice Test- 20 - Question 11

The linear operation L(x) is defined by the cross product L(x) = bX, where b = [0 1 0]T and x = [x1 x2 x3]T are three dimensional vectors. The 3 x 3 matrix M of this operation satisfies  then the eigenvalues of M are

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 11

The cross product  b = [0 1 0]T and x = [x1 x2 x3]T is


By matching LHS and RHS, we get


Characteristic equation be,

So the eigen values are 0, i, - i

IIT JAM Mathematics Practice Test- 20 - Question 12

Differentiation of function f(x, y, z) = Sin(x)Sin(y)Sin(z) - Cos(x) Cos(y) Cos(z) w.r.t ‘y’ is? 

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 12

f(x, y, z) = Sin(x)Sin(y)Sin(z) - Cos(x) Cos(y) Cos(z) 
Since the function has 3 independent variables hence during differentiation we have to consider x and z as constant and differentiate it w.r.t. Y,
f’(x, y, z) = Sin(x)Cos(y)Sin(z) + Cos(x)Sin(y)Cos(z).

IIT JAM Mathematics Practice Test- 20 - Question 13

The value of ‘a’ for which 

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 13


IIT JAM Mathematics Practice Test- 20 - Question 14

Find the total number of homomorphism from 

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 14

 be a homomorphism then in general, there are d
homomorphism from  where d = g.c.d(m,n).
Here m = 21 and n = 41 then g.c.d (21,41) = 1
So, there is only hom om orphism exists from 

IIT JAM Mathematics Practice Test- 20 - Question 15

How many numbers satisfied the equation x ≌ 7 (mod 17), where x in the range 1 < x < 100.

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 15

IIT JAM Mathematics Practice Test- 20 - Question 16

The value of  for closed curve C is equal to

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 16

By stoke's theorem, we know that 



 

IIT JAM Mathematics Practice Test- 20 - Question 17

Which of the following is a 2 -dimensional subspace of R3 over R ?

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 17

Here (a) be a subspace but basis of it is {(0. 1, 0)} so it be a subspace of dimension 1.
(b), (c) are not subspace, so they don't have dim.
Now (d) be a subspace and its basis is {(0, 0. 1) (0, 1. 0)} so it be a subspace with dimension 2.

IIT JAM Mathematics Practice Test- 20 - Question 18

Let P(x) be a vector space of all real polynomials with degree < n and w be a subset of V, given as  Then dim ension of w is

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 18



and W has real polynomials functions so this kind of function cannot be in W.
⇒ P(x) = 0 is the only element in W.
⇒ W = {0}
⇒ dim W = 0

IIT JAM Mathematics Practice Test- 20 - Question 19

The value of the line integral  where C is the closed curve of the region bounded by y = x and x2 = 4ay is

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 19





IIT JAM Mathematics Practice Test- 20 - Question 20

If sn denotes the permutation group and (12) ∈ s5 then determine all elements in s5. which commute with (12).

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 20


So the number of such is clearly (n-2)l
[as σ (1) = 1 ,  will take remaining (n-2) letters among themselves and so σ will be a permutation on (n-2) letters]
O[N(12)] = 2(n-2)!
Here n = 5 .then [N(12)] = 2(5-2)!
= 2(3)!
=12

IIT JAM Mathematics Practice Test- 20 - Question 21

The line integral  of a vector field  where r2 = x2 + y2 is taken around a square (as shown in the figure) of side unit length and centered at  If the value of the integral is L, then

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 21



and the field is defined every where within and on the square of side unit length and centered at (x0,y0) with 
∴ By stoke's theorem
which is independent of (X0, y0)

IIT JAM Mathematics Practice Test- 20 - Question 22

 and S is that part of the surface of the sphere x2 + y2 + z2 = 1, which lies in the first octant then the value of 

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 22

A vector normal to the surface S is given by

Now we have

Where R is the projection of S on xy-plane.
The region R is bdd by x-axis, y-axis and x2 + y2 = 1, z = 0
So 

⇒ 
= 3/8

IIT JAM Mathematics Practice Test- 20 - Question 23

The value of line integral  where path is given in the figure and f(x,y,z) = 3x2 - 2y + z, 

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 23


IIT JAM Mathematics Practice Test- 20 - Question 24

The value of line integral , where C is the line segment joining the origin to the point (2, 2, 2) and f(x, y, z) = 3x2 = 2y + z is

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 24

We choose the simplest parametrization we can think of  where 0 < t < 2. The component have continuous 1st order derivative and  
The line integral of f over C is,



= 6√3

IIT JAM Mathematics Practice Test- 20 - Question 25

Rolle’s theorem holds for the function x3 + bx2 + cx , 1 < x < 2 at the point 4/3, then the value of b and c are

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 25

By rolle's theorem for
f(x) = x3 + bx2 + cx in [1, 2], there exists 1 < α < 2 such that
f ‘(α) = 0 



⇒  8b + 3c = -16   .....(1)
also , f(1) = f(2) ⇒ 1 + b+ c = 8 + 4b + 2c
⇒ 3b + c = -7   ..... (2)
From (1) and (2)
b = -5 . c = 8

IIT JAM Mathematics Practice Test- 20 - Question 26

The value of the limit 

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 26




IIT JAM Mathematics Practice Test- 20 - Question 27

Let G be a group of order 143, then the centre of G is isomorphic to

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 27

O(G) = 143
i.e. O(G) =11 x 13 (p < q)
Here.O(G) = pq , p < q and p X q -1, so G be a cyclic group of order 143 and every cyclic group is an abelian group.
Hence G is an abelian group, if G be an abelian group then centre of G is equal to group G.
G = Z(G) [∵ G is an abelian]
i.e. O[Z(G)] = 143 so Z(G) is isomorphic to Z143.

IIT JAM Mathematics Practice Test- 20 - Question 28

The double integral  under the transformation u = x + y , v = y - 2x is transformed into

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 28


Then

limit are 



then by under transformation we get

IIT JAM Mathematics Practice Test- 20 - Question 29

Let S be the bounded surface of the cylinder x2 + y2 = 1 cut by the planes z = 0 and z = 2 + y, then the value of the surface integral  is equal to

Detailed Solution for IIT JAM Mathematics Practice Test- 20 - Question 29




Now Surface integral becomes





and according to option correct answer is 

IIT JAM Mathematics Practice Test- 20 - Question 30

If the value of the determinant  is positive then,

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