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IIT JAM Mathematics Mock Test- 4 - Mathematics MCQ


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30 Questions MCQ Test IIT JAM Mathematics Mock Test Series - IIT JAM Mathematics Mock Test- 4

IIT JAM Mathematics Mock Test- 4 for Mathematics 2024 is part of IIT JAM Mathematics Mock Test Series preparation. The IIT JAM Mathematics Mock Test- 4 questions and answers have been prepared according to the Mathematics exam syllabus.The IIT JAM Mathematics Mock Test- 4 MCQs are made for Mathematics 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for IIT JAM Mathematics Mock Test- 4 below.
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IIT JAM Mathematics Mock Test- 4 - Question 1

The orthogonal trajectories of the family of curves y = c1x3, where c1 is arbitary costant, is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 1

y = c1x3

For orthogonal tarcjectory dy/dx replace by -dx/dy

We solve

IIT JAM Mathematics Mock Test- 4 - Question 2

Suppose f ; ℝ→ℝ is an odd and differentiable fraction. Then for every x0 ∈ ℝ. f'(-x0) is equal to;

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 2

f : ℝ→ℝ is an odd function, so

f(-x) = -f(x) ∀ x ∈ ℝ

differeniating both side, we have

-f'(x) = -f'(x) i.e. f'(-x) = f'(x)

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IIT JAM Mathematics Mock Test- 4 - Question 3

Let  denote the eigenvalues of the matrix 

If ,  then the set of possible values of t, -π ≤ t < π, is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 3

Consider 

IIT JAM Mathematics Mock Test- 4 - Question 4

where D is the elliptical disc  is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 4

IIT JAM Mathematics Mock Test- 4 - Question 5

f T = |  eigen values of B are in Z}, then which of the following statement(s) is true?

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 5

Let 

Therefore , option(a) is incorrect.

For option (b) , let 

But 

Therefore option (b) is correct

For optin (c0 and (d)

Also in T.

Therefore option (c) and (d) are incorrect.

IIT JAM Mathematics Mock Test- 4 - Question 6

The general solution of  is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 6

Given 

⇒ (D3 + 3D2 + 3D + 1)y = 0

A.E. is m3 + 3m2 + 3m + 1 = 0

⇒ (m + 1 )3 = 0

⇒ m = -1

therefore general solution 

y(x) = (c1 + c2x + c3x2)e-x

IIT JAM Mathematics Mock Test- 4 - Question 7

Number of elements of order p in Zp2q where p and q are distinct prime is;

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 7

Number of elements of order d in Zn where ���� is (d).

Therefore, number of elements of order p in Zp2q = (p) = p-1

IIT JAM Mathematics Mock Test- 4 - Question 8

An object moves in the force field  How much work is performed on the object moves from (2, 0) counter clockwise along the elliptical path x2 +4y2 = 4 to (0. 1), then back to (2,0) along the line segment joining the two points.

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 8

Given, 

 is independent of path

Therefore

Workdone= 0 (as curve is closed)

IIT JAM Mathematics Mock Test- 4 - Question 9

The area bounded by x2 + y2 = 25, 4y = |4 - ��2| and x = 0 in the first quadrant is 

Then k is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 9

IIT JAM Mathematics Mock Test- 4 - Question 10

 where  and 'c' be the quarter circular path x2 + y2 = a2 from (a, 0) to (0, a)

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 10

put x = a cos θ, y = a sin θ

sx = -a sin θdθ, dy = a cos θdθ

IIT JAM Mathematics Mock Test- 4 - Question 11

Let σ be the 12- cycles (1 2 3 4 5 6 7 8 9 10 11 12) for which positive integer i is σi also a 12 cycle?

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 11

If σ is the n cycle then σi is also n cycle iff(i, n) = 1

Now (12, 11) = 1

⇒ σ11 is 12 cycle.

IIT JAM Mathematics Mock Test- 4 - Question 12

Let 

Then

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 12

IIT JAM Mathematics Mock Test- 4 - Question 13

If R→R is given by f(x) = x3 + x2f'(1) + xf''(2) + f'''(3) for all x in R. then f(2) - f(1) is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 13

f(x) = x3 + x2f'(1) + xf''(2) + f'''(3)

f(0) = f'''(3)

f(2) = 8 + 4f'(1) + 2f''(2) + f'''(3)

f(1) = 1 + f'(1) + f''(2) + f'''(3)

Then f(2) - f(1) = 7 + 3f'(1) + f''(2)

Now, f'(x) = 3x2 + 2x f;(1) + f''(2)

f''(x) = 6x + 2f'(1)

f'''(x) = 6   

f'''(3) = 6                  ...(1)

f''(2) = 12 + 2f'(1)        .....(2)

f'(1) = 3 + 2f'(1) + f''(2)

⇒ -f'(1) = 3 + 12 + 2f'(1)

⇒ -15 = 3f'(1)

 f'(1) = -5  and f''(2) = 2

So, f(2) -f(1) = 7 + 3*(-5) + 2 

= 7 - 15 + 2

= -6 = -f(0)

IIT JAM Mathematics Mock Test- 4 - Question 14

Let . If f(x) is continuous in the interval [-1, 1], then p equals

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 14

If f(x) is continuous at x = 0. then

IIT JAM Mathematics Mock Test- 4 - Question 15

Which of the following statement is true?

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 15

(a) Let f(x) = x, x∈[0, ∞], then clearly f(x) is uniformly continuous but not bounded.

(b) Note that  here f is continuous over [0, 1], so f(x) is uniformly continuous.

(c) Note that f(x) = 

Clearly f(x) is not continuous at x = 0, so f(x) is not uniformly continuous.

IIT JAM Mathematics Mock Test- 4 - Question 16

Consider the following statements:

Then

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 16

(I) 

Here f (x.y)  = 

hence (1. 1) is not in the Domain of function, hence along the curvey = x limit do not exist. So limit (I) do not exist.

(II)  

IIT JAM Mathematics Mock Test- 4 - Question 17

Which of the following series converges?

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 17

Hence, series  converges and sum is 5e.

IIT JAM Mathematics Mock Test- 4 - Question 18

If  is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 18

Given

replace x → -x

from(i) and (ii)

therefore,

from (iii) and (iv)

I = 0

IIT JAM Mathematics Mock Test- 4 - Question 19

Let  then the closure of S is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 19

Closure of  Which is uncountable

Becausw x√2 is an irrational number for 

IIT JAM Mathematics Mock Test- 4 - Question 20

If x3y2 is an integrating factor of (6y2 + axy)dx + (6xy + bx2)dy =0, a, b ∈ ℝ then

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

Given (6y2 + axy)dx + (6xy + bx2)dy = 0

I. F. = x3y2

multiplying by I.F. in (1). We get

(6y4x3 + ax4y3)dx + (6x4y3 + bx5y2)dy = 0 be exact. Then 

⇒ 24x3y3 + 3ax4y2 = 24a3y3 + 5bx4y2

⇒ 3a = 5b

⇒ 3a - 5b = 0

IIT JAM Mathematics Mock Test- 4 - Question 21

Let G =  = 1,s2 = 1, rs = sr2} then

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 21

Given rs = sr2

Now r = rs2 = (rs)s = (sr2)s = (sr)(rs)

           = (sr)(sr2) = s(rs)r2 = s(sr2)r2 = s2y4 = r4

⇒ r= r4 i.e. r3 = 1

⇒ G is group of order atmost 6.

IIT JAM Mathematics Mock Test- 4 - Question 22

The radius of convergence of the series , where a0 = 1. an = 3-n an-1 for n ∈ ℕ, is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 22

Given an = 3-n an-1

Let 

 convergent if |z| < √3 and divergent if |z| > √3

So, radius of convergence is √3.

IIT JAM Mathematics Mock Test- 4 - Question 23

Let  be a smooth vector function of a real variable. Consder two statements 

S1 div curl  = 0

S2; grad div  = 0

Then

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 23

S1; div curl  ⇒ S1 is true

S2 ; grad div 

So S1 is true but S2 is false.

IIT JAM Mathematics Mock Test- 4 - Question 24

Let G be the group with the generators a and b given byG = {(a,b)|σ(a) = 4,σ(b) = 2, ba = a-1b}. Let Z(G) denotes the centre of G. Then G/Z(G) is isomorphic to.

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 24

Clearly G ≈ D4

Also |z(Dn)| = 2 if n is even and |z(Dn)| = 1 if n is odd

Also G is non abelian

⇒ G/Z(G) can not be cyclic =G/Z(G) ≈ 

IIT JAM Mathematics Mock Test- 4 - Question 25

Let . n>2. Then lim(xn) is;

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 25

We can write general team for r ≥ 2

IIT JAM Mathematics Mock Test- 4 - Question 26

Suppose that L(y) = y'' + a1y' + a2y = b(x), where a1, a2 are constants and b(x) is a continuous function on  Then consider the statements

I. If b(x) is bounded on [0, ∞), then every solution of L(y) = b(x) is bounded on [0, ∞).

II. If b(x) → 0 as x → ∞, then every solution of L(y) = b(x) tends too as x → ∞.

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 26

y" -2y' + y = e-x

Where a1 = -2, a2 = 1 are constants and b (x) = e-x is a continuous function an [0,∞)

Now, y(x) = ex + xex +1/4e-x is one of the solutions of given ODE

Since b(x) =e-x is bounded on [0,∞)

but y(x) is unbounded on [0,∞) because 

Both statement are false

IIT JAM Mathematics Mock Test- 4 - Question 27

Let y(x) be a non-trivial solution of the second order linear differential equation

where c < 0. k > 0 and C> k , then

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 27

Given, 

⇒ (D2 + 2cD + k)y = 0

A.E. is m2 + 2cm + k =0

as c < 0, k > 0 and c2 - k >0

⇒ m is real

General solution 

IIT JAM Mathematics Mock Test- 4 - Question 28

Consider the sequence  where . Then  is

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 28

Thus lim sup (xn) = 2

lim inf (xn) = 0

lim sup (xn) + lim inf (xn)'

= 2 + 0 = 2

IIT JAM Mathematics Mock Test- 4 - Question 29

Let P1,  P2 and P3 denote. respectively, the planes defined by

a1x+b1y+c1z= = α1

a2x + b2y+c2z= α2

a3x-b3y + c3z = α3

It is given that P1, P2, P3 intersect exactly at one point when α1 = α2 = α3 = 1, If now

α1 = 2, α2 = 3 and α3 = 4 then the planes

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 29

The matrix form.Ax =  B is

If α1 = α2 = α3 = 1, then this system have a unique solution.

Hence rank (A) = rank (A  | B) = 3 (Number of variables)

If we change α 1= 2, α2 = 3, α3 = 4, still rank (A) = rank (A|B)= 3

Hence plane intersect at a unique point.

IIT JAM Mathematics Mock Test- 4 - Question 30

Which of the following is correct?

Detailed Solution for IIT JAM Mathematics Mock Test- 4 - Question 30

If n > 3, then σ = (1, 2)(3, 4) ∈ An also 0(σ) = 2

⇒ An ∀n > 3 has a self inverse element.

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