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JEE Main Practice Test- 4 - JEE MCQ


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30 Questions MCQ Test Mock Tests for JEE Main and Advanced 2025 - JEE Main Practice Test- 4

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JEE Main Practice Test- 4 - Question 1

A planet of core density 3ρ and outer curst of density ρ has small tunnel in core. A small Particle of mass m is released from end A then time required to reach end B :

Detailed Solution for JEE Main Practice Test- 4 - Question 1

At some distance from centre inside core

Now time for A to B = 

JEE Main Practice Test- 4 - Question 2

A small circular wire loop of radius a is located at the centre of a much larger circular wire loop of radius b as shown above (b> >a). Both loops are coaxial and coplanar. The larger loop carries a time (t) varying current I = I0 cos ωt where I0 and ω are constants. The large loop induces in the small loop an emf that is approximately equal to which of the following.

Detailed Solution for JEE Main Practice Test- 4 - Question 2


Magnetic flux passing through inner loop due to current in outer loop-

So, emf developed, 

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JEE Main Practice Test- 4 - Question 3

A spring mass system is placed on a frictionless horizontal surface as shown in the figure. The spring is expanded by 1/10m and the blocks are given velocities as shown, then maximum extension of spring is :

Detailed Solution for JEE Main Practice Test- 4 - Question 3

As there is no loss of energy
Initial mechanical energy = Final mechanical energy
For initial Mechanical energy

Where  and vrelative =5 m/s

= 25 + 25 = 50
For final Mechanical energy
When there is maximum extension relative velocity between block = 0

JEE Main Practice Test- 4 - Question 4

An electromagnetic wave of frequency f = 7.3MHz passes from a vacuum into a dielectric medium with permittivityε = 9. Then,

Detailed Solution for JEE Main Practice Test- 4 - Question 4

As permittivity is greater than the permittivity of free space so the refractive index of medium is

Wavelength of the electromagnetic wave in medium will be 
Velocity of wave will be. 

JEE Main Practice Test- 4 - Question 5

A particle is projected from point A towards a building of height h as shown at an angle of 60 ° with horizontal. It strikes the roof of building at B at an angle of 30 ° with the horizontal. The speed of projection is

Detailed Solution for JEE Main Practice Test- 4 - Question 5

Let u be the speed of projection and v be the speed at B

Applying law of conservation of energy,

Using equation (i) in equation (ii),
we have 

JEE Main Practice Test- 4 - Question 6

Three identical bulbs each of resistance 2Ω are connected as shown. The maximum power that can be consumed by individual bulb is 32W, then the maximum power consumed by the combination is :

Detailed Solution for JEE Main Practice Test- 4 - Question 6


Resistance of B1, B2 and B3 are same which is = 2Ω
As P ∝i2 (when ‘R’ constant)
So, maximum power consumed by bulb B3
Which is = 32 W
⇒i2R = 32
⇒i2 . (2) = 32
⇒i = 4 Ampere
So, current passing through B1 + B2 = i/2 = 2
Total power consumed in circuit
P = (i/2)2 (2) + (i/2)2 (2) + i2(2)
= (2)2 (2) + (2)2 (2) + (4)2 (2)
= 48W

JEE Main Practice Test- 4 - Question 7

A carrier wave has power of 1675 kW. If the side band power of a modulated wave subjected to 60%. Then find the amplitude modulation level

Detailed Solution for JEE Main Practice Test- 4 - Question 7

As you know that, sideband power is,  Where Pis power of carrier wave, Ps sideband power and ‘m’ is modulation rate,

JEE Main Practice Test- 4 - Question 8

Two identical conducting spheres each having radius r are placed at large distance. lnitially charge on one sphere is q, while charge on another sphere is zero when they are connected by conducting wire as shown in figure then find total heat produced when switch S is closed :

Detailed Solution for JEE Main Practice Test- 4 - Question 8

When sphere connected by wire, charge will flow from one sphere to another until potential of both sphere become same.
Or,
As both sphere is identical in dimension and material, charge will divide equally

Now, Initial potential energy of system
(Self energy of spherical conductor )
Final potential energy of system

Heat generation in conduction = Ui - uf

JEE Main Practice Test- 4 - Question 9

Four wire A, B, C and D each of length l = 10 cm and each of area of cross section is 0.1 m2 are connected in the given circuit. Then, the position of null point is

Given that resistivity

Detailed Solution for JEE Main Practice Test- 4 - Question 9



When S1 and S2 both open and jockey has no deflection then let current in upper circuit is ” i”.

So, RA = 1Ω
RB = 3Ω
RC = 6Ω
RD = 1Ω

When jockey is touched, and there is no deflection then potential difference between ‘A’ and the point should be same in both path-

So, in lower circuit as S2 is open
No current will flow in this circuit
⇒Potential difference between A and P
Will be = 2V

⇒i1 . 3= i2 . 6 and i1 + i2 = 1

Potential difference between A and P

For this point ‘P’ should be half way in wire C.
Similarly when jockey touched on wire ‘B’, Null point will be obtained at middle point of wire B.

JEE Main Practice Test- 4 - Question 10

The radius of curvature of spherical surface is 10 cm. The spherical surface separates two media of refractive indices μ2 = 1.3 and μ3 = 1.5 as shown in Figure. The medium of refractive index 1.3 extends upto 78 cm from the spherical surface. A luminous point object O is at the distance of 144 cm from the spherical surface in the medium of refractive index μ1 = 1.1. The image formed by the spherical surface is at

Detailed Solution for JEE Main Practice Test- 4 - Question 10

Distance of object from the spherical surface

For the refraction at the spherical Surface

JEE Main Practice Test- 4 - Question 11

A transformer has an efficiency of 80%. It is connected to a power input of 4 kW and 100 V. if the secondary voltage is 240 V, then the secondary current is

Detailed Solution for JEE Main Practice Test- 4 - Question 11

JEE Main Practice Test- 4 - Question 12

There are two balls in an urn whose colours are not known (each ball can be either white or black). A white ball is put into the urn. A ball is drawn from the urn. The probability that it is white is

Detailed Solution for JEE Main Practice Test- 4 - Question 12

Let E(0 < i < 2) denote the event that urn contains 'i' white and '(2 – i)' black balls.
Let A denote the event that a white ball is drawn from the urn.
We have P(Ei) = 1/3 for i = 0, 1, 2 
P (A|E1) = 1/3, P(A|E2) = 2/3, P(A|E3) = 1.
By the total probability rule,
P(A)= P(E1)P(A|E1) + P(E2)P(A|E2) + P(E3)P(A|E3)

JEE Main Practice Test- 4 - Question 13

The plane passing through the point (−2, −2, 2) and containing the line joining the points
(1, 1, 1) and (1, −1, 2) makes intercepts on the coordinates axes then sum of the lengths of intercepts is

Detailed Solution for JEE Main Practice Test- 4 - Question 13

 

 

JEE Main Practice Test- 4 - Question 14

If a, b, c are in GP and  are in AP, then a, b, c are the lengths of the sides of a triangle which is

Detailed Solution for JEE Main Practice Test- 4 - Question 14

a, b, c are in GP b2 = ac
 are in AP.
2(log 2b – log 3c) = log a – log 2b + log 3c – log a
log 2b = log 3c 2b = 3c
∴ b2 = ac & 2b = 3c
 b = 2a/3 and c = 4a/9
Since (a+b) = 5a/3 > c, (b+c) = 10a/9 > a and
(c + a) = 13a/9 > b, therefore, a, b, c are the sides
of a triangle. Also, as ‘a’ is the greatest side, let us
find angle A of ΔABC

Hence ΔABC is an obtuse angled triangle.

JEE Main Practice Test- 4 - Question 15

Sum of the series
1 + 3 + 6 + 10 + 15 + ……………………….n terms is

Detailed Solution for JEE Main Practice Test- 4 - Question 15

JEE Main Practice Test- 4 - Question 16

The solution of the equation (2x + y + 1) dx + (4x + 2y – 1) dy = 0 is

Detailed Solution for JEE Main Practice Test- 4 - Question 16

Put 2x + y = X ⇒Therefore, the given equation is reduced to

 = x + constant
2(2x + y) + log (2x + y – 1) = 3x + constant
x + 2y + log (2x + y – 1) = C

JEE Main Practice Test- 4 - Question 17

The area bounded by curves y = f(x), the x-axis and the ordinates x = 1 and x = b is (b - 1) sin (3b + 4). Then f(x) is-

Detailed Solution for JEE Main Practice Test- 4 - Question 17

1. Area bounded by curve y = f(x), x =1 and x = b is

Now differentiating both sides with respect to b we get
fB. = sin (3b + 4) + 3(b – 1) cos (3b + 4)

JEE Main Practice Test- 4 - Question 18

If sin 5x + sin 3 x + sin x = 0, then the value of x other than zero, lying between 0 < x < π/2 is

Detailed Solution for JEE Main Practice Test- 4 - Question 18

1. sin 5x + sin x + sin 3x = 0
2 sin 3x . cos2x + sin3x = 0
sin 3x (2 cos 2x + 1) = 0, 0 ≤ x ≤π/2

From both x = π / 3 (other than 0).

JEE Main Practice Test- 4 - Question 19

For n > 2 the product   where is equal to 

Detailed Solution for JEE Main Practice Test- 4 - Question 19

Let  Hence the given series S is
S = 

JEE Main Practice Test- 4 - Question 20

The value of K, for which the equation (K–2)x2 + 8x + K + 4 = 0 has both the roots real distinct and negative is:

Detailed Solution for JEE Main Practice Test- 4 - Question 20

(K–2)x2 + 8x + K + 4 = 0

Let 
If the equation f(x) = 0, has real distinct and negative roots then:
D > 0 & f(0) > 0 & 
(i) D > 0

64 – 4 (K2 + 2K – 8) > 0
– K2 – 2K + 24 < 0 K2 + 2K – 24 < 0
(K + 6)(K – 4) < 0
–6 < K < 4
(ii)

⇒ K < –4 or K > 2
(iii)

K – 2 > 0
K > 2
∴D > 0 & f(0) > 0 &

–6 < K < 4 & (K < –4 or K > 2) & K > 2
–6 < K < 4 & K < –4 & K > 2) or (K > 2 & K > 2
– 6 < K < 4 & 
2 < K < 4
K∈(2, 4)
Among the given options
3 lies in the given range,
Hence K = 3

JEE Main Practice Test- 4 - Question 21

The equation of the common tangent touching the circle (x-3)2 + y2 = 9 and the parabola y2 = 4x above the x-axis, is

Detailed Solution for JEE Main Practice Test- 4 - Question 21

Equation of any tangent to parabola  

If the tangent to parabola is also tangent to the circle (x-3)2 + y2 = 9 then:

9m4 + 6m2 + 1 = 9m4 + 9m2
3m2 – 1 = 0

From the figure it is evident that for the tangent above x-axis   Hence equation of required common tangent is:

JEE Main Practice Test- 4 - Question 22

Let f(x) be a continuous function such that f(a – x) + f(x) = 0 for all x[0,a]. Then, the value of the integral is equal to

Detailed Solution for JEE Main Practice Test- 4 - Question 22

Let 

Adding (i) and (ii):

JEE Main Practice Test- 4 - Question 23

The circles which can be drawn to pass through (1,0) & (3,0) and touching the y-axis, intersect at an angle θ. The value of cos θ is equal to

Detailed Solution for JEE Main Practice Test- 4 - Question 23

Equation of line joining A (1,0) and B (3,0) is y = 0. Equation of family of circles passing through A and B is:
(x – 1)(x – 3) + (y – 0) (y – 0) + λy = 0
x2 + y2 – 4x + λy + 3 = 0
If above circle touches y-axis then x = 0 is a tangent. Substituting x = 0:
y2 + λy + 3 = 0
Discriminant of above quadratic must be zero.
λ2 – 12 = 0

Hence the circles are:

Thus, the coordinates of C1 and C2 arerespectively. Also the radii of each of the circles is r1 = r2 = 2
We know that the angle of intersection of two circles of radii r1 and r2 is given by
 where d is the distance between their centers.

Since between two lines whenever there is angle θ there is always the angle π–θ, therefore,

JEE Main Practice Test- 4 - Question 24

a, b, c are positive numbers and abc2 has the greatest value 1/ 64. Then

Detailed Solution for JEE Main Practice Test- 4 - Question 24

We have


Also for the greatest value of abc2 the numbers have to be equal, i.e a = b = c/2
Also given that maximum value = 1/64
so, a + b + c = 1
i.e. a = b = 1/4, c = 1/2

JEE Main Practice Test- 4 - Question 25

If A and B are two square matrices such that B = –A–1 BA, then (A+B)2 is equal to

Detailed Solution for JEE Main Practice Test- 4 - Question 25

B = –A–1 BA
AB = A (–A–1BA)

AB = –BA
AB + BA = 0
Now, (A + B)2 = A2 + B2 + AB + BA
(A + B)2 = A2 + B2, (∵AB + BA = 0)

JEE Main Practice Test- 4 - Question 26

The set of all values of the parameter a for which the points of minimum of the function y = 1 + a2 x – x3
Satisfy the inequality

Detailed Solution for JEE Main Practice Test- 4 - Question 26

 x2 + 5x + 6 < 0 –3 < x < –2 
y = 1 + a2 x – x3

(i) Let a > 0:
Hence  Hence y has minima at  for a > 0.

(ii) Let a < 0:
Hence Hence y has minima at  for a < 0.

From (i) & (ii) 

JEE Main Practice Test- 4 - Question 27

The value of  is

Detailed Solution for JEE Main Practice Test- 4 - Question 27

Substitute (x – 1) = t. Hence

Hence given limit is:

JEE Main Practice Test- 4 - Question 28

The function 

Detailed Solution for JEE Main Practice Test- 4 - Question 28


f (x) is an even function.
NOTE: Integration of every even function is odd function and integration of every odd function is even function, provided the integrands are integrable and the limit is 0 to x. Similarly differentiation of every odd function is even function and that of every even function is odd function, provided the they are differentiable. Here  which is an odd function, therefore  is even function.

JEE Main Practice Test- 4 - Question 29

If for a variable line   the condition a–2 + b–2 = c–2 (c is a constant), is satisfied, then the locus of foot of the perpendicular drawn from origin to this is:

Detailed Solution for JEE Main Practice Test- 4 - Question 29

a–2 + b–2 = c–2 
 
bx + ay – ab = 0
The foot of perpendicular to the above line from O(0,0) is given by:

Using a–2 + b–2 = c–2

x2 + y2 = c2

JEE Main Practice Test- 4 - Question 30

The eccentricity of the hyperbola whose latus rectum is half of its transverse axis, is

Detailed Solution for JEE Main Practice Test- 4 - Question 30

Length of latus rectum of hyperbola = Length of the transverse axis

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