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Paper - 1
PHYSICS (PART I)
SECTION I
This section contains 9 multiple-choice questions numbered 1 to
9. Each question has 4 choices (A), (B), (C) and (D),
out of which Only One is correct
1. A and B are two concentric spheres with their centers
at O and of radius R and 2R respectively. C and D are
two other concentric spheres of radius R and 2R and
their center is at O. O and O are at a separated by a large
distance. Initially the charge on sphere A is q and on B is q. When
the switch is connected the
charge on the sphere D and C is
2R
A
B
S
R
2R
C
D
R
O O
(A) 2
q, zero (B)
2
q, zero (C) ,
2 2
q q (D) Zero, Zero.
2. The pitch of a screw gauge is 1 mm and there are 100
divisions on its circular scale. When
nothing is put in between its jaws, the zero of the circular
scale lies 4 divisions below the
reference line. When a steel wire is placed between the jaws,
two main scale divisions are
clearly visible and 67 divisions on the circular scale are
observed. The diameter of the wire is
(a) 2.71 mm (b) 2.67 mm (c) 2.63 mm (d) 2.65 mm
3. If the ground state of hydrogen atom is chosen as zero
potential energy level, the value of the
total energy in the second excited state (in eV) is
(A) 25.69 (B) 12.09 (C) 23.8 (D) 20.4
4. In a sample of rock, the ratio of 206Pb to 238U nuclei is
found to be 0.5. The age of the
rock is. (Assume that all the Pb nuclides in the rock was
produced due to the decay of
Urarium nuclides and 238 9
1/ 2T ( U) 4.5 10 year).
(A) 2.25 109 year (B) 4.5 109 ln 3 year
(C) 4.5 109 32ln
ln 2 year (D) 2.25 109 ln
3
2
year
5. Interference pattern is observed at P due to superposition of
two rays coming out from a
source S as shown in the figure. The value of l for which maxima
is obtained at P is
2l P
l/3 30
o
S
(A) 13
2
nl (B)
132
12
nl
(C)
324312
nl (D)
13
12
nl
6. A thin plane convex glass lens ( = 1.5) has its plane surface
silvered and R is the radius of curvature of the curved part. Then
which of the following ray diagram is the correct
representation for an object placed at O.
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O 2R O 2R
(A) (B)
O 3R O 2R
(C) (D)
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7. A rod of length l is standing vertically on a frictionless
surface. It is disturbed slightly from
this position. Let and be the angular speed and angular
acceleration of the rod when the
rod turns through an angle with the vertical, the value of
acceleration of center of mass of the rod is
(A) 2
sin cos2 2
l l (B)
2
sin cos2 2
l l
(C) cos2
l (D)
2
sin2
l
8. Two blocks A (5kg) and B(2kg) attached to the ends of a
spring
constant 1120N/m are placed on a smooth horizontal plane with
the
spring undeformed. A and B are imparted simultaneously
velocities of
3m/s and 10m/s along the line of the spring in the same
direction
shown. Consider the following statements. Choose the correct
answer.
(1) when the extension of the spring is maximum the velocities
of A and B are zero.
(2) the maximum extension of the spring is 25cm.
(3) maximum extension and maximum compression occur
alternately.
(4) the maximum compression occur for the first time after
56
sec.
(A) Statements (2), (3), (4) are correct (B) Statements (1),
(2), (3) are correct
(C) Statements (2), (3) are correct. (D) All the statements are
correct
9. Initially spring is compressed by distance x0 from
equilibrium
position. At this compression block is given velocity
0
3K
mx , so that compression in the spring increases and
block start S.H.M. (Spring constant is K). Equation of
motion
of the block is :
EquilibriumPosition
x0
K
(A) 0
ky 3 sin t
m 3
x (B) 0
Ky 2 sin t
m 6
x
(C) 0
Ky 3 sin t
m 6
x (D) 0
Ky 2 sin t
12 3
x
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SECTION II
Assertion Reason Type
This section contains 4 questions numbered 10 to 13. Each
question contains STATEMENT1 (Assertion) and STATEMENT2 (Reason).
Each question has 4 choices (A), (B), (C) and (D), out of which
ONLY ONE is correct.
NOTE : (A) Statement 1 is True, Statement 2 is True; Statement 2
is a correct explanation for Statement 1.
(B) Statement 1 is True, Statement 2 is True; Statement 2 is NOT
a correct explanation for Statement 1.
(C) Statement 1 is True, Statement 2 is False. (D) Statement 1
is False, Statement 2 is True.
10. STATEMENT 1: Good reflectors are poor emitters of thermal
radiation. STATEMENT 2 : The ratio of the emissive power (e) and
absorptive power (a) is constant
for all substances at any given temperature and for radiation of
the same wavelength.
11. Statement-1: A horizontal rim of a wheel is free to rotate
about a vertical axis. A line charge
is glued onto the rim of the wheel. The shaded central region
has a uniform magnetic field
pointing in vertical direction. If the field is switched off,
the wheel starts rotating with certain
angular speed which does not depend on how fast or slow the
field is switched off.
+ + + + + +
+ + +
+ + +
+ + + + + + +
+ +
+
Statement-2: Induced electric field due to a time varying
magnetic field does not depend on
time taken to change magnetic field.
12. STATEMENT 1
Mirrors are free from chromatic aberration.
STATEMENT 2
The refractive index of the material of the mirror is
independent of wavelength (color) of
light.
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13. STATEMENT 1
The kinetic energies of all particles, emitted by a sample
containing active radiocobalt nuclei, are identical.
STATEMENT 2
particles get their energy from the energy differences between
the mother and daughter nuclei, which is fixed for a particular
decay scheme.
SECTION III
Linked Comprehension Type
This section contains 2 paragraphs P14-16, and P17-19 . Based
upon each paragraph, 3 multiple choice questions have to
be answered. Each question has 4 choices (A), (B), (C) and (D),
out of which ONLY ONE is correct.
P14-16 : Paragraph for Questions Nos. 14 to 16
A uniform rod is lying at rest on a frictionless horizontal
surface. A
particle, of same mass as the rod, collides with the rod at its
end
with an angle from the normal as shown in the figure. Assume
that there is no friction between the rod and particle and that
the
collision is elastic.
Onormal
vm
m,
2
14. The magnitude of the velocity of the centre of mass of the
rod after collision is
(a) v cos (b) v sin (c) 2
v cos5
(d) 2
v sin5
15. The magnitude of change in angular momentum of the rod about
the point O after collision is
(a) zero (b) m v cos
5
(c)
m vsin
5
(d)
6m vsin
5
16. The magnitude of the change in velocity of the particle
after collision is
(a) 8
v cos5
(b) 2
v cos5
(c) 8
vsin5
(d) 2
v sin5
P17-19 : Paragraph for Questions Nos. 17 to 19
For the two given circuits at t = 0, a constant force F acts at
the middle points of the rigid
conducting wires ab and cd. At t = 0 both wire are at rest. The
electric resistance of the circuit
(a) is zero, while for the circuit (b) electrical resistance is
R. The electrical resistance of the
horizontal rails is zero. There is no friction between rails and
rigid wires ab and cd. Both the
circuits are placed in a vertical constant magnetic field B (as
shown in the figure). The mass and
length of the each wire ab and cd is m, respectively
R
FCC F
m, m,
Circuit (X) Circuit (Y)
BB
a
b c
d
17. At t =m
F
, electric current for circuit (X) is
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(A) zero (B) 2 2
B CF
(m B C)
(C)
B CF
m
(D)
F
B
18. At t = 0, acceleration of wire cd for circuit Y is
(B) F
m (B)
2 2
F
(m B C) (C)
2 2
F
B C (D)
2 2
2F
B C
19. At t = 0, acceleration of wire ab for circuit X is
(A) F
m (B)
2 2
F
(m B C) (C)
2 2
F
B C (D)
2 2
2F
B C
SECTION IV Matrix Match Type
This section contains 3 questions. Each question contains
statements given in two columns
which have to be matched. Statements (A, B, C, D) in Column I
have to be matched with
statements (p,q,r,s) in Column II. The answers to these
questions have to be appropriately
bubbled as illustrated in the following example. If the correct
matches are A-p, A-s, B-q, B-r, C-
p, C-q and D-s, then the correctly bubbled 4 4 matrix should be
follows :
20. The entries in Column I depict certain current
distributions, while the entries in Column II
depict the variation of the magnetic field (B) as one moves
along the xaxis for each of these distributions, but in a different
order. Match the entries in Column I with the proper entries in
Column II.
Column I Column II
(A)
O x(perpendicular
to wire)
Straight current carrying wire
(P) B
x
(B)
Ox
(axis of wire)
Circular current carrying wire
(Q) B
x
(C)
Ox
(perpendicular to the plane of the wires;
O being equidistant)
Parallel current carrying wires in the same plane
i
i
(R) B
x
p q r s
A
B
C
D
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(D)
x(parallel to one of the wires)
Two perpendicular current carrying wires in the same plane
i
i
(S) B
x
21. Charge Q is distributed on two identical capacitors in
parallel. Separation of the plates in each capacitor is d0.
If the first plate of the capacitor C1 and the second plate
of the capacitor C2 start moving to the left with constant
speed v, then match the options in Column I with those
in Column II.
+ -
+ -
Column I Column II (A) Charge on capacitor C1 as a
function of time (P) Reduces
(B) Charge on capacitor C2 as a
function of time (Q)
0
0
Q(d vt)
2d
(C) Current in the circuit (R)
0
0
Q(d vt)
2d
(D) Energy of the system (S)
V
0
Q
2d
22.
Column I Column II
(A) Mass of products formed is less than
that of reactants.
(P) decay.
(B) Binding energy per nucleon
increases.
(Q) decay.
(C) Emitted particles have variable
kinetic energy.
(R) +decay.
(D) Two body decay process. (S) decay.
CHEMISTRY PART - II Useful Data: Gas Constant R = 8.314 J K1
mol1
= 0.0821 Lit atm K1 mol1
= 1.987 2 Cal K1 mol1
Avogadro's Number Na = 6.023 1023
Plancks constant h = 6.625 1034 J s
= 6.625 1027 erg s 1 Faraday = 96500 Coulomb
1 calorie = 4.2 Joule
1 amu = 1.66 1027 kg
1 eV = 1.6 1019 J Atomic No: H = 1, D = 1, Li = 3, Na = 11, K =
19, Rb = 37, Cs = 55, F = 9, Ca = 20, He = 2, O = 8, Au = 79, Ni =
28,
Zn = 30, Cu = 29, Cl = 17, Br = 35, Cr = 24, Mn = 25, Fe = 26, S
= 16, P = 15, C = 6, N = 7, Ag = 47.
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Atomic Masses: He = 4, Mg = 24, C = 12, O = 16, N = 14, P = 31,
Br = 80, Cu = 63.5, Fe = 56, Mn = 55, Pb = 207, Au = 197,
Ag = 108, F = 19, H = 1, Cl = 35.5, Sn = 118.6, Na = 23, D = 2,
Cr = 52, K = 39, Ca = 40, Li = 7, Be = 4,
Al = 27, S = 32.
SECTION - I
This section contains 9 multiple choice questions numbered 23 to
31. Each question has 4 choices (A), (B), (C) and
(D), out of which ONLY ONE is correct
23.
3
(i)t BuO
(ii)H OD.
CH3
N R
O
D is
(a)
CH3
N R
O
t-BuO
(b)
N R
(c)
N
R
(d)
N
R
24. How many grams of sucrose (Molecular weight = 342) should be
dissolved in 100 gm water
in order to have a solution with sum of lowering of freezing
point and elevation of boiling
point equal to 5oC (Kb = 0.51, Kf = 1.86)?
(a) 34.2 gm (b) 72 gm
(c) 342 gm (d) 460 gm
25.
H
BrCl
H H
BrH
Cl Br
HH
Cl Br
HCl
H
(A) (B) (C) (D)
(I) (A) and (B) are diastereomers
(II) (B) and (D) are enantiomers
(III) (A) and (D) are geometric isomer
(IV) (A) and (C) are optical isomer
(a) only I is true (b) I, II & III are true
(c) I & II are true (d) all are true
26. 23
(Reaction similar to acidic -Halogenation)
HNO &EtONO/ HCl
H O(A).
Et C CH3
O
(A) is
(a) Et C C H
OO
(b) Et C CH N
O
OH
(c) No reaction (d) Et C CH2NO
O
27. The IUPAC name of complex K3[Al(C2O4)3] is
(a) potassium aluminoxalate (b) potassium trioxalato aluminate
(III)
(c) potassium aluminium (III) oxalate (d) potassium
trioxalatoaluminate (VI)
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28. CH3 C Cl / AlCl 3
O
Me C Cl
O2I / NaOH(i)LDA
(Acid)(Acid)
(ii)
A B C D E(ppt.)
(C) & D are :
(I) C O
O
(II) CH3 C O
O
(III) C CH2
O
C O
O
(a) I only (b) I and II (either)
(c) III only (d) none of these
29. A solution of 0.1 M Na2CO3 is titrated against HCl using (i)
phenolpthalene as an indicator
and (ii) Methyl orange as an indicator. If 1 2 3 2
6 10
a (H CO ) aK 2 10 ,K 4 10 , then
[pH(1) pH(2)] equals to? (Where pH1 is at end point with
phenalpthalene and pH2 is at end point with methyl orange) (gases
are evolved off if any).
(a) 1 (b) 3
1 log 22
(c) 0 (d) 3
1 log 22
30. 2
3 2Cu (aq) NO NH OH Cu
NH2OH + Fe2+
Fe3+ + NH3
NH3 + HCl 4NH + Cl
If 0.72 M of 100 ml Cu+ was required to completely reduce
3NO
to NH2OH; if Fe
2+ was in
excess then volume of 0.1 M HCl needed to react with NH3 formed
in ml will be?
(a)240 (b)360 (c)120 (d)480
31. The molar conductivity at infinity dilution of AgNO3, NaCl
and NaNO3 are 116, 110, 106
s-cm2-mol
1 respectively. The conductivity of AgCl in water is 2.4 106
s/cm and that of
water is 1.2 106 s/cm. Find the value of x. Where x 106 is
molarity of AgCl = (a) 10 (b) 20 (c) 30 (d) 40
SECTION - II
Assertion - Reason Type
This section contains 4 questions numbered 32 to 35. Each q ues
t io n contains STATEMENT-1 (Assertion) and
STATEMENT-2 (Reason). Each q u e s t i o n has 4 choices (A),
(B), (C) and (D) out of which ONLY ONE is correct.
Note: (A) Statement-1 is True, Statement-2 is True; Statement-2
is a correct explanation for
Statement-1 (B) Statement-1 is True, Statement-2 is True;
Statement-2 is NOT a correct explanation for
Statement-1 (C) Statement-1 is True, Statement-2 is False
(D) Statement-1 is False, Statement-2 is True
32. STATEMENT-1 : [Fe(CN)6]4
is an outer orbital complex.
STATEMENT-2 : Electronic configuration of Fe2+
ion is 1s2, 2s
2, 2p
6, 3s
2, 3p
6, 3d
6,4s
0
33. STATEMENT-1 :CH3CH2OCH2Cl reacts faster when treated with
water than
CH3CH2OCH2CH2CH2Cl.
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STATEMENT-2 : Carbonium ion formed by the ionization of
CH3CH2OCH2Cl is stabilized
by resonance
34. STATEMENT 1 Specific activity of the same radioactive
substance is same for 10g radioactive substance as
well as 50 g radioactive substance.
STATEMENT 2 Since specific activity of a radioactive substance
is its activity per g.
35. STATEMENT 1 The value of equilibrium constant may have lower
or higher value at different temperatures.
STATEMENT 2 The values of equilibrium constant depends on
enthalpy of reaction.
SECTION - III
Linked Comprehension Type
This section contains 2 paragraphs C36-38 and C39- 41. Based
upon each paragraph, 3 mul t iple choice questions have
to he answered. Each question has-4 choices (A), (B), (C) and
(D), o ut of which ONLY ONE is correct.
C36 - 38: Paragraph for Question Nos. 36 to 38
When a liquid is completely miscible with another liquid, a
homogeneous solution consisting
of a single phase is formed. If such a solution is placed in a
closed evacuated vessel, the total
pressure exerted by the vapour, after the system attained
equilibrium will be equal to the sum
of partial pressures of the constituents. A solution is said to
be ideal if its constituents follow
Raoults law under all conditions of concentrations. i.e., the
partial pressures of each and every constituents is given by pi =
xipi
0
Where pi is the partial pressures of the constituent i, whose
mole fraction in the solution is xi
and pi0 is the corresponding vapour pressure of the pure
constituent.
Since both the components of an idel binary liquid system follow
Raoults law of the entire range of the composition, the partial
pressure exerted by the vapours of these constituents
over the solution will be given by
pA = xApA0 (i)
pB = xB pB0
(ii) where xA and xB are the amount fractions of the two
constituents in the liquid phase and pA
0
and pB0 are the respective vapour pressures of the pure
constituents. The total pressure (p)
over the solution will be the sum of the partial pressures. The
composition of the vapour
phase (yA) can be determined with the help of Daltons law of
partial pressures.
36. For an ideal solution in which pA0 > pB
0, the plot of total pressure (p) verses the mole fraction
of A at constant temperature in the vapour phase is :
(a)
0 1 1 0
yA
yB
pB0
pA0
p
(b)
0 1 1 0
yA
yB
pB0
pA0
p
-
(c)
0 1 1 0
yA
yB
pB0
pA0
p
(d)
0 1 1 0
yA
yB
pB0
pA0
p
37. A plot of reciprocal of total pressure 1
p
verses yA gives
(a) an linear plot with slope = 0 0
B A
1 1
p p
(b) a linear plot with slope =
0 0A B
1 1
p p
(c) a linear plot with slope = 0
B
1
p (d) a linear plot with slope = pA
0pB
0
38. Two liquids A and B form an ideal solution at temperature T.
When the total vapour pressure
above the solution is 600 torr, the amount fraction of A in the
vapour phase is 0.35 and in the
liquid phase is 0.70. The vapour pressures of pure B and A
are
(a) 800 torr; 1300 torr (b) 1300 torr; 300 torr
(c) 300 torr; 1300 torr (d) 300 torr; 800 torr
C39 - 41: Paragraph for Question Nos. 39 to 41
When CH3CH=CH2 is treated with Br2 it forms an optically active
product, further the same
compound when treated with HBr forms optically inactive
product.
CH3CH=CH2 + Br2 Product
CH3CH=CH2 + HBr Product When HBr adds to 2-methyl-1-butene in
the presence of benzoyl peroxide, the product is
racemic mixture.
CH3CH2 C CH2
CH3
+ HBr Peroxide Racemic mixture
However, when HBr adds on 3-chloro-1-butene, the product is
found to be optically active.
+ HBr Optically active
CH3
HCl
CH CH2
39. Formation of optically inactive product by the additions HBr
on in presence and absence of
peroxide to CH3CH=CH2 is (a) of same type
(b) of different type
(c) due to formation of carbocation in I reaction and free
radical in II reaction
(d) due to formation of carbocation in both reactions.
40. The type of intermediate formed in the above mentioned
reaction of 2-methyl-1-butene is
(a) carbocation (b) free radical
(c) carbanion (d) carbene
41. Optically activity in the product of the reaction of
(+)-3-chloro-1-butene is due to
(a) formation of (+)enantiomer (b) formation of the
()enantiomer
-
p q r s
A
B
C
D
(c) formation of non-50 : 50 racemic mixture
(d) formation of diastereomeric pair
SECTION IV Matrix Match Type
This section contains 3 questions. Each question contains
statements given in two columns
which have to be matched. Statements (A, B, C, D) in Column I
have to be matched with
statements (p, q, r, s) in Column II. The answers to these
questions have to be appropriately
bubbled as illustrated in the following example
If the correct matches are A p, A s, B q, B r, C p, C q and D s,
then the
correctly bubbled 4 4 matrix should be as follows:
42. Reaction sequence I
O2 2 2(i) I / NaOH SO Cl EtOH / H EtMgBr
1 1 1 1(ii)HA B C D
Reaction sequence II
H
O2 2SO Cl[O] EtOH EtMgBr
2 2 2 2A B C D
Reaction sequence III
NH2
O2 5 2P O (i)I / NaOHEtMgBr MeOH
3 3 3 3(ii)H HA B C D
Reaction sequence IV Cl
3H OKCN MeOH / H MeMgBr
4 4 4 4A B C D
Match the compounds given in Column I with respect to the
sequences in which there are found in Column II Column I Column
II
(A) CH3 C Cl
O
(P) Sequence I
(B) CH3 C Et
O
(Q) Sequence II
(C) Et C OH
O
(R) Sequence III
(D) Et C O
O
Me
(S) Sequence IV
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43. Match the following :
Column I Column II
(A) Monomer of natural rubber (P) RI (B) Most reactive alkyl
halide for SN
2 reactions (Q) CHCl3
(C) Gives alcohol with NaOH (aq) (R) Isoprene
(D) Give carboxylic acid with aq. NaOH (S) 2-methyl buta-1,
3-diene
44. Match the following :
Column I Column II
(A) Spontaneous process (P) H = ve (B) Heat flow from high
temperature
of system towards low
temperature of surroundings
(Q) G = +ve
(C) Non spontaneous process (R) Stotal = +ve (D) Increase in
randomness of system
by heating
(S) G = ve
MATHEMATICS PART - III
SECTION I
This section contains 9 multiple-choice questions numbered 45 to
53. Each question has 4 choices (A), (B), (C) and
(D), out of which Only One is correct
45.
2sec x
2
2x 2
4
f t dt
lim
x16
equals
(a) 8
f 2
(b) 2
f 2
(c) 2 1
f2
(d) 4f 2
46. Let f(x) = x + sin x. The area bounded by 1y f x ,y x, x 0,
is (a) 1 (b) 2
(c) 3 (d) canot be found because f-1
(x) cannot be determined
47. If x = a cos t, y = a sin t, then 2
2
d y
dx at t =
4
is
(a) a
2 2 (b)
a
2 2 (c)
2 2
a (d)
2 2
a
48. The reflection of the point P(1, 0, 0) in the line x 1 y 1 z
10
2 3 8
is
(a) (3, 4, 2) (b) (5, 8, 4) (c) (1, 1, 10) (d) (2, 3, 8)
49. The line x + y = 6 is a normal to the parabola y2 = 8x at
the point
(a) 18, 12 (b) (4, 2) (c) (2, 4) (d) (3, 3)
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50. The line x + y = 1 meets x-axis at A and y-axis at B. P is
the mid-point of AB. P1 is the foot
of the perpendicular from P to OA; M1 is that from P1 to OP; P2
is that from M1 to OA and so
on. If Pn denotes the nth foot of the perpendicular on OA from
Mn-1, then OPn =
(a) 1/2 (b) 1/2n (c) 1/2
n/2 (d) 1/ 2
51. If 0 < x < 1, the number of solutions of the
equation
1 1 1 1tan x 1 tan x tan x 1 tan 3x is (a) 0 (b) 1 (c) 2 (d)
3
52. If a1 > 0 for i = 1, 2, , n and a1a2.an = 1, then (2 +
a1)(2 + a2).(2 + an) is greater than (a) 2
n/2 (b) 2
3n/2 (c) 2
2n (d) none of these
53. If the ratio 1 z
1 z
is purely imaginary, then
(a) 0 < |z| < 1 (b) | z | 1
(c) | z | 1 (d) bounds for |z| can not be decided
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SECTION II
Assertion Reason Type
This section contains 4 questions numbered 54 to 57. Each
question contains STATEMENT1 (Assertion) and STATEMENT2 (Reason).
Each question has 4 choices (A), (B), (C) and (D), out
of which ONLY ONE is correct
Note: (A) Statement-1 is True, Statement-2 is True; Statement-2
is a correct explanation for
Statement-1
(B) Statement-1 is True, Statement-2 is True; Statement-2 is NOT
a correct
explanation for Statement-1
(C) Statement-1 is True, Statement-2 is False
(D) Statement-1 is False, Statement-2 is True
54. Statement-1: Curve satisfying the differential equation
y
y '2x
passing through (2, 1) is a
parabola with focus 1
,04
.
Statement-2: The differential equation y
y '2x
is of variable separable.
55. Let
x
x
x
2 1, 1 x 0
f x 2 , x 0
2 1, 0 x 1
Statemnet-1: f is bounded but never reaches its maximum and
minimum.
Statement-2: f has a discontinuity at 0.
56. Statement-1: P is a point (a, b, c). Let A, B, C be the
images of P in yz, zx ad xy planes
respectively, then equation of the plane passing through the
points A, B and C is
x y z1
a b c .
Statement-2: The image of a point P in a plane is the foot of
the perpendicular drawn from P
on the plane.
57. Statement-1: A chord y = mx + c of the curve 3x2 y2 2x + 4y
= 0, which passes through
the point (1, 2), subtend a right angle at the origin.
Statement-2: Lines represented by the equation
(3c + 2m)x2 2(1 + 2m)xy + (4 c)y2 = 0 are perpendicular if c + m
+ 2 = 0.
SECTION III
Linked Comprehension Type
This section contains 2 paragraphs P58-60 and P61-63. Based upon
each paragraph, 3 multiple choice questions have to
be answered. Each question has 4 choices (A), (B), (C) and (D),
out of which ONLY ONE is correct.
M58-60 : Paragraph for Questions Nos. 58 to 60
If f, g and h are functions having a common domain D and h x f x
g x , x D and if
x a x alimh x limg x l
then x alimf x = l
. This is known as Sandwich Theorem.
58. 4
x 0
1lim x sin
3 x
is
-
(a) 0 (b) 1
(c) 1
3 (d) does not exist
59. Let 1/ x 1/ x
2
1/ x 1/ x
e ef x x , x 0
e e
and f(0) = 1 then
(a) x 0lim f x
does not exist (b)
x 0lim f x
does not exist
(c) x 0lim f x
exists (d) f is continuous at x = 0.
60. Let 5 31
f x x , x 0x
and f(0) = 0 ([.] denotes the greatest integer function)
(a) x 0lim f x
does not exist (b) f is not continuous at x = 0
(c) x 0lim f x
= 1 (d) x 0lim f x
= 0
M61-63 : Paragraph for Questions Nos. 61 to 63
P(a, 5a) and Q(4a, a) are two points. Two circles are drawn
through these points touching the
axis of y.
61. Centre of these circles are at
(a) (a, a), (2a, 3a) (b) 205a 29a
,18 3
, 5a
,3a2
(c) 29a
3a,3
, 205a 29a
,9 18
(d) none of these
62. Angle of intersection of these circles is
(a) tan-1
(4/3) (b) 1tan 40/9 (c) tan
-1(84/187) (d) /4
63. If C1, C2 are the centres of these circles then area of
OC1C2, where O is the origin, is (a) a
2 (b) 5a
2 (c) 10a
2 (d) 20a
2
SECTION IV
Matrix Match Type
This section contains 3 questions. Each question contains
statements given in two columns which
have to be matched. Statements (A, B, C, D) in Column I have to
be matched with statements
(p,q,r,s) in Column II. The answers to these questions have to
be appropriately bubbled as
illustrated in the following example. If the correct matches are
A-p, A-s, B-q, B-r, C-p, C-q and
D-s, then the correctly bubbled 4 4 matrix should be
follows:
64. The anti-derivative of
COLUMN I COLUMN II
(A)
2
secx
secx tan x (P)
sin x 2log C
sin x 1
(B)
cos x
sin x 1 sin x 2 (Q)
2
2
cos xC
2 1 sin x
(C)
1
2
2xsin
1 x
,|x| < 1 (R) 1 22x tan x log 1 x C
p q r s
A
B
C
D
-
(D) tan x cot x (S)
1 tan x 12 tan C2 tan x
-
65. Letters of the word INDIANOIL are arranged at random.
Probability that the word formed
COLUMN I COLUMN II
(A) Contains the word INDIAN (P)
9
5
1
C
(B) Contains the word OIL
(Q)
5 72 21
C C 9!
(C) Begins with I and ends with L
(R) 1
24
(D) Has vowels at the odd places
(S)
7 93 21
C C
66. Let
2 sin cos
p 1 cos sin
1 sin cos
,
sin 2 1 1
q cos 2 4 3
2 7 5
,
cos sin cos
r sin cos sin
cos sin cos
and
2
2 2 2
2 2
sec 1 1
s cos cos cosec
1 cos cot
Match the functions on the left with their range on the
right.
COLUMN I COLUMN II (A) p (P) [0, 1]
(B) q (Q)
0,2 2
(C) r (R) [2, 2]
(D) s (S) 5 2, 5 2