AMU –PAST PAPERS MATHEMATICS- UNSOLVED PAPER - 2002
Transcript
1. AMU PAST PAPERSMATHEMATICS- UNSOLVED PAPER - 2002
2. SECTION I Single Correct Answer Type There are five parts in
this question. Four choices are given for each part and one of them
is correct. Indicate you choice of the correct answer for each part
in your answer-book by writing the letter (a), (b), (c) or (d)
whichever is appropriate
3. 01 Problem The area of a parallelogram whose adjacent sides
are i 2 j 3k and 2 i j 4k is : a. 10 3 b. 5 3 c. 5 6 d. 10 6
4. 02 Problem If a j i 2 3k and b 3 i j 2k , then the unit
vector perpendicular to a and b is : i j k a. 3 i j k b. 3 i j k c.
3 i j k d. 3
5. 03 Problem If the 10th term of a geometric progression is a
and the 4th term it is 4, then its 7th term is : a. 9/4 b. 4/9 c.
36 d. 6
6. 04 Problem a a the harmonic mean of and is : 1 ab 1 ab a. 1
1 a2b2 a b. 1 a2b2 c. a a d. (1 a2 b2 )
7. 05 Problem The general value of obtained from the equation
cos 2 sin is : a. 2n 2 b. n ( 1)n 2 c. n 2 2 d. 2 2
8. 06 Problem 1 5 The principal value of sin is : 3 a. 5 3 b. 5
3 c. 3 d. 4 3
9. 07 Problem The equation of the plane passes through (2,3,4)
and parallel to the plane x + 2y + 4z = 5 is : a. x + 2y + 4z = 10
b. x + 2y + 4z = 3 c. x + 2y + 4z = 24 d. x + y + 2z = 2
10. 08 Problem The distance of the point (2, 3, 4) from the
plane 3x 5y + 2z + 11 = 0 is : a. 2 b. 9 c. 10 d. 1
11. 09 Problem For the function f(x) = x2 6x + 8 2 x 4, the
value of x for which f(x) vanishes has : a. 9/4 b. 5/2 c. 3 d.
7/2
12. 10 Problem 1 From Mean value theoren f(b) f(a) = (b -
af)(x1) a < x1 < b is : f(x) = x then x equal to 2ab a. a b b
a b. b a c. ab a b d. 2
13. 11 Problem If 1 2 1 0 then A and B 3 0 2 3 a. AB = BA b. B2
= B c. AB BA d. A2 = A
14. 12 Problem 1 If for real values of x, cos x then : x a. is
an acute angle b. is a right angle c. is an obtuse angle d. no
value is possible
15. 13 Problem One of the equations of the lines passing
through the point (3, -2) and inclined at 600 at the line 3x y 1:
a. x y = 3 b. x + 2 = 0 c. x + y = 0 d. y + 2 = 0
16. 14 Problem The lines a1x + b1y + c1 = 0 and a2x + b2y + c2
= 0 are perpendicular to each other : a. a1b1 b1a2 = 0 b. a12b2
b12a2 = 0 c. a1b1 b2a2 = 0 d. a1a2 + b1b2 = 0
17. 15 Problem /2 dx is equal to : 0 1 tan x a. b. /2 c. 3 d.
/4
18. 16 Problem cos3 x dx is equal to : 0 a. b. 1 c. 0 d. -
1
19. 17 Problem The angle between the vectors (2 i 6 j 3k ) and
(12 i 4 j 3k ) is : a. 1 1 cos 9 b. 1 9 cos 11 1 9 c. cos 91 1 1 d.
cos 10
20. 18 Problem If the vectors ai 2 j 3k and i 5 j 9k are
perpendicular to each other then a is equal to : a. 5 b. -6 c. - 5
d. 6
21. 19 Problem 200 If i2 = -1 the value of i n is : n 1 a. 0 b.
50 c. - 50 d. 100
22. 20 Problem If c i a ib , where a, b, c ae real, then a2 +
b2 is equal to : c i a. 7 b. 1 c. c2 d. - c2
23. 21 Problem The direction cosines to the normal plane x + 2y
3z + 9 = 0 are : 1 2 3 a. , 14 14 14 1 2 3 b. , , 10 10 14 1 2 1 c.
, , 10 14 14 1 2 3 , , d. 14 14 14
24. 22 Problem The equation of a plane which cuts equal
intercepts of unit lengths on the axes, is : a. x + y + z = 0 b. x
+ y + z = 1 c. x + y z = 1 x y z d. 1 a b a
25. 23 Problem Performing 3 iterations of bisection method of
smallest positive approximate roots of equation x3 5x + 1 = 0 is :
a. 0.25 b. 0.125 c. 0.05 d. 0.1875
26. 24 Problem For the smallest positive root of transcendental
equation x e-x = 0 interval is : a. (1, 2) b. (0, 1) c. (2, 3) d.
(-1, 0)
27. 25 Problem The equation of the sides of a triangle are x +
y 5 = 0, x y + 1 = 0 and y 1 = 0 then the coordinate of the
circumcentre are : a. (2, 1) b. (1, 2) c. (2, -2) d. (1, -2)
28. 26 Problem A stick of length l rests against the floor and
a wall of a room. If the stick begins to slide on the floor, then
the locus of its middle point is : a. A straight line b. Circle c.
Parabola d. Ellipse
29. 27 Problem The probability, that a leap year has 53 Sundays
is : a. 2/7 b. 3/7 c. 4/7 d. 1/7
30. 28 Problem In tossing 10 coins the probability of getting 5
heads is : a. 1 2 63 b. 256 c. 193 250 9 d. 128
31. 29 Problem After second iteration of Newton-Raphson method
the positive root of equation x2 = 3 is, (taking initial
approximation 3 ) 2 a. 7 4 97 b. 56 3 c. 2 d. 347 200
32. 30 Problem By false positioning the second approximation of
a root of equation f(x) = 0 is (where x0, x1 are initial and first
approximations respectively) : a. x1 - f (x0 ) f (x1 ) f (x0 ) f
(x0 ) b. x0 f (x1 ) f (x0 ) x0 f (x 1 ) x1f (x0 ) c. f (x1 ) f (x0
) d. x0 f (x 0 ) x1f (x1 ) f (x1 ) f (x0 )
33. 31 Problem 13 16 19 14 17 20 is equal to : 15 18 21 a. 57
b. - 39 c. 96 d. 0
34. 32 Problem Which one of the following statements is true ?
a. If | A | 0, then b. | A adj A | = | A | (n - 1) where A = | an |
n x n c. If A = A, then A is a square matrix d. Determination of
non-square matrix is zero e. Non-singular square matrix does not
have a unique inverse
35. 33 Problem 1 3 dx is equal to : x x 1 x2 a. log c 2 (1 x 2
) b. log x (1 x2) + c (1 x) c. log c x(1 x) 1 (1 x 2 ) d. log c 2
x2
36. 34 Problem x 1 2 e x dxis equal to : x 1 a. e x c x x b. e
c x x c. e ce x 2 x 1 d. log x x c
37. 35 Problem dy Solution of differential equation dx + ay =
emx is : a. (a + m)y = emx + c b. y = emx + ce-ax c. (a + m) = emx
+ c d. (a + m) y = emx + ce-ax
38. 36 Problem Integrating factor of differential equation cos
x + y sin x = 1 is : a. sec x b. sin x c. cos x d. tan x
39. 37 Problem Solution of differential equation dy sin x sin y
dx = 0 is : a. cos x tan y = c b. cos x sin y = c y c. ecos x tan
=c 2 d. ecos x tan y = c
40. 38 Problem Solution of differential equation x dy y dx = 0
represents : a. Rectangular hyperbala b. Parabola whose vertex is
at origin c. Circle whose centre is at origin d. Straight line
passing through origin
41. 39 Problem With the help of Trapezoidal rule for numerical
integration and the following table : x 0 0.25 0.50 0.75 1 f(x) 0
0.0625 0.2500 0.5625 1 1 The value of f (x) dx is : 0 a. 0.33334 b.
0.34375 c. 0.34457 d. 0.35342
42. 40 Problem By the application of Simpsons one-third rule
for numerical integrations, with 1 dx two sub-intervals, the value
of 0 1 x is : a. 17 36 17 b. 25 25 c. 36 17 d. 24
43. 41 Problem 1 1 If matrix A = 1 1 , then : 1 1 a. A = 1 1 1
1 b. A-1 = 1 1 1 1 c. Adj A = 1 1 d. A= 1 1 Where is a non zero
scalar
44. 42 Problem 9 3 1/2 1/2 If for AX = B, B = 52 and A-1 = 4
3/4 5/4 then X is equal to : 0 2 3/4 3/4 3 a. 3/4 3/4 1/2 b. 1/2 2
c. 4 2 3 d. 1 3 5
45. 43 Problem The sum of first n terms of the series 1 3 7 15
is : ... 2 4 8 16 a. n + 2 - n 1 b. n2 n 1 c. 1 2- n d. 2n 1
46. 44 Problem 1 The coefficient of x in the expansion of 1 x2
x in ascending powers of x, when | x | < 1, is : a. 0 1 b. 2 1
c. 2 d. 1
47. 45 Problem The angle between two lines is : 1 1 a. cos 9 1
4 b. cos 9 1 2 c. cos 9 1 3 cos d. 9
48. 46 Problem a 2 i j 8k and b i 3 j 4k , If then the
magnitude of is equal to : a. 13 13 b. 3 3 c. 13 4 d. 13
49. 47 Problem The line y = 2x + c is tangent to the parabola
y2 = 4x then c is equal to : 1 a. 2 1 b. 2 1 c. 3 d. 4
50. 48 Problem The eccentricity of the ellipse, 4x2 + 9y2 + 8x
+ 36y + 4 = 0 is : 3 a. 5 b. 5 3 5 c. 6 2 d. 3
51. 49 Problem sin2 x cos2 x dx is equal to : sin2 x cos2 x a.
tan x + cot x + c b. cosec x + sec x + c c. tan x + sec x + c d.
tan x + cosec x + c
52. 50 Problem If sum of two numbers is 3, the maximum value of
the product of first and the square of second is : a. 4 b. 3 c. 2
d. 1
53. 51 Problem Three lines ex y = 2, 5x + ay = 3 and 2x + y = 3
are concurrent, then a is equal to : a. 2 b. 3 c. - 2 d. 1
54. 52 Problem j i j The pair of straight line joining the
origin to the points intersection2of the line y iof 2 3k and 4k = 2
x + c and the circles x2 + y2 = 2 are at right angles, if : a. c2 =
9 = 0 b. c2 = 10 = 0 c. c2 4 = 0 d. c2 8 = c
55. 53 Problem The direction ratio of the diagonals of a cube
which joins the origin to the opposite corner are (when the three
con current edges of the cube are co- ordinate axes) : a. 1, 2, 3
b. 2, -2, 1 c. 1, 1, 1 2 2 2 d. , , 3 3 3
56. 54 Problem The cosine of the angle between any two
diagonals of a cube is : 1 a. 3 1 b. 3 1 c. 2 2 d. 3
57. 55 Problem If x f (a) is equal to : f (x) then x 1 f (a 1)
a. f(a2) 1 b. f a c. f(-a) a f d. a 1
58. 56 Problem If the domain of the function f(x) = x2 6x + 7
is (- , ), then the range of function is, a. (-2, ) b. (- , ) c. (-
2, 1) d. (- , -2)
59. 57 Problem a (a x b) is equal to : a. 0 b. a2 c. a2 + ab d.
a, b
60. 58 Problem If a 3 7 5k, b i j 3 3 3k and c i j i j 7 5 3k
are the three coterminous edges of a parallelepiped, then its
volume is : a. 210 b. 108 c. 308 d. 272
61. 59 Problem (2x 3)(3x 4) is equal to : lim x (4x 5)(5x 6) a.
1 10 b. 0 1 c. 5 3 d. 10
62. 60 Problem loge x lim is equal to : x 1 x 1 a. 1 b. 2 1 c.
2 d. 0
63. 61 Problem Differential coefficient of sec x is : 1 a. sec
x sin x 4 x 1 b. (sec x )3 / 2 sin x 4 x 1 c. x . sec x sin x 2 1 x
(sec x )3 / 2 sin x d. 2
64. 62 Problem If y e1 log e x then the value dy is equal to :
dx a. 2 b. 1 c. 0 d. loge xe
65. 63 Problem The co-ordinate of a point P are (3, 12, 4) with
respect to origin O. Then the direction cosines of OP are : 3 1 2
a. , , 13 13 13 3 12 4 b. , , 13 13 13 1 1 1 c. , , 4 3 2 d. 2, 12,
4
66. 64 Problem 2 The equation of the normal to the hyperbola x
y2 at the point (8, 3 3) is : 1 16 9 a. 3 x + 2y = 25 b. 2x + 3 y =
25 c. y + 2x = 25 d. x + y = 25
67. 65 Problem Differential equation for y A cos x sin x, where
a and B are arbitary constants, is 2 a. d y2 y 0 dx d2y 2 y 0 b. dx
2 d2y 2 c. y 0 dx 2 d2y y 0 d. dx 2
68. 66 Problem 1/4 2 2 Order and degree of differential
equation d y y dy are : dx 2 dx a. 4 and 2 b. 2 and 4 c. 1 and 2 d.
1 and 4
69. 67 Problem The function which is continuous for all real
values of x and differentiable at x = 0 is :. a. x1/2 b. | x | c.
log x d. sin x
70. 68 Problem x 1 x 2 Function f (x) is an continuous function
: 2x 3 x 2 a. For x = 2 only b. For all real value of x such that x
2 c. For all real value of x d. For all integral value of x
only
71. 69 Problem The area of the curve x2 + y2 = 2ax is : a. 4 a2
b. a2 1 2 c. a 2 d. 2 a2
72. 70 Problem By graphical method, the solution of linear
programming problem maxmize z = 3x1 + 5x2 subjecdt to 3x1 2x2 18,
x1 4, x2 6, x1 0, x2 0 is : a. x1 = 4, x2 = 6, z = 4.2 b. x1 = 4,
x2 = 3, z = 2.7 c. x1 = 2, x2 = 6, z = 36 d. x1 = 2, x2 = 0, z =
6
73. 71 Problem Maximum value of f(x) = sin x + cos x is : a. 2
b. 2 c. 1 d. 1 2
74. 72 Problem For all real values of x, increasing function
f(x) is : a. x-1 b. x3 c. x2 d. x4
75. 73 Problem 2x2 + 7xy + 3y2 + 8x + 14y + = 0 will represent
a pair of straight lines when is equal to : a. 8 b. 6 c. 4 d.
2
76. 74 Problem The gradient of one of the lines x2 + hxy + 2y2
= 0 is twice that of the other, then h is equal to : a. 2 3 b. 2 c.
3 d. 1
77. 75 Problem A coin is tossed three times is succession. If E
is the event that three are at least two heads and F is the event
in which first throw is a head, then P(E/F) equal to : a. 3 4 3 b.
8 1 c. 2 1 d. 8
78. 76 Problem In a box there are 2 rad, 3 black and 4 white
balls. Out of these three balls are drawn together. The probability
of these being of same colour is : 5 a. 84 1 b. 21 1 c. 84 d. none
of these
79. 77 Problem If 7th term of a Harmonic progression is 8 and
the 8th term is 7, then its 5th term is 56 a. 15 b. 14 27 c. 14 d.
16
80. 78 Problem If the sum of the first n terms of a series be
5n2 + 2n, then its second term is : a. 42 b. 17 c. 24 d. 7
81. 79 Problem If the conjugate (x + iy) (1 2i) be 1 + i, then
: 3 a. y = 5 1 i b. x iy 1 2i 1 i c. x iy 1 2i 1 x d. 5
82. 80 Problem If a is an imaginary cube root of unity, then
for the value of 3n 1 3n 3 3n 5 a. -1 b. 0 c. 3 d. 1
83. 81 Problem The value of 15C 2 2 15C1 2 15C2 2 ... 15C15 is
: 0 a. 0 b. - 15 c. 15 d. 51
84. 82 Problem (loge n)2 (loge n)4 1 ... is equal to : 2! 4! 1
a. 2 (n + n-1) b. 1 n c. n 1 d. (en + e-n) 2
85. 83 Problem ax da is equal to : ax 1 c a. x 1 ax 1 b. e loge
a e c. ax loge a + c d. none of these
86. 84 Problem Two numbers with in the bracket denote the ranks
of 10 students of a class in two subjects (1, 10), (2, 9), (3, 8),
(4, 7), (5, 6), (6, 5)(7, 4), (8, 3), (9, 2), (10, 1) then rank
correlation coefficient is : a. - 1 b. 0 c. 0.5 d. 1
87. 85 Problem There are 5 roads leading to a town from a
village. The number of different ways in which a villager can go to
the town return backs is : a. 20 b. 25 c. 5 d. 10
88. 86 Problem If (1 + x)n = C0 + C1x + C2x2 + .Cnxn then the
value of Cn = 2C1 + 3C2 + .+ (n + 1) Cn will be : a. (n + 2)2n b.
(n + 1)2n 1 c. (n + 1)2n d. (n + 2)2n - 1
89. 87 Problem In a triangle ABC, 2 cos A = sin B cosec C then
a. 2a = bc b. a = b c. b = c d. c = a
90. 88 Problem If tan x b then the value of a cos 2x + b sin 2x
is : a a. a b. a b c. a + b d. b
91. 89 Problem In angle of a triangle are in the ratio of 2 : 3
: 7, then the sides are in the ratio of : a. 2 : ( 3+ 1) : 2 b. 2 :
2 : ( 3+ 1) c. 2 : 2 : ( 3+ 1) d. 2 : ( 3 + 1) : 2
92. 90 Problem 1 1 ac 1 bc is equal to : 1 1 ad 1 bc 1 1 ac 1
bc a. a + b + c b. 1 c. 0 d. 3
93. 91 Problem The angle of elevation of the sum if the length
of the shadow of a tower is 3 times the height of the pole is : a.
1500 b. 300 c. 600 d. 450
94. 92 Problem If the sides of triangle are 3, 5, 7 then : a.
Triangle is right-angled b. One angle is obtuse c. All its angles
are acute d. None of these
95. 93 Problem Area bounded by lines y = 2 + x, y = 2- x and x
= 2 is : a. 16 b. 8 c. 4 d. 3
96. 94 Problem Area bounded by parabola y2 = x and straight
line 2y = x is : a. 4 3 b. 1 2 c. 3 1 d. 3
97. 95 Problem The latusrectum of parabola y2 = 5x + 4y + 1 is
: a. 10 b. 5 5 c. 4 5 d. 2
98. 96 Problem x = 7 touches the circles x2 + y2 4x 6y 12 = 0
then the co-ordinates of the point of contact : a. (7, 4) b. (7, 3)
c. (7, 2) d. (7, 8)
99. 97 Problem If the roots of the equation, (a2 + b2) t2 2(ac
+ bd) t + (c2 + d2) = 0 are equal then : a. ad + bc = 0 a c b. b d
c. ab = dc d. ac = bc
100. 98 Problem 2 If the roots a, of the equation x bx 1 are
such that a 0 , ax c 1 then the value of is : 1 a. c b. 0 a b c. a
b a b d. a b
101. 99 Problem The equation of the tangents of the ellipse 9x2
+ 16y2 = 144 from the point (2, 3) are : a. y = 3, x + y = 5 b. y =
3, x = 2 c. y = 2, x = 3 d. y = 3, x = 5
102. 100 Problem The latus rectum of the hyperbola 9x2 16y2 18x
32y 151 = 0 9 a. 4 3 b. 2 c. 9 9 d. 2