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1 |
Prove that C0 – 22C1 + 32C2 − . . . + (−)n (n + 1)2 Cn = 0 for n > 2 where 
Prove that C0 – 22C1 + 32C2 − . . . + (−)n (n + 1)2 Cn = 0 for n > 2 where
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IIT 1989 |
05:31 min
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2 |
Show that 
Show that
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IIT 1990 |
05:42 min
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3 |
The centre of the circle passing through (0, 1) and touching the curve  at (2, 4) is a)  b)  c)  d) None of these
The centre of the circle passing through (0, 1) and touching the curve at (2, 4) is a) b) c) d) None of these
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IIT 1983 |
07:23 min
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4 |
Determine a positive integer n ≤ 5 such that  . a) 1 b) 2 c) 3 d) 4
Determine a positive integer n ≤ 5 such that . a) 1 b) 2 c) 3 d) 4
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IIT 1992 |
04:02 min
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5 |
If a, b, c, d are distinct vectors satisfying relation  and  . Prove that 
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IIT 2004 |
02:40 min
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6 |
If two circles  and  intersect in two distinct points, then a) 2 < r < 8 b) r < 2 c) r = 2 d) r > 2
If two circles and intersect in two distinct points, then a) 2 < r < 8 b) r < 2 c) r = 2 d) r > 2
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IIT 1989 |
04:34 min
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7 |
The maximum value of cos 1 cos2 cos3 …… cosnunder the restriction 0  1 , 2 , 3 …. , n   and cot1 cot2 cot3 …… cotn= 1 is a)  b)  c)  d) 
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IIT 2001 |
03:43 min
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8 |
The left hand derivative of f (x) = [x] sinπx at k, k an integer is a)  (k – 1)π b)  (k – 1)π c)  kπ d) kπ
The left hand derivative of f (x) = [x] sinπx at k, k an integer is a) (k – 1)π b) (k – 1)π c) kπ d) kπ
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IIT 2001 |
03:56 min
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9 |
Determine the value of  a)  b)  c)  d) 
Determine the value of a) b) c) d)
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IIT 1997 |
06:07 min
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10 |
Let f : ℝ → ℝ be such that f (1) = 3 and  then  equals
a) 1 b)  c)  d) 
Let f : ℝ → ℝ be such that f (1) = 3 and then equals a) 1 b) c) d)
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IIT 2002 |
02:57 min
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11 |
For x > 0, let  find the function  and show that  . Here  . a)  b)  c)  d) 
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IIT 2000 |
06:08 min
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12 |
If two distinct chords drawn from the point (p, q) on the circle  (where pq ≠ 0) are bisected by the X-axis then a)  b)  c)  d) 
If two distinct chords drawn from the point (p, q) on the circle (where pq ≠ 0) are bisected by the X-axis then a) b) c) d)
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IIT 1999 |
05:52 min
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13 |
Let  are the perpendiculars from the vertices of a triangle to the opposite sides, then  a) True b) False
Let are the perpendiculars from the vertices of a triangle to the opposite sides, then a) True b) False
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IIT 1978 |
02:41 min
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14 |
The coefficient of x99 in the polynomial
(x – 1) (x – 2) . . . (x – 100) is
The coefficient of x99 in the polynomial
(x – 1) (x – 2) . . . (x – 100) is
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IIT 1982 |
02:12 min
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15 |
Evaluate 
Evaluate
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IIT 2004 |
07:21 min
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16 |
The sum of the rational terms in the expansion of  is
The sum of the rational terms in the expansion of is
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IIT 1997 |
03:13 min
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17 |
A unit vector perpendicular to the plane determined by the points P (1, -1, 2), Q (2, 0, -1) and R (0, 2, 1) is . . . . .
A unit vector perpendicular to the plane determined by the points P (1, -1, 2), Q (2, 0, -1) and R (0, 2, 1) is . . . . .
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IIT 1994 |
03:33 min
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18 |
If one of the diameters of the circle  is a chord to the circle with centre (2, 1) then the radius of the circle is a)  b)  c) 3 d) 2
If one of the diameters of the circle is a chord to the circle with centre (2, 1) then the radius of the circle is a) b) c) 3 d) 2
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IIT 2004 |
02:47 min
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19 |
Which of the following functions is periodic? a) f(x) = x – [x] where [x] denotes the greatest integer less than or equal to the real number x b) f(x) = sin  x ≠ 0, f(0) = 0 c) f(x) = x cos x d) None of these
Which of the following functions is periodic? a) f(x) = x – [x] where [x] denotes the greatest integer less than or equal to the real number x b) f(x) = sin x ≠ 0, f(0) = 0 c) f(x) = x cos x d) None of these
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IIT 1983 |
01:19 min
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20 |
a)  b)  c) 1 d) 2
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IIT 1994 |
01:46 min
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21 |
Let a, b and c be three vectors having magnitudes 1, 1 and 2 respectively. If  then the acute angle between a and c is . . . . .
Let a, b and c be three vectors having magnitudes 1, 1 and 2 respectively. If then the acute angle between a and c is . . . . .
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IIT 1997 |
04:42 min
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22 |
The equation of the tangents drawn from the origin to the circle  are a) x= 6 b) y = 0 c)  d) 
The equation of the tangents drawn from the origin to the circle are a) x= 6 b) y = 0 c) d)
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IIT 1988 |
04:06 min
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23 |
Let f (x) be defined for all x > 0 and be continuous. If f (x) satisfies
f  = f (x) – f (y) for all x and y and f (e) = 1 then a) f (x) is bounded b) f  → 0 as x → 0 c) x f → 0 as x → 0 d) f (x) = lnx
Let f (x) be defined for all x > 0 and be continuous. If f (x) satisfies
f = f (x) – f (y) for all x and y and f (e) = 1 then a) f (x) is bounded b) f → 0 as x → 0 c) x f → 0 as x → 0 d) f (x) = lnx
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IIT 1995 |
02:06 min
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24 |
The value of  is equal to a)  b)  c)  d) None of these
The value of is equal to a) b) c) d) None of these
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IIT 1980 |
03:48 min
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25 |
The area bounded by the curve y = f(x), the X–axis and the ordinate x = 1 and x = b is (b – 1) sin (3b + 4). Then f(x) is a) (x – 1) cos (3x + 4) b) sin(3x + 4) c) sin(3x + 4) + 3(x – 1) cos (3x + 4) d) none of these
The area bounded by the curve y = f(x), the X–axis and the ordinate x = 1 and x = b is (b – 1) sin (3b + 4). Then f(x) is a) (x – 1) cos (3x + 4) b) sin(3x + 4) c) sin(3x + 4) + 3(x – 1) cos (3x + 4) d) none of these
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IIT 1983 |
01:13 min
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