|
676 |
If and , then find
|
IIT 1982 |
01:40 min
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|
677 |
The integral equals a)  b)  c) 1 d) 
The integral equals a)  b)  c) 1 d) 
|
IIT 2002 |
03:16 min
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|
678 |
The inequality |z – 4| < |z – 2| represents the region given by a) Re(z) ≥ 0 b) Re(z) < 0 c) Re(z) > 0 d) None of these
The inequality |z – 4| < |z – 2| represents the region given by a) Re(z) ≥ 0 b) Re(z) < 0 c) Re(z) > 0 d) None of these
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IIT 1982 |
01:58 min
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|
679 |
 a) True b) False
 a) True b) False
|
IIT 1988 |
03:38 min
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|
680 |
Coefficient of t24 in (1 + t2)12 (1 + t12) (1 + t24) is a)  b)  c)  d) 
Coefficient of t24 in (1 + t2)12 (1 + t12) (1 + t24) is a)  b)  c)  d) 
|
IIT 2003 |
03:19 min
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|
681 |
If f (x) = |x – 2| and g (x) = then for x > 20 a) 0 b) 1 c) 2 d) 4
If f (x) = |x – 2| and g (x) = then for x > 20 a) 0 b) 1 c) 2 d) 4
|
IIT 1990 |
01:14 min
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|
682 |
The value of the integral is a)  b)  c)  d) 
The value of the integral is a)  b)  c)  d) 
|
IIT 2004 |
02:02 min
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|
683 |
If tan A then  a) True b) False
If tan A then  a) True b) False
|
IIT 1980 |
01:00 min
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|
684 |
For a real y, let [y] denote the greatest integer less than or equal to y. Then the function is a) Discontinuous at some x b) Continuous at all x but the derivative does not exist for some x c) exists for all x but the derivative does not exist for some x d) exists for all x
For a real y, let [y] denote the greatest integer less than or equal to y. Then the function is a) Discontinuous at some x b) Continuous at all x but the derivative does not exist for some x c) exists for all x but the derivative does not exist for some x d) exists for all x
|
IIT 1981 |
02:16 min
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|
685 |
Show that 
Show that 
|
IIT 1981 |
01:28 min
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|
686 |
The position vectors of the point A, B, C, D are respectively. If the points A, B, C and D lie in a plane, find the value of λ.
The position vectors of the point A, B, C, D are respectively. If the points A, B, C and D lie in a plane, find the value of λ.
|
IIT 1986 |
03:41 min
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|
687 |
If k = then the numerical value of k is ………. a)  b)  c)  d) 
If k = then the numerical value of k is ………. a)  b)  c)  d) 
|
IIT 1993 |
02:32 min
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|
688 |
If f (a) = then the value of is a) – 5 b)  c) 5 d) None of these
If f (a) = then the value of is a) – 5 b)  c) 5 d) None of these
|
IIT 1983 |
01:55 min
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|
689 |
Evaluate  a)  b)  c)  d) 
|
IIT 1983 |
05:32 min
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|
690 |
Let A = . Determine a vector R satisfying and .
|
IIT 1990 |
03:53 min
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|
691 |
If a, b, c are in Arithmetic Progression then the straight line will pass through a fixed point whose coordinates are . . . . .
If a, b, c are in Arithmetic Progression then the straight line will pass through a fixed point whose coordinates are . . . . .
|
IIT 1984 |
01:35 min
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|
692 |
If then tan  a) True b) False
If then tan  a) True b) False
|
IIT 1979 |
01:42 min
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|
693 |
Let be non–coplanar unit vectors equally inclined to one another at an angle θ. If find p, q, r in terms of θ
Let be non–coplanar unit vectors equally inclined to one another at an angle θ. If find p, q, r in terms of θ
|
IIT 1997 |
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|
694 |
If is the unit vector along the incident ray, is a unit vector along the reflected ray and is a unit vector along the outward drawn normal to the plane mirror at the point of incidence. Find in terms of and 
|
IIT 2005 |
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|
695 |
True / False For any three vectors a, b and c a) True b) False
True / False For any three vectors a, b and c a) True b) False
|
IIT 1989 |
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|
696 |
Multiple choices For a positive integer n, let . . . then a)  b)  c)  d) 
Multiple choices For a positive integer n, let . . . then a)  b)  c)  d) 
|
IIT 1999 |
|
|
697 |
For all ,  a) True b) False
For all ,  a) True b) False
|
IIT 1981 |
|
|
698 |
Let f (x) = |x – 1| then a) f (x2) = |f (x)|2 b) f (x + y) = f (x) + f (y) c) f ( ) = |f (x)| d) None of these
Let f (x) = |x – 1| then a) f (x2) = |f (x)|2 b) f (x + y) = f (x) + f (y) c) f ( ) = |f (x)| d) None of these
|
IIT 1983 |
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|
699 |
Let the vectors represent the edges of a regular hexagon Statement 1 - because Statement 2 -  a) Statement 1 and 2 are true and Statement 2 is a correct explanation of statement 1. b) Statement 1 and 2 are true and Statement 2 is not a correct explanation of statement 1. c) Statement 1 is true. Statement 2 is false. d) Statement 1 is false. Statement 2 is true.
Let the vectors represent the edges of a regular hexagon Statement 1 - because Statement 2 -  a) Statement 1 and 2 are true and Statement 2 is a correct explanation of statement 1. b) Statement 1 and 2 are true and Statement 2 is not a correct explanation of statement 1. c) Statement 1 is true. Statement 2 is false. d) Statement 1 is false. Statement 2 is true.
|
IIT 2007 |
|
|
700 |
Find the smallest possible value of p for which the equation a)  b)  c)  d) 
Find the smallest possible value of p for which the equation a)  b)  c)  d) 
|
IIT 1995 |
|