|
676 |
Show that 
Show that
|
IIT 1982 |
01:38 min
|
|
677 |
If a, b, c are coplanar, show that
If a, b, c are coplanar, show that
|
IIT 1989 |
02:38 min
|
|
678 |
 is the reflexion of  in the line whose equation is . .
is the reflexion of in the line whose equation is . .
|
IIT 1982 |
00:57 min
|
|
679 |
Use mathematical induction to prove that  is divisible by 24 for all n > 0.
Use mathematical induction to prove that is divisible by 24 for all n > 0.
|
IIT 1985 |
03:43 min
|
|
680 |
If  Where [x] denotes the greatest integer less than or equal to x then  equals a) 1 b) 0 c) – 1 d) None of these
If Where [x] denotes the greatest integer less than or equal to x then equals a) 1 b) 0 c) – 1 d) None of these
|
IIT 1985 |
02:39 min
|
|
681 |
Evaluate  a)  b)  c)  d) 
|
IIT 1984 |
03:38 min
|
|
682 |
Given the points A (0, 4) and B (0, - 4) the equation of the locus of the point P (x, y) such that |AP – BP| = 6 is . . . . .
Given the points A (0, 4) and B (0, - 4) the equation of the locus of the point P (x, y) such that |AP – BP| = 6 is . . . . .
|
IIT 1983 |
05:23 min
|
|
683 |
The solution of  is a)  b)  c)  d) None of these
The solution of is a) b) c) d) None of these
|
IIT 1981 |
01:11 min
|
|
684 |
Let [.] denotes the greatest integer function and f(x) =  then a)  does not exist b) f (x) is continuous at x = 0 c) f (x) is not differentiable at x = 0 d) 
Let [.] denotes the greatest integer function and f(x) = then a) does not exist b) f (x) is continuous at x = 0 c) f (x) is not differentiable at x = 0 d)
|
IIT 1993 |
01:28 min
|
|
685 |
Evaluate  a)  b)  c)  d) 
|
IIT 1988 |
06:04 min
|
|
686 |
Two circles  and  are given. Then the equation of the circle through their points of intersection and the point (1, 1) is a)  b)  c)  d) None of these
Two circles and are given. Then the equation of the circle through their points of intersection and the point (1, 1) is a) b) c) d) None of these
|
IIT 1980 |
02:25 min
|
|
687 |
If n be a positive integer such that
 then a)  b)  c)  d) 
If n be a positive integer such that
then a) b) c) d)
|
IIT 1994 |
03:42 min
|
|
688 |
 is
a) 2 b) – 2 c)  d) 
|
IIT 1999 |
03:16 min
|
|
689 |
Evaluate  a)  b)  c)  d) 
|
IIT 1991 |
09:59 min
|
|
690 |
Which of the following are rational? a)  b)  c)  d) 
Which of the following are rational? a) b) c) d)
|
IIT 1998 |
02:53 min
|
|
691 |
Using mathematical induction prove that
Using mathematical induction prove that
|
IIT 1993 |
08:39 min
|
|
692 |
For x ε R,  is equal to a) e b)  c)  d) 
For x ε R, is equal to a) e b) c) d)
|
IIT 2000 |
06:08 min
|
|
693 |
True/False If  for some non zero vector X then  a) True b) False
True/False If for some non zero vector X then a) True b) False
|
IIT 1983 |
|
|
694 |
If  then  a) True b) False
If then a) True b) False
|
IIT 1979 |
|
|
695 |
Let  and  where O, A and B are non-collinear points. Let p denote the area of the quadrilateral OABC and let q denote the area of the quadrilateral with OA and OC as adjacent sides. If p = kq then k = . . . . .
Let and where O, A and B are non-collinear points. Let p denote the area of the quadrilateral OABC and let q denote the area of the quadrilateral with OA and OC as adjacent sides. If p = kq then k = . . . . .
|
IIT 1997 |
|
|
696 |
Prove that  = 2[cosx + cos3x + cos5x + … + cos(2k−1)x] for any positive integer k. Hence prove that  = 
|
IIT 1990 |
|
|
697 |
The function
f(x) =|px – q| + r |x|, x ε (− , )
where p > 0, q > 0, r > 0 assumes minimum value on one point if a) p ≠ q b) r = q c) r ≠ p d) r = p = q
The function
f(x) =|px – q| + r |x|, x ε (−, )
where p > 0, q > 0, r > 0 assumes minimum value on one point if a) p ≠ q b) r = q c) r ≠ p d) r = p = q
|
IIT 1995 |
|
|
698 |
Let f : R → R be any function defined g : R → R by g (x) = |f (x)| for all x. Then g is a) onto if f is onto b) one to one if f is one to one c) continuous if f is continuous d) differentiable if f is differentiable
Let f : R → R be any function defined g : R → R by g (x) = |f (x)| for all x. Then g is a) onto if f is onto b) one to one if f is one to one c) continuous if f is continuous d) differentiable if f is differentiable
|
IIT 2000 |
|
|
699 |
If f : [ 1,  → [ 2,  ] is given by f (x) = x +  then  ( x ) is given by a)  b)  c)  d) 1 + 
|
IIT 2001 |
|
|
700 |
The function of f : R → R be defined by f (x) = 2x + sinx for x ε R . Then f is a) one-one and onto b) one-one but not onto c) onto but not one-one d) neither one-one nor onto
The function of f : R → R be defined by f (x) = 2x + sinx for x ε R . Then f is a) one-one and onto b) one-one but not onto c) onto but not one-one d) neither one-one nor onto
|
IIT 2002 |
|
