|
676 |
Multiple choices If x + |y| = 2y, then y as a function of x is a) Defined for all real x b) Continuous at x = 0 c) Differentiable for all x d) Such that  for x < 0
Multiple choices If x + |y| = 2y, then y as a function of x is a) Defined for all real x b) Continuous at x = 0 c) Differentiable for all x d) Such that for x < 0
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IIT 1984 |
03:53 min
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|
677 |
The value of the integral  is equal to a a) True b) False
The value of the integral is equal to a a) True b) False
|
IIT 1988 |
01:46 min
|
|
678 |
A unit vector coplanar with  and  and perpendicular to  is . . . . .
|
IIT 1992 |
04:49 min
|
|
679 |
The centre of the circle inscribed in the square formed by the lines  and  a) (4, 7) b) (7, 4) c) (9, 4) d) (4, 9)
The centre of the circle inscribed in the square formed by the lines and a) (4, 7) b) (7, 4) c) (9, 4) d) (4, 9)
|
IIT 2003 |
02:21 min
|
|
680 |
Find the number of solutions of  a) 0 b) 1 c) 2 d) Infinitely many
Find the number of solutions of a) 0 b) 1 c) 2 d) Infinitely many
|
IIT 1982 |
02:37 min
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|
681 |
The domain of definition of the function
y =  +  a) (−3, −2) excluding −2.5 b) [0, 1] excluding 0.5 c) [−2, 1) excluding 0 d) None of these
The domain of definition of the function
y = + a) (−3, −2) excluding −2.5 b) [0, 1] excluding 0.5 c) [−2, 1) excluding 0 d) None of these
|
IIT 1983 |
01:30 min
|
|
682 |
Multiple choices Let g(x) be a function defined on  If the area of the equilateral triangle with two of its vertices at (0, 0) and (x, g (x)) is  then the function g (x) is a)  b)  c)  d) 
Multiple choices Let g(x) be a function defined on If the area of the equilateral triangle with two of its vertices at (0, 0) and (x, g (x)) is then the function g (x) is a) b) c) d)
|
IIT 1989 |
02:18 min
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|
683 |
The value of  is
The value of is
|
IIT 1993 |
08:21 min
|
|
684 |
Ten different letters of an alphabet are given. Words with five letters are formed from the given letters. Then the number of words which have at least one letter repeated is a) 69760 b) 30240 c) 99748 d) None of these
Ten different letters of an alphabet are given. Words with five letters are formed from the given letters. Then the number of words which have at least one letter repeated is a) 69760 b) 30240 c) 99748 d) None of these
|
IIT 1980 |
04:41 min
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|
685 |
Let a, b, c be non-zero real numbers such that
Then the quadratic function  has a) no root in (0, 2) b) at least one root in (1, 2) c) a double root in (0, 2) d) two imaginary roots
Let a, b, c be non-zero real numbers such that
Then the quadratic function has a) no root in (0, 2) b) at least one root in (1, 2) c) a double root in (0, 2) d) two imaginary roots
|
IIT 1981 |
04:42 min
|
|
686 |
Prove that the value of the function  do not lie between  and 3 for any real x. a) True b) False
Prove that the value of the function do not lie between and 3 for any real x. a) True b) False
|
IIT 1997 |
03:31 min
|
|
687 |
If g (f (x)) = |sin x| and f (g (x)) = (sin )2, then a) f (x) = sin2 x, g (x) = b) f (x) = sin x, g (x) =  c) f (x) = x2, g (x) = sin d) f and g cannot be determined
If g (f (x)) = |sin x| and f (g (x)) = (sin)2, then a) f (x) = sin2 x, g (x) = b) f (x) = sin x, g (x) = c) f (x) = x2, g (x) = sin d) f and g cannot be determined
|
IIT 1998 |
01:19 min
|
|
688 |
Evaluate  a) 0 b)  c)  d) 1
|
IIT 1978 |
01:58 min
|
|
689 |
If  then  equals a)  b)  c)  d) None of these
If then equals a) b) c) d) None of these
|
IIT 1998 |
03:14 min
|
|
690 |
Let  be a polynomial in a real variable x with 0 < then the function p(x) has a) neither maximum nor minimum b) only one maximum c) only one minimum d) only one maximum and only one minimum e) none of these
Let be a polynomial in a real variable x with 0< then the function p(x) has a) neither maximum nor minimum b) only one maximum c) only one minimum d) only one maximum and only one minimum e) none of these
|
IIT 1986 |
02:37 min
|
|
691 |
Let a given line L1 intersect the X-axis and Y-axis at P and Q respectively. Let another line L2 perpendicular to L1 cut the X and Y axis at R and S respectively. Show that the locus of the point of intersection of the lines PS and QR is a circle passing through the origin.
Let a given line L1 intersect the X-axis and Y-axis at P and Q respectively. Let another line L2 perpendicular to L1 cut the X and Y axis at R and S respectively. Show that the locus of the point of intersection of the lines PS and QR is a circle passing through the origin.
|
IIT 1987 |
07:55 min
|
|
692 |
Fill in the blank
General values of θ satisfying the equation  are a) θ = nπ b)  c)  d) θ = nπ or θ = 
Fill in the blank
General values of θ satisfying the equation are a) θ = nπ b) c) d) θ = nπ or θ =
|
IIT 1996 |
02:28 min
|
|
693 |
The real roots of the equation  x +  = 1 in the interval (−π, π) are …........... a) x = 0 b) x = ±  c) x = 0 , x = ±
The real roots of the equation x + = 1 in the interval (−π, π) are …........... a) x = 0 b) x = ± c) x = 0 , x = ±
|
IIT 1997 |
|
|
694 |
The domain of the derivative of the function
f (x) =  a) R  { 0 } b) R  c) R  d) R 
The domain of the derivative of the function
f (x) = a) R { 0 } b) R c) R d) R
|
IIT 2002 |
|
|
695 |
The greater of the two angles
 and  is a) A b) B c) Both are equal
The greater of the two angles
and is a) A b) B c) Both are equal
|
IIT 1989 |
|
|
696 |
If f (x) = sinx + cosx, g (x) = x2 – 1 then g ( f (x)) is invertible in the domain a)  b)  c)  d) 
If f (x) = sinx + cosx, g (x) = x2 – 1 then g ( f (x)) is invertible in the domain a) b) c) d)
|
IIT 2004 |
|
|
697 |
One or more correct answers
In a triangle the length of the two larger sides are 10 and 9 respectively. If the angles are in arithmetic progression then the length of the third side can be a)  b)  c) 5 d)  e) None of these
One or more correct answers
In a triangle the length of the two larger sides are 10 and 9 respectively. If the angles are in arithmetic progression then the length of the third side can be a) b) c) 5 d) e) None of these
|
IIT 1987 |
|
|
698 |
Let f (x) = Ax2 + Bx + C where A, B , C are real numbers. Prove that if f (x) is an integer then the numbers 2A, A + B and C are all integers. Conversely prove that if the numbers 2A, A + B and C are all integers then f ( x ) is an integer whenever x is an integer.
Let f (x) = Ax2 + Bx + C where A, B , C are real numbers. Prove that if f (x) is an integer then the numbers 2A, A + B and C are all integers. Conversely prove that if the numbers 2A, A + B and C are all integers then f ( x ) is an integer whenever x is an integer.
|
IIT 1998 |
|
|
699 |
A ladder rests against a wall at an angle α to the horizontal. If its foot is pulled away from the wall through a distance a, so that it slides a distance b down the wall making an angle β with the horizontal, then  . a) True b) False
A ladder rests against a wall at an angle α to the horizontal. If its foot is pulled away from the wall through a distance a, so that it slides a distance b down the wall making an angle β with the horizontal, then . a) True b) False
|
IIT 1985 |
|
|
700 |
Let  be the vertices of an n sided regular polygon such that  . Then find n. a) 5 b) 6 c) 7 d) 8
Let be the vertices of an n sided regular polygon such that . Then find n. a) 5 b) 6 c) 7 d) 8
|
IIT 1994 |
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