|
676 |
Fill in the blank
If f (x) = sin ln  then the domain of f (x) is …………. a) (−2, −1) b) (−2, 1) c) (0, 1) d) (1, ∞)
Fill in the blank
If f (x) = sin ln then the domain of f (x) is …………. a) (−2, −1) b) (−2, 1) c) (0, 1) d) (1, ∞)
|
IIT 1985 |
01:25 min
|
|
677 |
If x, y, z are real and distinct then
8u = 
is always a) Non–negative b) Non–positive c) Zero d) None of these
If x, y, z are real and distinct then
8u =
is always a) Non–negative b) Non–positive c) Zero d) None of these
|
IIT 1979 |
02:14 min
|
|
678 |
If  are any real numbers and n is any positive integer then a)  b)  c)  d) none of these
If are any real numbers and n is any positive integer then a) b) c) d) none of these
|
IIT 1982 |
01:04 min
|
|
679 |
Let a + b + c = 0, then the quadratic equation  has a) at least one root in (0, 1) b) one root in (2, 3) and the other in  c) imaginary roots d) none of these
Let a + b + c = 0, then the quadratic equation has a) at least one root in (0, 1) b) one root in (2, 3) and the other in c) imaginary roots d) none of these
|
IIT 1983 |
02:32 min
|
|
680 |
If α and β are roots of  and  are roots of  then the equation  has always a) Two real roots b) Two positive roots c) Two negative roots d) One positive and one negative root
If α and β are roots of and are roots of then the equation has always a) Two real roots b) Two positive roots c) Two negative roots d) One positive and one negative root
|
IIT 1989 |
04:41 min
|
|
681 |
The number of points of intersection of the two curves y = 2sinx and y =  is a) 0 b) 1 c) 2 d) 
The number of points of intersection of the two curves y = 2sinx and y = is a) 0 b) 1 c) 2 d)
|
IIT 1994 |
01:51 min
|
|
682 |
The roots of the equation  are real and less than 3, then a) a < 2 b) 2 < a < 3 c) 3 ≤ a ≤ 4 d) a > 4
The roots of the equation are real and less than 3, then a) a < 2 b) 2 < a < 3 c) 3 ≤ a ≤ 4 d) a > 4
|
IIT 1999 |
02:39 min
|
|
683 |
Let f(x) =  and m(b) be the minimum value of f(x). As b varies, range of m(b) is a)  b) [ 0,  c) [  d) 
Let f(x) = and m(b) be the minimum value of f(x). As b varies, range of m(b) is a) b) [ 0, c) [ d)
|
IIT 2001 |
03:22 min
|
|
684 |
The set of all real numbers x for which  is a)  b)  c)  d) 
The set of all real numbers x for which is a) b) c) d)
|
IIT 2002 |
03:01 min
|
|
685 |
If one root is square of the other root of the equation  then the relation between p and q is a)  b)  c)  d) 
If one root is square of the other root of the equation then the relation between p and q is a) b) c) d)
|
IIT 2004 |
03:14 min
|
|
686 |
If a ≠ p, b ≠ q, c ≠ r and
 = 0 Then find the value of
 +  +  a) 0 b) 1 c) 2 d) 3
If a ≠ p, b ≠ q, c ≠ r and
= 0 Then find the value of
+ + a) 0 b) 1 c) 2 d) 3
|
IIT 1991 |
03:41 min
|
|
687 |
The number of solutions of the pair of equations
 
in the interval [ 0, 2π ] is
a) 0 b) 1 c) 2 d) 4
The number of solutions of the pair of equations
in the interval [ 0, 2π ] is
a) 0 b) 1 c) 2 d) 4
|
IIT 2007 |
07:12 min
|
|
688 |
The equation  has a) At least one real solution b) Exactly three real solutions c) Has exactly one irrational solution d) Complex roots
The equation has a) At least one real solution b) Exactly three real solutions c) Has exactly one irrational solution d) Complex roots
|
IIT 1989 |
03:53 min
|
|
689 |
Show that for for any triangle with sides a, b, c
3 (ab + bc + ac) ≤ (a + b + c)2 < 4 (ab + bc + ca)
Show that for for any triangle with sides a, b, c
3 (ab + bc + ac) ≤ (a + b + c)2 < 4 (ab + bc + ca)
|
IIT 1979 |
03:38 min
|
|
690 |
The solution set of equation  = 0 is ………. a) {0} b) {1, 2} c) {−1, 2} d) {−1, −2}
The solution set of equation = 0 is ………. a) {0} b) {1, 2} c) {−1, 2} d) {−1, −2}
|
IIT 1981 |
02:12 min
|
|
691 |
The equation  has a) no real solutions b) one real solution c) two real solutions d) infinite real solutions
The equation has a) no real solutions b) one real solution c) two real solutions d) infinite real solutions
|
IIT 1982 |
03:09 min
|
|
692 |
For positive numbers x, y and z the numerical value of the determinant
 is ……….. a) 1 b) –1 c) ±1 d) 0
For positive numbers x, y and z the numerical value of the determinant
is ……….. a) 1 b) –1 c) ±1 d) 0
|
IIT 1993 |
02:04 min
|
|
693 |
The domain of definition of  is a)  b)  c)  d) 
The domain of definition of is a) b) c) d)
|
IIT 2001 |
|
|
694 |
Let f : ℝ → ℝ be defined by f(x) = 2x + sinx for all x  ℝ. Then f is a) One to one and onto b) One to one but not onto c) Onto but not one to one d) Neither one to one nor onto
Let f : ℝ → ℝ be defined by f(x) = 2x + sinx for all x ℝ. Then f is a) One to one and onto b) One to one but not onto c) Onto but not one to one d) Neither one to one nor onto
|
IIT 2002 |
|
|
695 |
Range of  ; x  ℝ is a) (1, ∞) b)  c)  d) 
Range of ; x ℝ is a) (1, ∞) b) c) d)
|
IIT 2003 |
|
|
696 |
If  where 
 . Given F(5) = 5, then f(10) is equal to a) 5 b) 10 c) 0 d) 15
If where
. Given F(5) = 5, then f(10) is equal to a) 5 b) 10 c) 0 d) 15
|
IIT 2006 |
|
|
697 |
Subjective problems
Let  . Find all real values of x for which y takes real values. a) [− 1, 2) b) [3, ∞) c) [− 1, 2) ∪ [3, ∞) d) None of the above
Subjective problems
Let . Find all real values of x for which y takes real values. a) [− 1, 2) b) [3, ∞) c) [− 1, 2) ∪ [3, ∞) d) None of the above
|
IIT 1980 |
|
|
698 |
Let R be the set of real numbers and f : R → R be such that for all x and y in R,  . Prove that f(x) is constant.
Let R be the set of real numbers and f : R → R be such that for all x and y in R, . Prove that f(x) is constant.
|
IIT 1988 |
|
|
699 |
If f1(x) and f2(x) are defined by domains D1 and D2 respectively then f1(x) + f2(x) is defined as on D1 ⋂ D2 a) True b) False
If f1(x) and f2(x) are defined by domains D1 and D2 respectively then f1(x) + f2(x) is defined as on D1 ⋂ D2 a) True b) False
|
IIT 1988 |
|
|
700 |
If  then the domain of f(x) is
If then the domain of f(x) is
|
IIT 1985 |
|
