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701 |
A normal is drawn at a point  of a curve meeting X-axis at Q. If PQ is of constant length k, then show that the differential equation of the curve is 
A normal is drawn at a point of a curve meeting X-axis at Q. If PQ is of constant length k, then show that the differential equation of the curve is
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IIT 1994 |
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702 |
If f(x) = 3x – 5 then  a) is given by  b) is given by  c) does not exist because f is not one-one d) does not exist because f is not onto
If f(x) = 3x – 5 then a) is given by b) is given by c) does not exist because f is not one-one d) does not exist because f is not onto
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IIT 1998 |
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703 |
Find the integral solutions of the following system of inequality
 a) x = 1 b) x = 2 c) x = 3 d) x = 4
Find the integral solutions of the following system of inequality
a) x = 1 b) x = 2 c) x = 3 d) x = 4
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IIT 1979 |
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704 |
Area bounded by  and 
Area bounded by and
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IIT 2006 |
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705 |
mn squares of equal size are arranged to form a rectangle of dimension m by n, where m and n are natural numbers. Two squares will be called neighbours if they have exactly one common side. A natural number is written in each square such that the number written in any square is the arithmetic mean of the numbers written in the neighbouring squares. Show that this is possible only if all the numbers used are equal.
mn squares of equal size are arranged to form a rectangle of dimension m by n, where m and n are natural numbers. Two squares will be called neighbours if they have exactly one common side. A natural number is written in each square such that the number written in any square is the arithmetic mean of the numbers written in the neighbouring squares. Show that this is possible only if all the numbers used are equal.
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IIT 1982 |
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706 |
Let A = 
AU1 =  , AU2 =  and AU3 = 
 a) 3 b) −3 c)  d) 2
Let A =
AU1 = , AU2 = and AU3 =
a) 3 b) −3 c) d) 2
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IIT 2006 |
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707 |
The domain of definition of  is a)  b)  c)  d) 
The domain of definition of is a) b) c) d)
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IIT 2001 |
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708 |
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
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IIT 2002 |
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709 |
Range of  ; x  ℝ is a) (1, ∞) b)  c)  d) 
Range of ; x ℝ is a) (1, ∞) b) c) d)
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IIT 2003 |
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710 |
Let a, b, c, ε R and α, β be roots of  such that  and  then show that  .
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IIT 1995 |
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711 |
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
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IIT 2006 |
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712 |
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
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IIT 1980 |
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713 |
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.
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IIT 1988 |
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714 |
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
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IIT 1988 |
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715 |
If  then the domain of f(x) is
If then the domain of f(x) is
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IIT 1985 |
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716 |
The real numbers x1, x2, x3 satisfying the equation x3 – x2 + βx + γ = 0 are in Arithmetic Progression. Find the interval in which β and γ lie.
The real numbers x1, x2, x3 satisfying the equation x3 – x2 + βx + γ = 0 are in Arithmetic Progression. Find the interval in which β and γ lie.
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IIT 1996 |
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717 |
Let p, q, r be three mutually perpendicular vectors of the same magnitude. If x satisfies the equation p  ((x – q) p) + q ((x – r) q) + r ((x – p) r) = 0 then x is given by a)  b)  c)  d) 
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IIT 1997 |
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718 |
Let f(x) be a non constant differentiable function defined on (−∞, ∞) such that f(x) = f(1 – x) and  then a)  vanishes at twice an (0, 1) b)  c)  d) 
Let f(x) be a non constant differentiable function defined on (−∞, ∞) such that f(x) = f(1 – x) and then a) vanishes at twice an (0, 1) b) c) d)
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IIT 2008 |
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|
719 |
Let  and a unit vector c be coplanar. If c is perpendicular to a then c is equal to a)  b)  c)  d) 
Let and a unit vector c be coplanar. If c is perpendicular to a then c is equal to a) b) c) d)
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IIT 1999 |
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720 |
Number of solutions of  lying in the interval  is a) 0 b) 1 c) 2 d) 3
Number of solutions of lying in the interval is a) 0 b) 1 c) 2 d) 3
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IIT 1993 |
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721 |
If three complex numbers are in Arithmetic Progression, then they lie on a circle in a complex plane. a) True b) False
If three complex numbers are in Arithmetic Progression, then they lie on a circle in a complex plane. a) True b) False
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IIT 1985 |
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722 |
Multiple choice The vector  is a) A unit vector b) Makes an angle  with the vector  c) Parallel to vector  d) Perpendicular to the vector 
Multiple choice The vector is a) A unit vector b) Makes an angle with the vector c) Parallel to vector d) Perpendicular to the vector
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IIT 1994 |
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723 |
A1, A2, …… , An are the vertices of a regular polygon with n sides and O is the centre. Show that
A1, A2, …… , An are the vertices of a regular polygon with n sides and O is the centre. Show that
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IIT 1982 |
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|
724 |
If A, B, C are such that |B| = |C|. Prove that 
If A, B, C are such that |B| = |C|. Prove that
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IIT 1997 |
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725 |
Let u and v be unit vectors. If w is a vector such that  , then prove that  and that equality holds if and only if  is perpendicular to 
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IIT 1999 |
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