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701 |
Prove that  = 2[cosx + cos3x + cos5x + … + cos(2k−1)x] for any positive integer k. Hence prove that  = 
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IIT 1990 |
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702 |
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
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IIT 1995 |
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703 |
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
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IIT 2000 |
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704 |
If f : [ 1,  → [ 2,  ] is given by f (x) = x +  then  ( x ) is given by a)  b)  c)  d) 1 + 
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IIT 2001 |
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705 |
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
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IIT 2002 |
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706 |
Multiple choice There exists a triangle ABC satisfying the conditions a) bsinA = a, A < b) bsinA > a, A > c) bsinA > a, A < d) bsinA < a, A <, b > a e) bsinA < a, A >, b = a
Multiple choice There exists a triangle ABC satisfying the conditions a) bsinA = a, A < b) bsinA > a, A > c) bsinA > a, A < d) bsinA < a, A <, b > a e) bsinA < a, A >, b = a
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IIT 1986 |
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707 |
With usual notation if in a triangle ABC,  then  .
a) True b) False
With usual notation if in a triangle ABC, then . a) True b) False
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IIT 1984 |
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708 |
If in a triangle ABC, cosA cosB + sinA sinB sin C = 1 then show that a : b : c = 1 : 1 :  a) True b) False
If in a triangle ABC, cosA cosB + sinA sinB sin C = 1 then show that a : b : c = 1 : 1 : a) True b) False
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IIT 1986 |
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709 |
If the lines  and  intersect then the value of k is a)  b)  c)  d) 
If the lines and intersect then the value of k is a) b) c) d)
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IIT 2004 |
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710 |
The area of a triangle whose vertices are
 is
The area of a triangle whose vertices are
is
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IIT 1983 |
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711 |
The parameter on which the value of the determinant
Δ = 
does not depend upon is a) a b) p c) d d) x
The parameter on which the value of the determinant
Δ =
does not depend upon is a) a b) p c) d d) x
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IIT 1997 |
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712 |
Consider the lines  ;
The unit vector perpendicular to both L1 and L2 is
a)  b)  c)  d) 
Consider the lines ;
The unit vector perpendicular to both L1 and L2 is a) b) c) d)
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IIT 2008 |
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713 |
If b > a then the equation ( x – a ) ( x – b ) 1 = 0 has a) Both roots in [ a, b ] b) Both roots in (  , a ) c) Both roots in (  ) d) One root in ( , a ) and other in ( )
If b > a then the equation ( x – a ) ( x – b )1 = 0 has a) Both roots in [ a, b ] b) Both roots in ( , a ) c) Both roots in ( ) d) One root in ( , a ) and other in ( )
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IIT 2000 |
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714 |
For what value of m does the system of equations 3x + my = m, 2x − 5y = 20 have a solution satisfying the condition x > 0, y > 0. a) m  (−∞, ∞) b) m (−∞, −15) ∪ (30, ∞) c)  d) 
For what value of m does the system of equations 3x + my = m, 2x − 5y = 20 have a solution satisfying the condition x > 0, y > 0. a) m (−∞, ∞) b) m (−∞, −15) ∪ (30, ∞) c) d)
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IIT 1979 |
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715 |
If α is a repeated root of a quadratic equation f(x) = 0 and A(x), B(x), C(x) be polynomials of degree 3, 4, 5 respectively, Then show that
 is divisible by f(x) where prime denotes the derivatives.
If α is a repeated root of a quadratic equation f(x) = 0 and A(x), B(x), C(x) be polynomials of degree 3, 4, 5 respectively, Then show that
is divisible by f(x) where prime denotes the derivatives.
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IIT 1984 |
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716 |
The differential equation  determines a family of circles with a) Variable radii and a fixed centre ( 0, 1) b) Variable radii and a fixed centre ( 0, -1) c) Fixed radius and a variable centre along the X-axis d) Fixed radius and a variable centre along the Y-axis
The differential equation determines a family of circles with a) Variable radii and a fixed centre ( 0, 1) b) Variable radii and a fixed centre ( 0, -1) c) Fixed radius and a variable centre along the X-axis d) Fixed radius and a variable centre along the Y-axis
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IIT 2007 |
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717 |
Prove that for all values of θ
 = 0
Prove that for all values of θ
= 0
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IIT 2000 |
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718 |
If  and  , then show that
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IIT 1989 |
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719 |
A =  , B =  , U =  , V =  If AX = U has infinitely many solutions, prove that BX = V has no unique solution. Also prove that if afd ≠ 0 then BX = V has no solution. X is a vector.
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IIT 2004 |
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720 |
If  , for every real number x, then the minimum value of f a) does not exist because f is unbounded b) is not attained even though f is bounded c) is equal to 1 d) is equal to –1
If , for every real number x, then the minimum value of f a) does not exist because f is unbounded b) is not attained even though f is bounded c) is equal to 1 d) is equal to –1
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IIT 1998 |
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721 |
Let u (x) and v (x) satisfy the differential equations  and  where p (x), f (x) and g (x) are continuous functions. If  u (x1) > v (x1) for some x1 and f (x) > g (x) for all x > x1, prove that at any point (x, y) where x > x1 does not satisfy the equations y = u (x) and y = v (x)
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IIT 1997 |
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722 |
The function  is defined by  then  is a)  b)  c)  d) None of these
The function is defined by then is a) b) c) d) None of these
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IIT 1999 |
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723 |
 is
is
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IIT 2006 |
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724 |
Suppose  for x ≥  . If g(x) is the function whose graph is the reflection of f(x) with respect to the line y = x then g(x) equals a)  b)  c)  d) 
Suppose for x ≥ . If g(x) is the function whose graph is the reflection of f(x) with respect to the line y = x then g(x) equals a) b) c) d)
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IIT 2002 |
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725 |
Domain of definition of the function  for real values of x is a)  b)  c)  d) 
Domain of definition of the function for real values of x is a) b) c) d)
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IIT 2003 |
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