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1001

Let a, r, s, t be non-zero real numbers. Let P(at2, 2at), Q, R(ar2, 2ar and S(as2, 2as) be distinct points on the parabola y2 = 4ax. Suppose PQ is the focal chord and QR and PK are parallel, where K is point (2a, 0)If st = 1 then the tangent at P and normal at S to the parabola meet at a point whose ordinate is

a) (t2+1)22t3

b) a(t2+1)22t3

c) a(t2+1)2r3

d) a(t2+2)2r3

Let a, r, s, t be non-zero real numbers. Let P(at2, 2at), Q, R(ar2, 2ar and S(as2, 2as) be distinct points on the parabola y2 = 4ax. Suppose PQ is the focal chord and QR and PK are parallel, where K is point (2a, 0)If st = 1 then the tangent at P and normal at S to the parabola meet at a point whose ordinate is

a) (t2+1)22t3

b) a(t2+1)22t3

c) a(t2+1)2r3

d) a(t2+2)2r3

IIT 2014
1002

The tangent PT and the normal PN of the parabola y2 = 4ax at the point P on it meet its axis at the points T and N respectively. The locus of the centroid of the triangle PTM is a parabola whose

a) Vertex is (2a3,0)

b) Directrix is x = 0

c) Latus rectum is 2a3

d) Focus is (a, 0)

The tangent PT and the normal PN of the parabola y2 = 4ax at the point P on it meet its axis at the points T and N respectively. The locus of the centroid of the triangle PTM is a parabola whose

a) Vertex is (2a3,0)

b) Directrix is x = 0

c) Latus rectum is 2a3

d) Focus is (a, 0)

IIT 2009
1003

A rectangle with sides (2m – 1) and (2n – 1) is divided into squares of unit length by drawing parallel lines. Then the number of rectangles possible with odd side lengths is

a) mn (m + 1)(n + 1)

b)

c)

d)

A rectangle with sides (2m – 1) and (2n – 1) is divided into squares of unit length by drawing parallel lines. Then the number of rectangles possible with odd side lengths is

a) mn (m + 1)(n + 1)

b)

c)

d)

IIT 2005
1004

If the normal to the curve y = f(x) at the point (3, 4) makes an angle  with the positive X–axis then

a) – 1

b)

c)

d) 1

If the normal to the curve y = f(x) at the point (3, 4) makes an angle  with the positive X–axis then

a) – 1

b)

c)

d) 1

IIT 2000
1005

A circle passes through points A, B and C with the line segment AC as its diameter. A line passing through A intersects the chord BC at D inside the circle. If ∠DAB and ∠CAB are α and β respectively and the distance between the point A and the midpoint of the line segment DC is d, prove that the area of the circle is
 

A circle passes through points A, B and C with the line segment AC as its diameter. A line passing through A intersects the chord BC at D inside the circle. If ∠DAB and ∠CAB are α and β respectively and the distance between the point A and the midpoint of the line segment DC is d, prove that the area of the circle is
 

IIT 1996
1006

Domain of definition of the function f (x) =  for real valued x is

a)

b)

c)

d)

Domain of definition of the function f (x) =  for real valued x is

a)

b)

c)

d)

IIT 2003
1007

Find the values of a and b, so that the functions

 

Is continuous for 0 ≤ x ≤ π

a)

b)

c)

d)

Find the values of a and b, so that the functions

 

Is continuous for 0 ≤ x ≤ π

a)

b)

c)

d)

IIT 1989
1008

C1 and C2 are two concentric circles, the radius of C2 being twice of C1 . From a point on C2 tangents PA and PB are drawn to C1. Prove that the centroid of ΔPAB lies on C1.

C1 and C2 are two concentric circles, the radius of C2 being twice of C1 . From a point on C2 tangents PA and PB are drawn to C1. Prove that the centroid of ΔPAB lies on C1.

IIT 1998
1009

In [0, 1], Lagrange’s Mean Value theorem is not applicable to

a)

b)

c)

d)

In [0, 1], Lagrange’s Mean Value theorem is not applicable to

a)

b)

c)

d)

IIT 2003
1010

Let α ε ℝ, then a function f : ℝ → ℝ is differentiable at α if and only if there is a function g : ℝ → ℝ which is continuous at α and satisfies f(x) – f(α) = g(x) (x – α) for all x ε ℝ.

a) True

b) False

Let α ε ℝ, then a function f : ℝ → ℝ is differentiable at α if and only if there is a function g : ℝ → ℝ which is continuous at α and satisfies f(x) – f(α) = g(x) (x – α) for all x ε ℝ.

a) True

b) False

IIT 2001
1011

The area bounded by the angle bisectors of the lines

x2 – y2 + 2y = 1 and the line x + y = 3 is

a) 2

b) 3

c) 4

d) 6

The area bounded by the angle bisectors of the lines

x2 – y2 + 2y = 1 and the line x + y = 3 is

a) 2

b) 3

c) 4

d) 6

IIT 2004
1012

If two functions f and g satisfy the given conditions  x, y ε ℝ, f(x – y) = f(x)g(y) – f(y)g(x) and g(x – y) = g(x) . g(y) + f(x) . f(y).

If the RHD at x = 0 exists for f(x) then find the derivative of g(x) at x = 0.

If two functions f and g satisfy the given conditions  x, y ε ℝ, f(x – y) = f(x)g(y) – f(y)g(x) and g(x – y) = g(x) . g(y) + f(x) . f(y).

If the RHD at x = 0 exists for f(x) then find the derivative of g(x) at x = 0.

IIT 2005
1013

Let

be a real valued function. The set of points where f(x) is not differentiable are

a) {0}

b) {1}

c) {0, 1}

d) {∅}

Let

be a real valued function. The set of points where f(x) is not differentiable are

a) {0}

b) {1}

c) {0, 1}

d) {∅}

IIT 1981
1014

Multiple choice

Let  and

 

Then g(x) has

a) Local maximum at x = 1 + ln2 and local minima at x = e

b) Local maximum at x = 1 and local minima at x = 2

c) No local maximas

d) No local minimas

Multiple choice

Let  and

 

Then g(x) has

a) Local maximum at x = 1 + ln2 and local minima at x = e

b) Local maximum at x = 1 and local minima at x = 2

c) No local maximas

d) No local minimas

IIT 2006
1015

For all x in [0, 1], let the second derivative  of a function f(x) exists and satisfies . If f(0) = f(1) then for all x ε [0, 1]

a)  

b)  

c) None of these

For all x in [0, 1], let the second derivative  of a function f(x) exists and satisfies . If f(0) = f(1) then for all x ε [0, 1]

a)  

b)  

c) None of these

IIT 1981
1016

Match the following

Let the function defined in column 1 have domain  and range ()

Column 1

Column 2

i) 1 + 2x

A) Onto but not one-one

ii) tan x

B) One-one but not onto

C) One-one and onto

D) Neither one

Match the following

Let the function defined in column 1 have domain  and range ()

Column 1

Column 2

i) 1 + 2x

A) Onto but not one-one

ii) tan x

B) One-one but not onto

C) One-one and onto

D) Neither one

IIT 1992
1017

Let f(x) = [x] where [.] denotes the greatest integer function. Then the domain of f is .  .  .  ., points of discontinuity of f are .  .  .  .

a) ∀ x ε I

b) ∀ x ε I − {0}

c) ∀ x ε I – {0, 1}

d) ∀ x ε I – {0, 1, 2}

Let f(x) = [x] where [.] denotes the greatest integer function. Then the domain of f is .  .  .  ., points of discontinuity of f are .  .  .  .

a) ∀ x ε I

b) ∀ x ε I − {0}

c) ∀ x ε I – {0, 1}

d) ∀ x ε I – {0, 1, 2}

IIT 1996
1018

PQ and PR are two infinite rays, QAR is an arc.

U


Points lying in the shaded region excluding the boundary satisfies

a)   |z + 1| > 2; |arg(z + 1)| <

b)   |z + 1| < 2; |arg(z + 1)| <

c)  

d)  

PQ and PR are two infinite rays, QAR is an arc.

U


Points lying in the shaded region excluding the boundary satisfies

a)   |z + 1| > 2; |arg(z + 1)| <

b)   |z + 1| < 2; |arg(z + 1)| <

c)  

d)  

IIT 2005
1019

If  for all positive x where a > 0 and b > 0 then

a) 9ab2 ≥ 4c3

b) 27ab2 ≥ 4c3

c) 9ab2 ≤ 4c3

d) 27ab2 ≤ 4c3

If  for all positive x where a > 0 and b > 0 then

a) 9ab2 ≥ 4c3

b) 27ab2 ≥ 4c3

c) 9ab2 ≤ 4c3

d) 27ab2 ≤ 4c3

IIT 1989
1020

Let ABCD be a square with side of length 2 units. C2 is the circle through the vertices A, B, C, D and C1 is the circle touching all the sides of the square ABCD. L is a line through A.

If P is a point on C1 and Q is another point on C2, then  is equal to

a) 0.75

b) 1.25

c) 1

d) 0.5

Let ABCD be a square with side of length 2 units. C2 is the circle through the vertices A, B, C, D and C1 is the circle touching all the sides of the square ABCD. L is a line through A.

If P is a point on C1 and Q is another point on C2, then  is equal to

a) 0.75

b) 1.25

c) 1

d) 0.5

IIT 2006
1021

If a continuous function f defined on the real line ℝ, assumes positive and negative values in ℝ then the equation f(x) = 0 has a root in ℝ. For example, it is known that if a continuous function f on ℝ is positive at some points and its minimum value is negative then the equation f(x) = 0 has a root in ℝ. Consider the function f(x) =  for all real x where k is a real constant.

The positive value of k for which  has only one root is

a)

b) 1

c) e

d) ln2

If a continuous function f defined on the real line ℝ, assumes positive and negative values in ℝ then the equation f(x) = 0 has a root in ℝ. For example, it is known that if a continuous function f on ℝ is positive at some points and its minimum value is negative then the equation f(x) = 0 has a root in ℝ. Consider the function f(x) =  for all real x where k is a real constant.

The positive value of k for which  has only one root is

a)

b) 1

c) e

d) ln2

IIT 2007
1022

Let . Find the intervals in which λ should lie in order that f(x) has exactly one minimum and exactly one maximum.

a)

b)

c)

d)

Let . Find the intervals in which λ should lie in order that f(x) has exactly one minimum and exactly one maximum.

a)

b)

c)

d)

IIT 1985
1023

Consider a circle with centre lying on the focus of the parabola  such that it touches the directrix of the parabola. Then a point of intersection of the circle and parabola is

a) or

b)

c)

d)

Consider a circle with centre lying on the focus of the parabola  such that it touches the directrix of the parabola. Then a point of intersection of the circle and parabola is

a) or

b)

c)

d)

IIT 1995
1024

Find the equation of the plane at a distance  from the point  and containing the line
 .

Find the equation of the plane at a distance  from the point  and containing the line
 .

IIT 2005
1025

Let the complex numbers  are vertices of an equilateral triangle. If  be the circumcentre of the triangle, then prove that

Let the complex numbers  are vertices of an equilateral triangle. If  be the circumcentre of the triangle, then prove that

IIT 1981

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