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776

The interior angles of a polygon are in Arithmetic Progression. The smallest angle is 120° and the common difference is 5. Find the number of sides of the polygon.

The interior angles of a polygon are in Arithmetic Progression. The smallest angle is 120° and the common difference is 5. Find the number of sides of the polygon.

IIT 1980
777

If where a > 0 and n is a positive integer then f(f(x)) = x.

a) True

b) False

If where a > 0 and n is a positive integer then f(f(x)) = x.

a) True

b) False

IIT 1983
778

A vector a has components 2p and 1 with respect to a rectangular cartesian system. This system is rotated through a certain angle about the origin in the counter clockwise sense. If with respect to new system a has components p + 1 and 1 then

a) p ≠ 0

b) p = 1 or p =

c) p = −1 or

d) p = 1 or p = −1

e) None of these

A vector a has components 2p and 1 with respect to a rectangular cartesian system. This system is rotated through a certain angle about the origin in the counter clockwise sense. If with respect to new system a has components p + 1 and 1 then

a) p ≠ 0

b) p = 1 or p =

c) p = −1 or

d) p = 1 or p = −1

e) None of these

IIT 1986
779

The domain of the function  is

The domain of the function  is

IIT 1984
780

If f is an even function defined on (−5, 5) then the four real values of x satisfying the equation  are

If f is an even function defined on (−5, 5) then the four real values of x satisfying the equation  are

IIT 1996
781

Let a1, a2, … an be positive real numbers in Geometric Progression. For each n let An, Gn, Hn be respectively the arithmetic mean, geometric mean and harmonic mean of a1, a2, .  .  .  ., an. Find the expressions for the Geometric mean of G1, G2, .  .  .  .Gn in terms of A1, A2, .  .  .  .,An; H1, H2, .  .  .  .Hn

Let a1, a2, … an be positive real numbers in Geometric Progression. For each n let An, Gn, Hn be respectively the arithmetic mean, geometric mean and harmonic mean of a1, a2, .  .  .  ., an. Find the expressions for the Geometric mean of G1, G2, .  .  .  .Gn in terms of A1, A2, .  .  .  .,An; H1, H2, .  .  .  .Hn

IIT 2001
782

Let  , 0 < x < 2 are integers m ≠ 0, n > 0 and let p be the left hand derivative of |x − 1| at x = 1. If , then

a) n = −1, m = 1

b) n = 1, m = −1

c) n = 2, m = 2

d) n > 2, n = m

Let  , 0 < x < 2 are integers m ≠ 0, n > 0 and let p be the left hand derivative of |x − 1| at x = 1. If , then

a) n = −1, m = 1

b) n = 1, m = −1

c) n = 2, m = 2

d) n > 2, n = m

IIT 2008
783

For three vectors  which of the following expressions is not equal to any of the remaining three

a)

b)

c)

d)

For three vectors  which of the following expressions is not equal to any of the remaining three

a)

b)

c)

d)

IIT 1998
784

If total number of runs scored in n matches is
 where n > 1 and the runs scored in the kth match are given by k.2n + 1 – k  where 1 ≤ k ≤ n. Find n.

If total number of runs scored in n matches is
 where n > 1 and the runs scored in the kth match are given by k.2n + 1 – k  where 1 ≤ k ≤ n. Find n.

IIT 2005
785

In a triangle ABC if cotA, cotB, cotC are in Arithmetic Progression then a, b, c are in .  .  .  .  . Progression.

In a triangle ABC if cotA, cotB, cotC are in Arithmetic Progression then a, b, c are in .  .  .  .  . Progression.

IIT 1985
786

For any odd integer n ≥ 1,
n3 – (n – 1)3 + .  .  . + (−)n – 1 13 = .  .  .

For any odd integer n ≥ 1,
n3 – (n – 1)3 + .  .  . + (−)n – 1 13 = .  .  .

IIT 1996
787

A unit vector which is orthogonal to the vectors  and

coplanar with the vectors  and  is

a)

b)

c)

d)

A unit vector which is orthogonal to the vectors  and

coplanar with the vectors  and  is

a)

b)

c)

d)

IIT 2004
788

The area of the equilateral triangle which contains three coins of unit radius is

a)  square units

b)  square units

c)  square units

d)  square units

The area of the equilateral triangle which contains three coins of unit radius is

a)  square units

b)  square units

c)  square units

d)  square units

IIT 2005
789

a) True

b) False

a) True

b) False

IIT 1982
790

a) True

b) False

a) True

b) False

IIT 2004
791

Match the following  is

Column 1

Column 2

i) Positive

A) ( )

ii) Negative

B) ( )

C) ( )

D) ( )

Match the following  is

Column 1

Column 2

i) Positive

A) ( )

ii) Negative

B) ( )

C) ( )

D) ( )

IIT 1992
792

If the vectors b, c, d, are not coplanar then prove that a is parallel to the vector  

If the vectors b, c, d, are not coplanar then prove that a is parallel to the vector  

IIT 1994
793

Prove by vector method or otherwise, that the point of intersection of the diagonals of a trapezium lies on the line passing through the mid points of the parallel sides (you may assume that the trapezium is not a parallelogram)

Prove by vector method or otherwise, that the point of intersection of the diagonals of a trapezium lies on the line passing through the mid points of the parallel sides (you may assume that the trapezium is not a parallelogram)

IIT 1998
794

True / False

Let  are unit vectors. Suppose that  and the angle between B and  then

a) True

b) False

True / False

Let  are unit vectors. Suppose that  and the angle between B and  then

a) True

b) False

IIT 1981
795

2sinx + tanx > 3x where 0 ≤ x ≤

a) True

b) False

2sinx + tanx > 3x where 0 ≤ x ≤

a) True

b) False

IIT 1990
796

Let f(x) = (x + 1)2 – 1, x ≥ −1 then the set {x : f(x) = f-1(x)} is

a)

b) { 0, 1, −1}

c) {0, −1}

d) Ф

Let f(x) = (x + 1)2 – 1, x ≥ −1 then the set {x : f(x) = f-1(x)} is

a)

b) { 0, 1, −1}

c) {0, −1}

d) Ф

IIT 1995
797

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

IIT 2000
798

If f : [ 1,  → [ 2, ] is given by f (x) = x +  then ( x ) is given by

a)

b)

c)

d) 1 +

If f : [ 1,  → [ 2, ] is given by f (x) = x +  then ( x ) is given by

a)

b)

c)

d) 1 +

IIT 2001
799

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

IIT 2002
800

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

IIT 1986

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