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Question(s) from Search: IIT

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601

Let a, b and c be three vectors having magnitudes 1, 1 and 2 respectively. If  then the acute angle between a and c is  .  .  .  .  .

Let a, b and c be three vectors having magnitudes 1, 1 and 2 respectively. If  then the acute angle between a and c is  .  .  .  .  .

IIT 1997
04:42 min
602

The equation of the tangents drawn from the origin to the circle  are

a) x= 6

b) y = 0

c)

d)

The equation of the tangents drawn from the origin to the circle  are

a) x= 6

b) y = 0

c)

d)

IIT 1988
04:06 min
603

Let f (x) be defined for all x > 0 and be continuous. If f (x) satisfies
f  = f (x) – f (y) for all x and y and f (e) = 1 then

a) f (x) is bounded

b) f  → 0 as x → 0

c) x f  → 0 as x → 0

d) f (x) = lnx

Let f (x) be defined for all x > 0 and be continuous. If f (x) satisfies
f  = f (x) – f (y) for all x and y and f (e) = 1 then

a) f (x) is bounded

b) f  → 0 as x → 0

c) x f  → 0 as x → 0

d) f (x) = lnx

IIT 1995
02:06 min
604

The value of  is equal to

a)

b)

c)

d) None of these

The value of  is equal to

a)

b)

c)

d) None of these

IIT 1980
03:48 min
605

The area bounded by the curve y = f(x), the X–axis and the ordinate x = 1 and x = b is (b – 1) sin (3b + 4). Then f(x) is

a) (x – 1) cos (3x + 4)

b) sin(3x + 4)

c) sin(3x + 4) + 3(x – 1) cos (3x + 4)

d) none of these

 

The area bounded by the curve y = f(x), the X–axis and the ordinate x = 1 and x = b is (b – 1) sin (3b + 4). Then f(x) is

a) (x – 1) cos (3x + 4)

b) sin(3x + 4)

c) sin(3x + 4) + 3(x – 1) cos (3x + 4)

d) none of these

 

IIT 1983
01:13 min
606

Through a fixed point (h, k) secants are drawn to the circle  . Show that the locus of the mid points of the secant intercepted by the circle is

Through a fixed point (h, k) secants are drawn to the circle  . Show that the locus of the mid points of the secant intercepted by the circle is

IIT 1983
02:28 min
607

There exists a solution of θ between 0 and 2π that satisfies the equation .

a) True

b) False

There exists a solution of θ between 0 and 2π that satisfies the equation .

a) True

b) False

IIT 1980
02:16 min
608

The number of values of x where the function
f (x) = cos x + cos () attains the maximum is

a) 0

b) 1

c) 2

d) Infinite

The number of values of x where the function
f (x) = cos x + cos () attains the maximum is

a) 0

b) 1

c) 2

d) Infinite

IIT 1998
01:38 min
609

Evaluate

a) 0

b)

c) 1

d) 2

Evaluate

a) 0

b)

c) 1

d) 2

IIT 1979
00:54 min
610

The circle  is inscribed in a triangle which has two of its sides along the co-ordinate axes. The locus of the circum centre of the triangle is  find k.

The circle  is inscribed in a triangle which has two of its sides along the co-ordinate axes. The locus of the circum centre of the triangle is  find k.

IIT 1987
07:11 min
611

The domain of definition of the function f (x) given by the equation

2x + 2y = 2 is

a) 0 < x ≤ 1

b) 0 ≤ x ≤ 1

c)  < x ≤ 0

d)  < x ≤ 1

The domain of definition of the function f (x) given by the equation

2x + 2y = 2 is

a) 0 < x ≤ 1

b) 0 ≤ x ≤ 1

c)  < x ≤ 0

d)  < x ≤ 1

IIT 2000
01:23 min
612

Determine the values of a, b, c for which the function

 

is continuous at x = 0

a)

b)

c)

d)

Determine the values of a, b, c for which the function

 

is continuous at x = 0

a)

b)

c)

d)

IIT 1982
04:00 min
613

If

a)

b) [2, ∞)

c)

d)

If

a)

b) [2, ∞)

c)

d)

IIT 2002
06:15 min
614

The function  is

a) Increasing on (0, ∞)

b) Decreasing on (0, ∞)

c) Increasing on  and decreasing on  

d) Increasing on  and decreasing on

The function  is

a) Increasing on (0, ∞)

b) Decreasing on (0, ∞)

c) Increasing on  and decreasing on  

d) Increasing on  and decreasing on

IIT 1995
02:10 min
615

A point P is given on the circumference of a circle of radius r. Chord QR is parallel to the tangent at P. Determine the maximum possible area of ΔPQR.

A point P is given on the circumference of a circle of radius r. Chord QR is parallel to the tangent at P. Determine the maximum possible area of ΔPQR.

IIT 1990
08:40 min
616

If we consider only the principal values of the inverse trigonometric functions then the value of

 is

a)

b)

c)

d)

If we consider only the principal values of the inverse trigonometric functions then the value of

 is

a)

b)

c)

d)

IIT 1994
02:29 min
617

Let g (x) = 1 + x – [ x ] and f (x) =  then for all x,
f (g (x)) is equal to

a) x

b) 1

c) f ( x )

d) g ( x )

Let g (x) = 1 + x – [ x ] and f (x) =  then for all x,
f (g (x)) is equal to

a) x

b) 1

c) f ( x )

d) g ( x )

IIT 2001
01:01 min
618

Let P(asecθ, btanθ) and Q(asecɸ, btanɸ) where θ + ɸ =  be two points on the hyperbola . If (h, k) be the point of intersection of the normals at P and Q then k is equal to

a)

b)

c)

d)

Let P(asecθ, btanθ) and Q(asecɸ, btanɸ) where θ + ɸ =  be two points on the hyperbola . If (h, k) be the point of intersection of the normals at P and Q then k is equal to

a)

b)

c)

d)

IIT 1999
07:25 min
619

Find the value of  at  where
.

a) 1

b)

c)

d)

Find the value of  at  where
.

a) 1

b)

c)

d)

IIT 1981
03:44 min
620

Let ℝ be the set of real numbers and f : ℝ → ℝ such that for all x and y in ℝ, . Then f (x) is a constant.

a) True

b) False

Let ℝ be the set of real numbers and f : ℝ → ℝ such that for all x and y in ℝ, . Then f (x) is a constant.

a) True

b) False

IIT 1988
01:50 min
621

Let

Then at x = 0, f has

a) A local maximum

b) No local maximum

c) A local minimum

d) No extremum

Let

Then at x = 0, f has

a) A local maximum

b) No local maximum

c) A local minimum

d) No extremum

IIT 2000
01:52 min
622

Let C be any circle with centre (0, . Prove that at the most two rational points can be there on C (A rational point is a point both of whose coordinates are rational numbers).

Let C be any circle with centre (0, . Prove that at the most two rational points can be there on C (A rational point is a point both of whose coordinates are rational numbers).

IIT 1997
01:58 min
623

Find

a) 0

b) e

c) ez

d) e3

Find

a) 0

b) e

c) ez

d) e3

IIT 1993
05:49 min
624

The relatives of a man comprise 4 ladies and 3 gentlemen and his wife has 7 relatives 3 of them are ladies and 4 gentlemen. In how many ways can they invite a dinner party of 3 ladies and 3 gentlemen so that so that three of man’s relatives and three of wife’s relatives are included?

The relatives of a man comprise 4 ladies and 3 gentlemen and his wife has 7 relatives 3 of them are ladies and 4 gentlemen. In how many ways can they invite a dinner party of 3 ladies and 3 gentlemen so that so that three of man’s relatives and three of wife’s relatives are included?

IIT 1985
04:27 min
625

Let   then the real roots of the equation

 are

a) ± 1

b)

c)

d) 0 and 1

Let   then the real roots of the equation

 are

a) ± 1

b)

c)

d) 0 and 1

IIT 2002
01:42 min

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