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1201

Let F : ℝ → ℝ be a thrice differentiable function. Suppose that F(1) = 0, F(3) = −4 and F′(x) < 0 for all x ε (1, 3). Let f(x) = x F(x) for all x ε ℝ.If 13x2F(x)dx=12

and 13x3F(x)dx=40 , then the correct expression is/are

a) 9f(3)+f(1)32=0

b) 13f(x)dx=12

c) 9f(3)f(1)+32=0

d) 13f(x)dx=12

Let F : ℝ → ℝ be a thrice differentiable function. Suppose that F(1) = 0, F(3) = −4 and F′(x) < 0 for all x ε (1, 3). Let f(x) = x F(x) for all x ε ℝ.If 13x2F(x)dx=12

and 13x3F(x)dx=40 , then the correct expression is/are

a) 9f(3)+f(1)32=0

b) 13f(x)dx=12

c) 9f(3)f(1)+32=0

d) 13f(x)dx=12

IIT 2015
1202

 =

a) +c

b) +c

c) +c

d)

 =

a) +c

b) +c

c) +c

d)

IIT 1980
1203

Consider the points
P: (−sin (β – α), cosβ)
Q: (cos (β – α), sinβ)
R: (−cos{(β – α) + θ}, sin (β – θ))
where 0 < α, β, θ <  then

a) P lies on the line segment RQ

b) Q lies on the line segment PR

c) R lies on the line segment QP

d) P, Q, R are non–collinear

Consider the points
P: (−sin (β – α), cosβ)
Q: (cos (β – α), sinβ)
R: (−cos{(β – α) + θ}, sin (β – θ))
where 0 < α, β, θ <  then

a) P lies on the line segment RQ

b) Q lies on the line segment PR

c) R lies on the line segment QP

d) P, Q, R are non–collinear

IIT 2008
1204

One or more than one correct options

The options with the values of α and L that satisfy the equation 04πet[sin6αt+cos4αt]dt0πet[sin6αt+cos4αt]dt=L

is/are

a) α=2,L=e4π1eπ1

b) α=2,L=e4π+1eπ+1

c) α=4,L=e4π1eπ1

d) α=4,L=e4π+1eπ+1

One or more than one correct options

The options with the values of α and L that satisfy the equation 04πet[sin6αt+cos4αt]dt0πet[sin6αt+cos4αt]dt=L

is/are

a) α=2,L=e4π1eπ1

b) α=2,L=e4π+1eπ+1

c) α=4,L=e4π1eπ1

d) α=4,L=e4π+1eπ+1

IIT 2010
1205

The number of points in the interval [13,13]

in which f(x)=sin(x2)+cos(x2) attains its maximum value is

a) 8

b) 2

c) 4

d) 0

The number of points in the interval [13,13]

in which f(x)=sin(x2)+cos(x2) attains its maximum value is

a) 8

b) 2

c) 4

d) 0

IIT 2014
1206

If the integers m and n are chosen at random between 1 and 100 then the probability that a number of form  is divisible by 5, equals

a)

b)

c)

d)

If the integers m and n are chosen at random between 1 and 100 then the probability that a number of form  is divisible by 5, equals

a)

b)

c)

d)

IIT 1999
1207

Show that the integral
 =

 

where y = x1/6

Show that the integral
 =

 

where y = x1/6

IIT 1992
1208

If α=01e(9x+3tan1x)(12+9x21+x2)dx

Where tan1x takes only principal values then the value of (loge|1+α|3π4) is

a) 6

b) 9

c) 8

d) 11

If α=01e(9x+3tan1x)(12+9x21+x2)dx

Where tan1x takes only principal values then the value of (loge|1+α|3π4) is

a) 6

b) 9

c) 8

d) 11

IIT 2015
1209

The intercept on X axis made by the tangent to the curve y=0x|t|dt,tR

which is parallel to the line y = 2x are equal to

a) ±1

b) ±2

c) ±3

d) ±4

The intercept on X axis made by the tangent to the curve y=0x|t|dt,tR

which is parallel to the line y = 2x are equal to

a) ±1

b) ±2

c) ±3

d) ±4

IIT 2013
1210

The common tangent to the curve x2 + y2 = 2 and the parabola y2 = 8x touch the circle at the points P, Q and the parabola at the points R, S. Then the area (in square units) of the quadrilateral PQRS is

a) 3

b) 6

c) 9

d) 15

The common tangent to the curve x2 + y2 = 2 and the parabola y2 = 8x touch the circle at the points P, Q and the parabola at the points R, S. Then the area (in square units) of the quadrilateral PQRS is

a) 3

b) 6

c) 9

d) 15

IIT 2014
1211

(One or more correct answers)
Let 0 < P (A) < 1, 0 < P (B) < 1 and P (A ∪ B) = P (A) + P (B) – P (A ∩ B) then

a) P (B/A) = P (B) – P (A)

b) P (Aʹ – Bʹ) = P (Aʹ) – P (Bʹ)

c) P (A U B)ʹ = P (Aʹ) P (Bʹ)

d) P (A/B) = P (A)

(One or more correct answers)
Let 0 < P (A) < 1, 0 < P (B) < 1 and P (A ∪ B) = P (A) + P (B) – P (A ∩ B) then

a) P (B/A) = P (B) – P (A)

b) P (Aʹ – Bʹ) = P (Aʹ) – P (Bʹ)

c) P (A U B)ʹ = P (Aʹ) P (Bʹ)

d) P (A/B) = P (A)

IIT 1995
1212

For any integer n, the integral
 has the value

a) π

b) 1

c) 0

d) None of these

For any integer n, the integral
 has the value

a) π

b) 1

c) 0

d) None of these

IIT 1985
1213

The area (in square units) of the region described by (x, y) : y2 < 2x and y ≥ 4x – 1 is

a) 732

b) 932

c) 32

d) 53

The area (in square units) of the region described by (x, y) : y2 < 2x and y ≥ 4x – 1 is

a) 732

b) 932

c) 32

d) 53

IIT 2015
1214

Let f: [−1, 2] → [0, ∞) be a continuous function such that f(x) = f(1 –x), Ɐ x ∈ [−1, 2]. If R1=12xf(x)dx

and R2 are the area of the region bounded by y = f(x), x = −1, x = 2 and the X- axis. Then

a) R1 = 2R2

b) R1 = 3R2

c) 2R1 = R2

d) 3R1 = R2

Let f: [−1, 2] → [0, ∞) be a continuous function such that f(x) = f(1 –x), Ɐ x ∈ [−1, 2]. If R1=12xf(x)dx

and R2 are the area of the region bounded by y = f(x), x = −1, x = 2 and the X- axis. Then

a) R1 = 2R2

b) R1 = 3R2

c) 2R1 = R2

d) 3R1 = R2

IIT 2011
1215

If (2+sinx)dydx+(y+1)cosx=0y(0)=1

, then y(π2) is equal to

a) 13

b) 23

c) 13

d) 43

If (2+sinx)dydx+(y+1)cosx=0y(0)=1

, then y(π2) is equal to

a) 13

b) 23

c) 13

d) 43

IIT 2017
1216

One or more than one correct option

Consider the family of circles whose centre lies on the straight line y = x. If the family of circles is represented by the differential equation Py′′ + Qy′ + 1 = 0 where P, Q are functions of x, y and y′ (wherey=dydx,y=d2ydx2)

, then which of the following statements is/are true?

a) P = y + x

b) P = y – x

c) P + Q = 1 – x + y + y′ + (y′)2

d) P − Q = x + y − y′ − (y′)2

One or more than one correct option

Consider the family of circles whose centre lies on the straight line y = x. If the family of circles is represented by the differential equation Py′′ + Qy′ + 1 = 0 where P, Q are functions of x, y and y′ (wherey=dydx,y=d2ydx2)

, then which of the following statements is/are true?

a) P = y + x

b) P = y – x

c) P + Q = 1 – x + y + y′ + (y′)2

d) P − Q = x + y − y′ − (y′)2

IIT 2015
1217

Find  at x = , when

 

a) 0

b) 1

c) – 1

d) 2

Find  at x = , when

 

a) 0

b) 1

c) – 1

d) 2

IIT 1991
1218

Let f : (0, ∞) → ℝ and  If  then f(4) equals

a)

b) 7

c) 4

d) 2

Let f : (0, ∞) → ℝ and  If  then f(4) equals

a)

b) 7

c) 4

d) 2

IIT 2001
1219

Let f:[12,1]R

(the set of all real numbers) be a positive, non-constant and differentiable function such that f(x)<2f(x) and f(12)=1 . Then the value of 1/21f(x)dx lies in the interval

a) (2e-1,2e)

b) (e1,2e-1)

c) (e12,e1)

d) (0,e12)

Let f:[12,1]R

(the set of all real numbers) be a positive, non-constant and differentiable function such that f(x)<2f(x) and f(12)=1 . Then the value of 1/21f(x)dx lies in the interval

a) (2e-1,2e)

b) (e1,2e-1)

c) (e12,e1)

d) (0,e12)

IIT 2013
1220

The smallest positive integer n for which  is

a) 8

b) 12

c) 12

d) None of these

The smallest positive integer n for which  is

a) 8

b) 12

c) 12

d) None of these

IIT 1980
1221

Let the population of rabbits arriving at time t be governed by the differential equation dp(t)dt=12p(t)200

. If p(0) = 100, then p(t) is equal to

a) 400 – 300et/2

b) 300 – 200e−t/2

c) 600 – 500et/2

d) 400 – 300e−t/2

Let the population of rabbits arriving at time t be governed by the differential equation dp(t)dt=12p(t)200

. If p(0) = 100, then p(t) is equal to

a) 400 – 300et/2

b) 300 – 200e−t/2

c) 600 – 500et/2

d) 400 – 300e−t/2

IIT 2014
1222

If z = x + iy and ω =  then |ω| =1 implies that in the complex plane

a) z lies on the imaginary axis

b) z lies on the real axis

c) z lies on unit circle

d) none of these

If z = x + iy and ω =  then |ω| =1 implies that in the complex plane

a) z lies on the imaginary axis

b) z lies on the real axis

c) z lies on unit circle

d) none of these

IIT 1983
1223

For a positive integer n, define
 then

a) a(100) ≤ 100

b) a(100) > 100

c) a(200) ≤ 100

d) a(200) > 100

For a positive integer n, define
 then

a) a(100) ≤ 100

b) a(100) > 100

c) a(200) ≤ 100

d) a(200) > 100

IIT 1999
1224

Let f:[0, 1] → ℝ (the set all real numbers)be a function. Suppose the function is twice differentiable, f(0) = f(1) = 0 and satisfiesf′′(x) – 2f′(x) + f(x) ≥ ex, x ∈ [0, 1]If the function e−x f(x) assumes its minimum in the interval [0, 1] at x=14

then which of the following is true?

a) f(x)<f(x),14<x<34

b) f(x)>f(x),0<x<14

c) f(x)<f(x),0<x<14

d) f(x)<f(x),34<x<1

Let f:[0, 1] → ℝ (the set all real numbers)be a function. Suppose the function is twice differentiable, f(0) = f(1) = 0 and satisfiesf′′(x) – 2f′(x) + f(x) ≥ ex, x ∈ [0, 1]If the function e−x f(x) assumes its minimum in the interval [0, 1] at x=14

then which of the following is true?

a) f(x)<f(x),14<x<34

b) f(x)>f(x),0<x<14

c) f(x)<f(x),0<x<14

d) f(x)<f(x),34<x<1

IIT 2013
1225

There exists a function f(x) satisfying f (0) = 1,  and

f (x) > 0 for all x and

a)   for all x

b)  

c)   for all x

d)   for all x

There exists a function f(x) satisfying f (0) = 1,  and

f (x) > 0 for all x and

a)   for all x

b)  

c)   for all x

d)   for all x

IIT 1982

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