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1201

Let y′(x) + y(x) g′(x) = g(x) g′(x), y(0) = 0, x ∈ ℝ where f′(x) denotes ddxf(x)

and g(x) is a given non constant differentiable function on ℝ with g(0) = g(2) = 0. Then the value of y(2) is

a) 1

b) 0

c) 2

d) 4

Let y′(x) + y(x) g′(x) = g(x) g′(x), y(0) = 0, x ∈ ℝ where f′(x) denotes ddxf(x)

and g(x) is a given non constant differentiable function on ℝ with g(0) = g(2) = 0. Then the value of y(2) is

a) 1

b) 0

c) 2

d) 4

IIT 2011
1202

One or more than one correct option

A solution curve of the differential equation (x2+xy+4x+2y+4)dydxy2=0,x>0

passes through the point (1, 3), then the solution curve

a) Intersects y = x + 2 exactly at one point

b) Intersects y = x + 2 exactly at two points

c) Intersects y = (x + 2)2

d) Does not intersect y = (x + 3)2

One or more than one correct option

A solution curve of the differential equation (x2+xy+4x+2y+4)dydxy2=0,x>0

passes through the point (1, 3), then the solution curve

a) Intersects y = x + 2 exactly at one point

b) Intersects y = x + 2 exactly at two points

c) Intersects y = (x + 2)2

d) Does not intersect y = (x + 3)2

IIT 2016
1203

The value of

a) –1

b) 0

c) 1

d) i

e) None of these

The value of

a) –1

b) 0

c) 1

d) i

e) None of these

IIT 1987
1204

Let U1 = 1, U2 = 1, Un + 2 = Un + 1 + Un, n > 1. Use mathematical induction to show that
 
for all integers n > 1

Let U1 = 1, U2 = 1, Un + 2 = Un + 1 + Un, n > 1. Use mathematical induction to show that
 
for all integers n > 1

IIT 1981
1205

Let f(x) = (1 – x)2 sin2x + x2Consider the statementsStatement 1: There exists some x ∈ ℝ such that f(x) + 2x = 2(1 + x2)Statement 2: There exists some x ∈ ℝ such that 2f(x) + 1 = 2x(x + 1)

a) Both 1 and 2 are true

b) 1 is true and 2 is false

c) 1 is false and 2 is true

d) Both 1 and 2 are false

Let f(x) = (1 – x)2 sin2x + x2Consider the statementsStatement 1: There exists some x ∈ ℝ such that f(x) + 2x = 2(1 + x2)Statement 2: There exists some x ∈ ℝ such that 2f(x) + 1 = 2x(x + 1)

a) Both 1 and 2 are true

b) 1 is true and 2 is false

c) 1 is false and 2 is true

d) Both 1 and 2 are false

IIT 2013
1206

Let z and ω be two complex numbers such that |z| ≤ 1, |ω| ≤ 1 and   then z equals

a) 1 or i

b) i or –i

c) 1 or –1

d) i or –1

Let z and ω be two complex numbers such that |z| ≤ 1, |ω| ≤ 1 and   then z equals

a) 1 or i

b) i or –i

c) 1 or –1

d) i or –1

IIT 1995
1207

Given
 
 
Prove that
 

Given
 
 
Prove that
 

IIT 1984
1208

The coordinates of the in centre of the triangle that has the co ordinates of the mid points of its sides as (0, 1), (1, 1) and (1, 0) is

a) 2+2

b) 22

c) 1+2

d) 12

The coordinates of the in centre of the triangle that has the co ordinates of the mid points of its sides as (0, 1), (1, 1) and (1, 0) is

a) 2+2

b) 22

c) 1+2

d) 12

IIT 2013
1209

Using mathematical induction, prove that

 for n > 1

Using mathematical induction, prove that

 for n > 1

IIT 1986
1210

If f(x) =  then on the interval [0, π]

a) tan  and  are both continuous

b) tan  and  are both discontinuous

c) tan  and  are both continuous

d) tan  is continuous but  is not

If f(x) =  then on the interval [0, π]

a) tan  and  are both continuous

b) tan  and  are both discontinuous

c) tan  and  are both continuous

d) tan  is continuous but  is not

IIT 1989
1211

One or more than one correct option

A ray of light along x+3y=3

gets reflected upon reaching X- axis, the equation of the reflected ray is

a) y=x+3

b) 3y=x3

c) y=3x3

d) 3y=x1

One or more than one correct option

A ray of light along x+3y=3

gets reflected upon reaching X- axis, the equation of the reflected ray is

a) y=x+3

b) 3y=x3

c) y=3x3

d) 3y=x1

IIT 2013
1212

If  and  where 0 < x ≤1, then in this interval

a) Both f (x) and g (x) are increasing functions

b) Both f (x) and g (x) are decreasing functions

c) f (x) is an increasing function

d) g (x) is an increasing function

If  and  where 0 < x ≤1, then in this interval

a) Both f (x) and g (x) are increasing functions

b) Both f (x) and g (x) are decreasing functions

c) f (x) is an increasing function

d) g (x) is an increasing function

IIT 1997
1213

The number of common tangents to the circles x2 + y2 – 4x − 6y – 12 = 0 and x2 + y2 + 6x + 18y + 26 = 0 is

a) 1

b) 2

c) 3

d) 4

The number of common tangents to the circles x2 + y2 – 4x − 6y – 12 = 0 and x2 + y2 + 6x + 18y + 26 = 0 is

a) 1

b) 2

c) 3

d) 4

IIT 2015
1214

Let p ≥ 3 be an integer and α, β be the roots of x2 – (p + 1) x + 1 = 0. Using mathematical induction show that αn + βn
i) is an integer
ii) and is not divisible by p.

Let p ≥ 3 be an integer and α, β be the roots of x2 – (p + 1) x + 1 = 0. Using mathematical induction show that αn + βn
i) is an integer
ii) and is not divisible by p.

IIT 1992
1215

The function  is not differentiable at

a) – 1

b) 0

c) 1

d) 2

The function  is not differentiable at

a) – 1

b) 0

c) 1

d) 2

IIT 1999
1216

One or more than one correct option

Let RS be a diameter of the circle x2 + y2 = 1 where S is the point (1, 0). Let P be a variable point (other than R and S) on the circle and the tangents to the circle at S and P meet at the point Q. The normal to the circle at P intersect a line drawn through Q parallel to RS at a point E. Then the locus of E passes through the point(s)

a) (13,13)

b) (14,12)

c) (13,13)

d) (14,12)

One or more than one correct option

Let RS be a diameter of the circle x2 + y2 = 1 where S is the point (1, 0). Let P be a variable point (other than R and S) on the circle and the tangents to the circle at S and P meet at the point Q. The normal to the circle at P intersect a line drawn through Q parallel to RS at a point E. Then the locus of E passes through the point(s)

a) (13,13)

b) (14,12)

c) (13,13)

d) (14,12)

IIT 2016
1217

Let f : ℝ → ℝ be a function defined by f (x) =  . The set of points where f (x) is not differentiable is

a) }

b)

c) {0, 1}

d)

Let f : ℝ → ℝ be a function defined by f (x) =  . The set of points where f (x) is not differentiable is

a) }

b)

c) {0, 1}

d)

IIT 2001
1218

The circle passing through the point (−1, 0) and touching the Y – axis at (0, 2) also passes through the point

a) (32,0)

b) (52,0)

c) (32,52)

d) (4,0)

The circle passing through the point (−1, 0) and touching the Y – axis at (0, 2) also passes through the point

a) (32,0)

b) (52,0)

c) (32,52)

d) (4,0)

IIT 2011
1219

Let a, b, c be positive real numbers such that b2 – 4ac > 0 and let α1 = c. Prove by induction that
 

Is well defined and  for n=1, 2, …

Here well defined means that the denominator in the expression of  is not zero.

Let a, b, c be positive real numbers such that b2 – 4ac > 0 and let α1 = c. Prove by induction that
 

Is well defined and  for n=1, 2, …

Here well defined means that the denominator in the expression of  is not zero.

IIT 2001
1220

Let O be the vertex and Q be any point on the parabola x2 = 8y. If the point P divides the line segment OQ^

internally in the ratio 1 : 3 then the locus of P is

a) x2 = y

b) y2 = x

c) y2 = 2x

d) x2 = 2y

Let O be the vertex and Q be any point on the parabola x2 = 8y. If the point P divides the line segment OQ^

internally in the ratio 1 : 3 then the locus of P is

a) x2 = y

b) y2 = x

c) y2 = 2x

d) x2 = 2y

IIT 2015
1221

Solve the following equation for x
 

a) −1

b)

c) 0

d) −1 and

Solve the following equation for x
 

a) −1

b)

c) 0

d) −1 and

IIT 1978
1222

If f is a differentiable function satisfying  for all n ≥ 1,

n  I then

a)

b)

c)

d)  is not necessarily zero

If f is a differentiable function satisfying  for all n ≥ 1,

n  I then

a)

b)

c)

d)  is not necessarily zero

IIT 2005
1223

Evaluate

Evaluate

IIT 2005
1224

Let S be the focus of the parabola y2 = 8x and PQ be the common chord of the circle x2 + y2 – 2x – 4y = 0 and the given parabola. The area of △QPS is

a) 2 sq. units

b) 4 sq. units

c) 6 sq. units

d) 8 sq. units

Let S be the focus of the parabola y2 = 8x and PQ be the common chord of the circle x2 + y2 – 2x – 4y = 0 and the given parabola. The area of △QPS is

a) 2 sq. units

b) 4 sq. units

c) 6 sq. units

d) 8 sq. units

IIT 2012
1225

Multiple choices

The function f (x) = 1 + |sinx| is

a) continuous nowhere

b) continuous everywhere

c) differentiable nowhere

d) not differentiable at x = 0

e) not differentiable at infinite number of points

Multiple choices

The function f (x) = 1 + |sinx| is

a) continuous nowhere

b) continuous everywhere

c) differentiable nowhere

d) not differentiable at x = 0

e) not differentiable at infinite number of points

IIT 1986

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