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JEE Exam  >  JEE Tests  >  Chapter-wise Tests for JEE Main & Advanced  >  JEE Advanced Level Test: Continuity and Differentiability- 1 - JEE MCQ

JEE Advanced Level Test: Continuity and Differentiability- 1 - JEE MCQ


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30 Questions MCQ Test Chapter-wise Tests for JEE Main & Advanced - JEE Advanced Level Test: Continuity and Differentiability- 1

JEE Advanced Level Test: Continuity and Differentiability- 1 for JEE 2024 is part of Chapter-wise Tests for JEE Main & Advanced preparation. The JEE Advanced Level Test: Continuity and Differentiability- 1 questions and answers have been prepared according to the JEE exam syllabus.The JEE Advanced Level Test: Continuity and Differentiability- 1 MCQs are made for JEE 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for JEE Advanced Level Test: Continuity and Differentiability- 1 below.
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JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 1
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 A function f(x) is defined as below

 x ≠ 0 and f(0) = a, f(x) is continuous at x = 0 if a equals

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 2
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  , -1 ≤ x < 0 is continuous in the interval [–1, 1], then `p' is equal to:

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 2

lim f(x) = -½
Apply L hospital 
lim(x → 0) p/2(1+px)½ + p/2(1-px)½ = -½
⇒ 2p = -1 
p = -1/2

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JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 3
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Let f(x) =  when – 2 ≤ x ≤ 2. Then (where [ * ] represents greatest integer function)

Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 3

At (x = 0) f(0) = |(0+½) .[0]| = 0
f(1) = |(1+½) .[1]| = 3/2
f(2) = |(2+½) .[2]| = 5
f(-1) = |(-1+½) .[-1]| = ½
LHL at x = 2 
lim x-->2  f(x) = |(x+½) .[2]|
=|(5/2) * 1| = 5/2
f(2) = limx-->2 f(x) ( continuous at x=2)

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 4
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 Let f(x) = sgn (x) and g(x) = x (x2 – 5x + 6). The function f(g(x)) is discontinuous at
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 5
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 If y =  where t = , then the number of points of discontinuities of y = f(x), x ∈ R is
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 5

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 6
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The equation 2 tan x + 5x – 2 = 0 has
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 6

 Let f(x) = 2tan x + 5x – 2 
Now, f(0) = – 2 < 0 
and f(π/4 ) = 2 + 5π/4 – 2 
= 5π/5 > 0, 
the line intersects the x-axis at x = ⅖ 
since 0 < ⅖ <  π/4
Thus, f(x) = 0 has atleast real solution root in ( 0, π/4)

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 7
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 If f(x) =  , then indicate the correct alternative(s)
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 8
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The function f (x) = 1 + | sin x l is
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 9
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 If f(x) =  be a real valued function then
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 10
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The function f(x) = sin-1 (cos x) is
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 11
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Let f(x) be defined in [–2, 2] by f(x) =   then f(x)
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 12
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If f(x) is differentiable everywhere, then
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 12

Even if f(x) is differentiable everywhere, |f(x)| need not be differentiable everywhere. An example being where the function changes its sign from negative to positive. f(x)=x at x=0B. 
∣f∣= {f if f>0                −f if f<0}
​So,∣f∣2 = {f2 if f>0        −f2 if f<0}
​Differentiating ∣f∣2,
{2ff′ if f>0     −2ff′ if f<0}
​At f=0, LHD=RHD=∣f(0)∣2=0, so function is differentiable.

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 13
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 Let f(x + y) = f(x) f(y) all x and y. Suppose that f(3) = 3 and f'(0) = 11 then f'(3) is given by
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 13

f(x + y)=f(x) f(y) wrt x we get:
f′(x+y) (1 + y′) = f(x) f′(y) (y′) + f′(x) f(y)
Now on substituting x = 0 and y = 3, we get :
f′(3) (1 + 0)=f(0) f′(3) 0+ f(3) f′(0)
f′(3) = 3 × 11 = 33

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 14
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If f : R → R be a differentiable function, such that f(x + 2y) = f(x) + f(2y) + 4xy x, y ∈ R, then
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 15
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Let f(x) = x – x2 and g(x) = . Then in the interval [0, ¥)
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 16
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Let [x] denote the integral part of x ∈ R and g(x) = x – [x]. Let f(x) be any continuous function with f(0) = f(1) then the function h(x) = f(g(x))
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 17
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 If f (x) = [x sin p x] { where [x] denotes greatest integer function}, then f (x) is
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 18
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 If f(x) =  , then f(x) is
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 19
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The functions defined by f(x) = max {x2, (x – 1)2, 2x (1 – x)}, 0 £ x £ 1
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 20
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Let f(x) = x3 – x2 + x + 1 and g(x) =  then
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 21
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Let f²(x) be continuous at x = 0 and f²(0) = 4 then value of  is
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 22
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Let f : R → R be a function such that f , f(0) = 0 and f¢(0) = 3, then
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 23
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 Suppose that f is a differentiable function with the property that f(x + y) = f(x) + f(y) + xy and  f(h) = 3 then
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 24
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 If a differentiable function f satisfies f   x, y Î R, find f(x)
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 25
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Let f : R → R be a function defined by f(x) = Min {x + 1, |x| + 1}. Then which of the following is true ?
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 25

f(x) = Min {x + 1,∣x∣ + 1}
x = 0 ⇒ ∣x∣ = x
f(x) = min {x + 1,x + 1}
= x + 1
x < 0,∣x∣ = −x
f(x) = min {x + 1,−x + 1}
−x + 1> x + 1
x < 0
⇒x < 0, f(x) = x + 1
x > 0,f (x) = x + 1
⇒ f(x) = x + 1 for all x
∴f(x) is differential everywhere (continuous and constant slope)

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 26
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 The function f : R /{0} → R given by vf(x) =  can be made continuous at x = 0 by defining f(0) as
Detailed Solution for JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 26

JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 27
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 Function f(x) = (|x – 1| + |x – 2| + cos x) where x Î [0, 4] is not continuous at number of points
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 28
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 Let f(x + y) = f(x) f(y) for all x, y, where f(0) ≠ 0. If f'(0) = 2, then f(x) is equal to
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 29
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 A function f : R → R satisfies the equation f(x + y) = f(x) . f(y) for all x, y ∈ R, f(x) ≠ 0. Suppose that the function is differentiable at x = 0 and f'(0) = 2 then f'(x) =
JEE Advanced Level Test: Continuity and Differentiability- 1 - Question 30
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Let f(x) = [cos x + sin x], 0 < x < 2p where [x] denotes the greatest integer less than or equal to x. the number of points of discontinuity of f(x) is
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