Class 12 Maths Chapter 5 Continuity and Differentiability Solved Question and Answers

(1) Let f (x) = ex, g (x) = sin^-1 x and h (x) = f |g(x)|, then is equal to

[A] e^{sin^-1}x

[B]

[C] sin^-1x

[D] 1/(1−x²)

Answer:

(2) The differential coefficient of tan^-1 is

[A]

[B]

[C]

[D] x

Answer:

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(3) If x^y . y^x = 16, then the value of dy/dx at (2, 2) is

[A] -1

[B] 0

[C] 1

[D] none of these

Answer: -1

(4) If y = (tan x)^{sin x}, then dy/dx is equal to

[A] sec x + cos x

[B] sec x + log tan x

[C] (tan x)^{sin x}

[D] None of these

Answer: None of these

(5) If Rolle’s theorem holds for the function f(x) = x3 + bx2 + ax + 5 on [1, 3] with c = find the value of a and b.

[A] a = 11, b = -6

[B] a = 10, b = 6

[C] a = -11, b = 6

[D] a = 11, b = 6

Answer: a = 11, b = -6

(6) If y = ax² + b, then dy/dx at x = 2 is equal to

[A] 4a

[B] 3a

[C] 2a

[D] None of these

Answer: 4a

(7) If y = (1 + x)(1 + x²)(1 + x⁴)…..(1 + x²ⁿ), then the value of dy/dx at x = 0 is

[A] 0

[B] -1

[C] 1

[D] None of these

Answer: 1

(8) The number of discontinuous functions y(x) on [-2, 2] satisfying x² + y² = 4 is

[A] 0

[B] 1

[C] 2

[D] >2

Answer: 0

(9) The value of c in Mean value theorem for the function f(x) = x(x – 2), x ∈ [1, 2] is

[A] 3/2

[B] 2/3

[C] 1/2

[D] 5/2

Answer: 3/2

(10) The value of c in mean value theorem for the function f(x) = (x – 3)(x – 6)(x – 9) in [3, 5] is

[A] 6 ± √(13/3)

[B] 6 + √(13/3)

[C] 6 – √(13/3)

[D] None of these

Answer: 6 – √(13/3)

(11) A value of c for which the Mean value theorem holds for the function f(x) = logex on the interval [1, 3] is

[A] 2log₃e

[B] 1/2log_e3

[C] log₃e

[D] loge₃

Answer: 2log₃e

(12) The value of c in Rolle’s Theorem for the function f(x) = ex sin x, x ∈ [0, π] is

[A] π/6

[B] π/4

[C] π/2

[D] 3π/4

Answer: 3π/4

(13) The value of c in Rolle’s theorem for the function, f(x) = sin 2x in [0, π/2] is

[A] π/2

[B] π/4

[C] π/3

[D] π/6

Answer: π/4

(14) If x² + y² = 1, then

[A] yy” – (2y’)² + 1 = 0

[B] yy” + (y’)² + 1 = 0

[C] yy” – (y’)² – 1 = 0

[D] yy” + (2y’)² + 1 = 0

Answer: yy” + (y’)² + 1 = 0

(15) The derivative of f(tan x) w.r.t. g(sec x) at x = π/4, where f'(1) = 2 and g'(√2) = 4, is

[A] 1/√2

[B] √2

[C] 1

[D] 0

Answer: 1/√2

(16) The function f(x) = e^|x| is

[A] continuous everywhere but not differentiable at x = 0

[B] continuous and differentiable everywhere

[C] not continuous at x = 0

[D] None of these

Answer: continuous everywhere but not differentiable at x = 0

(17) Let f(x) = |sin x| Then

[A] f is everywhere differentiable

[B] f is everywhere continuous but not differentiable at x = nπ, n ∈ Z

[C] f is everywhere continuous but no differentiable at x = (2n + 1) π/2 n ∈ Z

[D] None of these

Answer: f is everywhere continuous but not differentiable at x = nπ, n ∈ Z

(18) For the function f(x) = x + 1/x, x ∈ [1, 3] the value of c for mean value theorem is

[A] 1

[B] √3

[C] 2

[D] None of these

Answer: √3

(19) Let f be defined on [-5, 5] as

f(x) = Then f(x) is

[A] continuous at every x except x = 0

[B] discontinuous at everyx except x = 0

[C] continuous everywhere

[D] discontinuous everywhere

Answer: discontinuous at everyx except x = 0

(20) Let function f (x) =

[A] continuous at x = 1

[B] differentiable at x = 1

[C] continuous at x = -3

[D] All of these

Answer: All of these

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NCERT Solutions for class 12 Maths | Chapter 5 - Continuity and Differentiability

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NCERT Solutions for class 12 Maths | Chapter 5 - Continuity and Differentiability

By Gkseries see more questions

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