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Chapter 5 of the Class 12 NCERT Mathematics textbook, "Continuity and Differentiability," introduces the concepts of continuity and differentiability of functions, which are fundamental in calculus. Exercise 5.3 focuses on applying these concepts to solve problems related to the continuity and differentiability of functions.
This section provides detailed solutions for Exercise 5.3 from Chapter 5 of the Class 12 NCERT Mathematics textbook. The exercise involves problems that require students to determine whether given functions are continuous and differentiable at specified points or over given intervals. Solutions are presented step-by-step to help students understand the application of continuity and differentiability concepts.
Solution:
On differentiating both sides w.r.t. x, we get
2 + 3 = cos x
3 = cos x - 2
= (cosx - 2)/3
Solution:
On differentiating both sides w.r.t. x, we get
2 + 3 = cos y
(cosy - 3) = 2
Solution:
On differentiating both sides w.r.t. x, we get
a + b * 2y() = -sin y *
(2by + siny) = -a
Solution:
On differentiating both sides w.r.t. x, we get
(x * + y) + 2y = sec2x +
(x + 2y - 1) = sec2x - y
Solution:
On differentiating both sides w.r.t. x, we get
2x + (x + y) + 2y = 0
(x + 2y) * = -(2x + y)
Solution:
Differentiate both sides w.r.t. x
3x2+(x2 + y * 2x) + (x * 2y * + y2) + 3y2 * = 0
(x2 + 2xy + 3y2) = -(3x2 + 2xy + y2)
Solution:
Differentiate both sides w.r.t. x
2 sin y * (siny) - sin(xy) * xy = 0
2sin y * cosy - sin(xy)(x * + y) = 0
(2sin cos y - sin (xy) - x)) = y(xy)
Solution:
2 sin x * (sin x) + 2 cos y * (cos y) = 0
2 sin x * cos x + 2 cos y*(-sin y) * = 0
2 sin x * cos x - 2 cos x - 2 cos y sin y * = 0
Sin(2x) - sin(2y) - = 0
Solution:
Put x = tanθ
θ = tan-1x
y = sin-1(sin 2θ)
y = 2θ
y = 2tan-1x -(1)
On differentiating eq(1), we get
Solution:
Put x = tanθ
θ = tan-1x
y =
y = tan-1(tan 3θ)
y = 3θ
y = 3tan-1x -(1)
On differentiating eq(1), we get
Solution:
Put x = tanθ
θ = tan-1 x
y =
y = cos-1(cos 2θ)
y = 2θ
y = 2tan-1x -(1)
On differentiating eq(1), we get
Solution:
Put x = tanθ
θ = tan-1x
y = sin-1(cos 2θ)
y = sin-1(sin (π/2 - 2θ))
y = π/2 - 2θ
y = π/2 - 2 tan-1x
Solution:
Put x = tanθ
θ = tan-1x
y = cos^{-1}()
y = cos-1(sin 2θ)
y = cos-1(cos (π/2 - 2θ))
y = π/2 - 2θ
y = π/2 - 2tan-1x
Solution:
Put x = sinθ
θ = sin-1 x
y = sin-1(2sinθ√(1 - sin2θ))
y = sin-1(sin 2θ) = 2θ
y = 2sin-1x
Solution:
Put x = tanθ
y = sec-1(1/cos2θ))
y = sec-1(sec2θ) = 2θ
y = 2cos-1x
=
Exercise 5.3 focuses on problems related to the continuity and differentiability of functions. Students are required to determine whether functions are continuous and differentiable at specific points or over certain intervals. Key concepts include:
