Name: Thoroughly Revised and Enlarged Edition Mathematics MSc Entrance Examination for All Indian Universities
Brand: Disha Publication
Price: 945 INR
Availability: InStock

Thoroughly Revised and Enlarged Edition Mathematics MSc Entrance Examination for All Indian Universities

by Madhurima

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23 Customer Review

Have Doubts Regarding This Product ? Ask Your Question

Q1

Which chapter covers basis, dimension, and subspace for MSc entrance exams?

A1

Chapter 1 (Vector Space) covers basis, dimension, subspace, and linear span thoroughly.
Q2

Does the book include numerical methods for solving algebraic equations?

A2

Yes, Chapter 15 (Numerical Technique) covers root-finding, interpolation, and numerical integration.
Q3

Where can I find problems on Cauchy-Riemann equations?

A3

Chapter 16 (Complex Analysis) includes Cauchy-Riemann equations, analytic functions, and contour integration.
Q4

Which chapter helps with uniform convergence and power series questions?

A4

Chapter 10 (Uniform Convergence and Power Series) covers Weierstrass M-test and radius of convergence.
Q5

Does the book cover double and triple integrals?

A5

Chapter 12 (Integration on R2 and R3) covers double integrals, triple integrals, and change of variables.
Q6

Is there a dedicated section for linear transformation and homomorphism?

A6

Chapter 2 (Linear Transformation or Vector Space Homomorphism) covers kernel, image, and rank-nullity theorem.
Q7

Does the syllabus include functions of several variables?

A7

Yes, Chapter 11 (Functions of Several Variables) covers partial derivatives, maxima minima, and Jacobians.
Q8

Which chapter covers gradient, divergence, and curl?

A8

Chapter 13 (Vector Calculus) covers gradient, divergence, curl, line integrals, and Stokes’ theorem.
Q9

Where can I find first and second-order differential equations?

A9

Chapter 14 (Differential Equation) covers ODEs, exact equations, and linear differential equations.
Q10

Does this edition cover continuity and differentiability in depth?

A10

Chapter 7 (Continuity and Derivative) covers limits, continuity, differentiability, and Rolle’s theorem.

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Have Doubts Regarding This Product ? Ask Your Question

Q1

Which chapter covers basis, dimension, and subspace for MSc entrance exams?

A1

Chapter 1 (Vector Space) covers basis, dimension, subspace, and linear span thoroughly.
Q2

Does the book include numerical methods for solving algebraic equations?

A2

Yes, Chapter 15 (Numerical Technique) covers root-finding, interpolation, and numerical integration.
Q3

Where can I find problems on Cauchy-Riemann equations?

A3

Chapter 16 (Complex Analysis) includes Cauchy-Riemann equations, analytic functions, and contour integration.
Q4

Which chapter helps with uniform convergence and power series questions?

A4

Chapter 10 (Uniform Convergence and Power Series) covers Weierstrass M-test and radius of convergence.
Q5

Does the book cover double and triple integrals?

A5

Chapter 12 (Integration on R2 and R3) covers double integrals, triple integrals, and change of variables.
Q6

Is there a dedicated section for linear transformation and homomorphism?

A6

Chapter 2 (Linear Transformation or Vector Space Homomorphism) covers kernel, image, and rank-nullity theorem.
Q7

Does the syllabus include functions of several variables?

A7

Yes, Chapter 11 (Functions of Several Variables) covers partial derivatives, maxima minima, and Jacobians.
Q8

Which chapter covers gradient, divergence, and curl?

A8

Chapter 13 (Vector Calculus) covers gradient, divergence, curl, line integrals, and Stokes’ theorem.
Q9

Where can I find first and second-order differential equations?

A9

Chapter 14 (Differential Equation) covers ODEs, exact equations, and linear differential equations.
Q10

Does this edition cover continuity and differentiability in depth?

A10

Chapter 7 (Continuity and Derivative) covers limits, continuity, differentiability, and Rolle’s theorem.

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