Hello friends,"BEST IITJEE PREPARATION BOOKS" welcomes you, in this post i am going to post a new book that is extremely helpful to test your commands over calculus of one variables. And the name of the book is "I.A Maron problems in calculus of one variable. This book starts with a clear vision of providing the students the best information on calculus of one variable.

This book has each and every topic you are looking for. The book was designed for students who are JEE aspirants to provide them the best material in calculus. A deep concept is given with well proper and good explanation. Along with this a lot of good illustrations are given with solution so that the students could grasp what the author is exactly wanting to say. A lot of solved and unsolved questions are given for practice.

This book is one of the best book available in market if you really want to study calculus in deep through. But as far as JEE is considered a lot of such topics are also given which are not generally asked by jee so instead of wasting time on those topics you can practice other good questions from this book which are asked by the examiner too. Proper cut defination and define terms are also given for better understanding of the student. Formulae is given in simpler terms. I got to know about this book from my cousin brother who is perusing his engineering graduation from iit delhi in computer science branch. I am not saying that everyone will like this book, as its level is too hard.

MUST WATCH:[G.N Berman] a strong alternate of this book:-http://bit.ly/2pp4ow8

But as far as calculus is considered as a main part of jee exam then it is necessary that your calculus part should be strong and if you solved this book throughly then your confidence will surely increase and your potential will also increase. Atleast everyone should try this book once. May be you love this book.

The book consist of the following topics- Introduction to mathmatical analysis, real numbers, the absolute value of a real number, functions, domain of defination, investigation of functions, inverse function, graphical representation of functions, number sequence, limits of a sequence, evaluation of limits of sequence, testing sequence for convergence, the limits of a function, calculations of limits of a function, infinitesimal and infinite functions, their defination and comparison, equivalent infinitesimal, find their limits, one sided limits, continuity of a function and discontinuity and their comparison, arithmatical functions on a continuous function, its application the properties of a function to be continuous in a closed interval, optional exercise, defination of derivatives, solutions to explicit functions, successive differentiation of explicit function called leibnitz rule. Differentiation of implicit, inverse and parametric functions, application of derivatives, derivative to approxiation function.

Morever it has evaluation of intermediate form called L hospital rule, tailor's series and their applications. Testing a function of its monotonicity, maxima and minima, finding the greatest and least integer function value, convexity and conclaxity of a function means point of inflection, asymptotes, direct integration and methods of inspection, integration by substitution integration by parts reduction methods

Integration of rational and irrational functions euler's substitution other methods to find integration integration of binomial differention integration of trignometric and hyperbolic equations integration by substitution in hyperbolic expressions. Integral by the lebniz theorem based questions, in which you have to integrate just by putting upper value and then differentiate it and then subtract the lower limit put and its differentiation. Definite integral whose exact value can be find by the given limits we have to subtract the upper to the lower limit it has more properties and last one indefinite integration which has no fix value because there is no limits thus we add a P as a constant there.

So friends, Its a very good content book so follow it and keep practising regularly.

That's all in this post. If you have any query, doubt or want to suggest a book to post, then please let me know by email or comment in the comment box. I will try to resolve that issue and do my best want i can do. Till then keep practising and remember the aim-IITJEE.

• Purchase this excellent book at lowest price from here:-

http://amzn.to/2FGSEhC

• Download free pdf of book from here:-

I.A Maron

This book has each and every topic you are looking for. The book was designed for students who are JEE aspirants to provide them the best material in calculus. A deep concept is given with well proper and good explanation. Along with this a lot of good illustrations are given with solution so that the students could grasp what the author is exactly wanting to say. A lot of solved and unsolved questions are given for practice.

This book is one of the best book available in market if you really want to study calculus in deep through. But as far as JEE is considered a lot of such topics are also given which are not generally asked by jee so instead of wasting time on those topics you can practice other good questions from this book which are asked by the examiner too. Proper cut defination and define terms are also given for better understanding of the student. Formulae is given in simpler terms. I got to know about this book from my cousin brother who is perusing his engineering graduation from iit delhi in computer science branch. I am not saying that everyone will like this book, as its level is too hard.

MUST WATCH:[G.N Berman] a strong alternate of this book:-http://bit.ly/2pp4ow8

But as far as calculus is considered as a main part of jee exam then it is necessary that your calculus part should be strong and if you solved this book throughly then your confidence will surely increase and your potential will also increase. Atleast everyone should try this book once. May be you love this book.

BEST IITJEE PREPARATION BOOKS |

The book consist of the following topics- Introduction to mathmatical analysis, real numbers, the absolute value of a real number, functions, domain of defination, investigation of functions, inverse function, graphical representation of functions, number sequence, limits of a sequence, evaluation of limits of sequence, testing sequence for convergence, the limits of a function, calculations of limits of a function, infinitesimal and infinite functions, their defination and comparison, equivalent infinitesimal, find their limits, one sided limits, continuity of a function and discontinuity and their comparison, arithmatical functions on a continuous function, its application the properties of a function to be continuous in a closed interval, optional exercise, defination of derivatives, solutions to explicit functions, successive differentiation of explicit function called leibnitz rule. Differentiation of implicit, inverse and parametric functions, application of derivatives, derivative to approxiation function.

Morever it has evaluation of intermediate form called L hospital rule, tailor's series and their applications. Testing a function of its monotonicity, maxima and minima, finding the greatest and least integer function value, convexity and conclaxity of a function means point of inflection, asymptotes, direct integration and methods of inspection, integration by substitution integration by parts reduction methods

Integration of rational and irrational functions euler's substitution other methods to find integration integration of binomial differention integration of trignometric and hyperbolic equations integration by substitution in hyperbolic expressions. Integral by the lebniz theorem based questions, in which you have to integrate just by putting upper value and then differentiate it and then subtract the lower limit put and its differentiation. Definite integral whose exact value can be find by the given limits we have to subtract the upper to the lower limit it has more properties and last one indefinite integration which has no fix value because there is no limits thus we add a P as a constant there.

So friends, Its a very good content book so follow it and keep practising regularly.

That's all in this post. If you have any query, doubt or want to suggest a book to post, then please let me know by email or comment in the comment box. I will try to resolve that issue and do my best want i can do. Till then keep practising and remember the aim-IITJEE.

• Purchase this excellent book at lowest price from here:-

http://amzn.to/2FGSEhC

• Download free pdf of book from here:-

I.A Maron

Bhai agar ho sake to cengage algebra post kijiye

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