Calculus: Learn it Easily with Comics
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Description
Book Introduction
For those who want to study social and scientific phenomena with a new approach!
This book depicts the process by which the protagonist, a new employee at a newspaper company, uses differentiation and integration to solve various problems he encounters while working as a reporter.
By encountering the various situations the protagonist encounters, you can understand how differentiation and integration are used in fields such as physics, statistics, and economics.
Moreover, while many existing books approach differentiation and integration using limits, this book explains various formulas related to differentiation and integration in an easy-to-understand way through the concept of 'approximation'.
In addition, this book explains topics that are difficult to grasp no matter how many times you hear them, such as trigonometric functions and integration of exponential and logarithmic functions, using a unique method that is not a textbook-style teaching method.
This book is perfect for tackling differentiation and integration with a fresh approach.
Also, if you read this book in comic form, you can get more information than if you read the novel.
Because it presents visual data efficiently, it is easier to understand and more enjoyable to read.
In particular, since differentiation and integration are mathematics that describe dynamic phenomena, they can be effectively learned through comics.
This book depicts the process by which the protagonist, a new employee at a newspaper company, uses differentiation and integration to solve various problems he encounters while working as a reporter.
By encountering the various situations the protagonist encounters, you can understand how differentiation and integration are used in fields such as physics, statistics, and economics.
Moreover, while many existing books approach differentiation and integration using limits, this book explains various formulas related to differentiation and integration in an easy-to-understand way through the concept of 'approximation'.
In addition, this book explains topics that are difficult to grasp no matter how many times you hear them, such as trigonometric functions and integration of exponential and logarithmic functions, using a unique method that is not a textbook-style teaching method.
This book is perfect for tackling differentiation and integration with a fresh approach.
Also, if you read this book in comic form, you can get more information than if you read the novel.
Because it presents visual data efficiently, it is easier to understand and more enjoyable to read.
In particular, since differentiation and integration are mathematics that describe dynamic phenomena, they can be effectively learned through comics.
index
preface
◈ What is a prolog function?
◈ Chapter 1 Differentiation is analyzing a function by cutting it into smaller pieces.
1.
Advantages of approximating with functions
2.
Let's pay attention to the error rate.
3.
Functions used in real life
4.
Finding an approximate linear function
* Practice problems
◈ Chapter 2: Let's learn the techniques of differentiation.
1.
Differentiation of agreement
2.
Differentiation of product
3.
Differentiation of polynomials
4.
Differentiation = 0, we can find the maximum and minimum
5.
Mean theorem
* Practice problems
◈ Chapter 3 Integration is the summing of quantities that change smoothly.
1.
Introduction to the Fundamental Theorem of Calculus
2.
Fundamental Theorem of Calculus
3.
Integration formula
4.
Application of the basic theorem
5.
Verification of the fundamental theorem of calculus
* Practice problems
◈ Chapter 4: Solve unusual functions using integration
1.
Where are trigonometric functions used?
2.
Cosine is an orthogonal projection
3.
Trigonometric functions can be learned by integration first.
4.
Exponents and logarithms
5.
To generalize exponents and logarithms
6.
Theorems of exponential and logarithmic functions
* Practice problems
◈ Chapter 5 Taylor expansion is a typical example of an approximate function.
1.
Approximate polynomial
2.
Finding the Taylor expansion
3.
Taylor expansion of various functions
4.
What can we learn from Taylor expansion?
* Practice problems
◈ Chapter 6 Partial differentiation is differentiating only one variable in a multivariate system.
1.
What is a multivariable function?
2.
Learn the basics of two-variable linear functions
3.
The differentiation of a two-variable function is called a partial differentiation.
4.
Understanding the formula for total differentiation
5.
Application to extreme value conditions
6.
Let's apply partial differentiation to economics.
7.
The partial differentiation formula for composite functions of multiple variables uses the chain rule.
* Practice problems
◈ Epilogue: Why Should We Learn Mathematics?
Appendix A: Answers and Explanations to Practice Problems
Appendix B Important Formulas, Theorems, and Functions Covered in This Book
Search
◈ What is a prolog function?
◈ Chapter 1 Differentiation is analyzing a function by cutting it into smaller pieces.
1.
Advantages of approximating with functions
2.
Let's pay attention to the error rate.
3.
Functions used in real life
4.
Finding an approximate linear function
* Practice problems
◈ Chapter 2: Let's learn the techniques of differentiation.
1.
Differentiation of agreement
2.
Differentiation of product
3.
Differentiation of polynomials
4.
Differentiation = 0, we can find the maximum and minimum
5.
Mean theorem
* Practice problems
◈ Chapter 3 Integration is the summing of quantities that change smoothly.
1.
Introduction to the Fundamental Theorem of Calculus
2.
Fundamental Theorem of Calculus
3.
Integration formula
4.
Application of the basic theorem
5.
Verification of the fundamental theorem of calculus
* Practice problems
◈ Chapter 4: Solve unusual functions using integration
1.
Where are trigonometric functions used?
2.
Cosine is an orthogonal projection
3.
Trigonometric functions can be learned by integration first.
4.
Exponents and logarithms
5.
To generalize exponents and logarithms
6.
Theorems of exponential and logarithmic functions
* Practice problems
◈ Chapter 5 Taylor expansion is a typical example of an approximate function.
1.
Approximate polynomial
2.
Finding the Taylor expansion
3.
Taylor expansion of various functions
4.
What can we learn from Taylor expansion?
* Practice problems
◈ Chapter 6 Partial differentiation is differentiating only one variable in a multivariate system.
1.
What is a multivariable function?
2.
Learn the basics of two-variable linear functions
3.
The differentiation of a two-variable function is called a partial differentiation.
4.
Understanding the formula for total differentiation
5.
Application to extreme value conditions
6.
Let's apply partial differentiation to economics.
7.
The partial differentiation formula for composite functions of multiple variables uses the chain rule.
* Practice problems
◈ Epilogue: Why Should We Learn Mathematics?
Appendix A: Answers and Explanations to Practice Problems
Appendix B Important Formulas, Theorems, and Functions Covered in This Book
Search
GOODS SPECIFICS
- Date of issue: August 7, 2024
- Page count, weight, size: 240 pages | 182*235*20mm
- ISBN13: 9788931575545
- ISBN10: 8931575548
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