Table of Contents
What is Infinitesimal Meaning?
The infinitesimal calculus is a branch of mathematics that deals with the properties of infinitely small quantities. It is a powerful tool for solving problems in physics and engineering.
Define Infinitesimally Small
The term infinitesimally small is used to describe something that is extremely tiny. It can be used to describe the size of an object or the distance between two objects.
History of Infinitesimal
Calculus
The history of infinitesimal calculus is long and complex. It is often said to have begun with the ancient Greek mathematician Archimedes, who developed a method for finding the area of a curved shape. This method involved breaking the shape down into a series of smaller and smaller shapes, each of which had a known area. Archimedes was not able to calculate the exact area of the original shape, but he could calculate the area of each smaller shape and then add them all up.
In the 16th century, the Italian mathematician Leonardo Fibonacci developed a similar method for finding the volume of a curved object. His method involved breaking the object down into a series of smaller and smaller cubes, and then calculating the volume of each cube.
In the 17th century, the German mathematician Gottfried Wilhelm Leibniz developed a new way of thinking about mathematics that made it possible to calculate the area and volume of a curved object using infinitesimals. An infinitesimal is a number that is so small that it is impossible to calculate its exact value. Leibniz’s method involved dividing a curved shape into an infinite number of infinitely small pieces. He was then able to calculate the area and volume of the shape by adding up the areas and volumes of all the pieces.
Leibniz’s method was controversial, and many other mathematicians disagreed with his approach. It was not until the 19th century that
First Order Properties of Infinitesimal
Infinitesimal numbers are numbers that are smaller than any other number. They are used in mathematics to help describe the properties of other numbers. Some of the most important properties of infinitesimal numbers are that they are:
1. Nonzero
2. Negative or positive
3. Less than any other number
4. Cannot be divided into smaller numbers
5. Cannot be expressed in terms of other numbers
Laurent Series
In mathematics, a Laurent series is a power series representation of a function in a neighborhood of a point in the complex plane. In other words, a Laurent series is a representation of a function as a sum of terms involving powers of a complex variable, with some of the terms negative.
The Laurent series for a function “f” at a complex number “z” is the power series
The coefficients “a” are called the Laurent coefficients.
The Laurent series is named after Jules François Antoine Laurent.
The Laurent series is a special case of a more general formula, the Puiseux series.
The Laurent series can be used to calculate the function near the point “z”. For example, the Laurent series for the function “f”(“x”) = “x” near the point “z” = 0 is
The Laurent series can also be used to calculate the function’s derivative near the point “z”. For example, the Laurent series for the derivative of “f”(“x”) = “x” near the point “z” = 0 is
The Laurent series can also be used to calculate the function’s integral near the point “z”. For example, the Laurent series for the integral of “f”(“x”) = “x” near the point “z” = 0 is
The Laurent series can also be used to calculate the function’s complex conjugate near the point “z”.
The Levi-Civita Field
In mathematics, the Levi-Civita field is a differential field associated to a Lie group. It is a rank-1 tensor field that is divergence-free and curl-free. It is often used in the study of Lie groups and Lie algebras.
The Levi-Civita field can be defined in terms of the Levi-Civita symbol:
where “g” is a Lie group and “a” is an element of “g”. The Levi-Civita field is then the vector field associated to the Levi-Civita symbol.
The Levi-Civita field is divergence-free and curl-free because the Levi-Civita symbol is divergence-free and curl-free.
Surreal Numbers
A surreal number is a number that is not real, but can be constructed using certain procedures.
To construct a surreal number, first create a list of all the real numbers. Next, create a new list that includes all the pairs of real numbers that are next to each other on the original list. Finally, create a new list that includes all the triplets of real numbers that are next to each other on the original list.
The first surreal number is the number that is the sum of all the numbers in the first list. The second surreal number is the number that is the sum of all the numbers in the second list. The third surreal number is the number that is the sum of all the numbers in the third list.
The fourth surreal number is the number that is the sum of all the numbers in the first list, plus the number that is the sum of all the numbers in the second list, plus the number that is the sum of all the numbers in the third list.
Hyperreals
Hyperreals are a subset of the reals that are larger than the reals, but still countable. The hyperreals are denoted by the symbol ℝ*.
The hyperreals can be thought of as the “real numbers plus infinity”. Just as the natural numbers are a subset of the integers, the hyperreals are a subset of the reals.
The hyperreals are used in mathematical analysis to deal with quantities that are too large or too small to be handled by the reals. For example, the hyperreal number π represents the ratio of the circumference of a circle to its diameter, which is a quantity that is too large to be handled by the reals.
Superreals
Superreals are a subset of the reals that includes all real numbers and all infinitesimal numbers.
Superreals are used in mathematics to provide a more complete description of the real number line than is possible with just the reals. In addition to the real numbers, the superreal number line includes all infinitesimal numbers, which allows for a more accurate representation of the continuum.
Smooth Infinitesimal Analysis
Smooth infinitesimal analysis is a branch of mathematics that deals with the behavior of functions and their derivatives near points where the derivatives vanish. This area of mathematics was developed in the early 1800s by the mathematicians Cauchy and Weierstrass.