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Mathematics means “knowledge, study, learning”. It includes the study of topics such as arithmetic, algebra, geometry, and mathematical analysis. It has no generally accepted definition.
Several civilizations in China, India, Egypt, Central America, and Mesopotamia equally contributed to mathematics. The counting system was first developed by the Sumerians. Mathematicians developed arithmetic, which includes basic operations, like addition, subtraction, multiplication, fractions, and square roots.
As civilizations developed, mathematicians began to work with geometry, which deals with the areas and volumes to make angular measurements. Geometry is used everywhere from home construction to fashion and interior design. Moreover, geometry is that branch of mathematics, which is concerned with spatial relationships among several objects, the shape of single objects, and the properties of space surrounding us. Geometry is considered as one of the oldest branches of mathematics while the term is derived from the Greek language as geo means earth and material means measurement, meaning earth measurement.
However, after a certain point, people began to realize that geometry does not need to be limited to the study of rigid three-dimensional objects or plane and flat surfaces, but can be put to use or represented with the most abstract images and thoughts. Besides, the major branches of geometry consist of analytic geometry, Euclidean geometry, projective geometry, non-Euclidean geometries, topology, and differential geometry. Nevertheless, students do not need to go in-depth about all these concepts.
Now, let’s discuss a bit about Algebra. It is that branch of mathematics where the students usually use symbols, letters of the alphabet to get the solutions to the given problems. Now talking about its history, it can be divided into three parts. The first one is the written stage where just words were used, the second stage included the shortened or syncopated stage where symbols came into existence in the equations. The third stage is the modern or symbolic stage. Moreover, Algebra was invented in the ninth century by a Persian mathematician, Mohammed ibn-Musa al-Khowarizmi. He also developed quick methods for multiplying and dividing numbers, which are known as algorithms. The study of algebra meant mathematicians were solving linear equations and systems, as well as quadratics solutions.
Arithmetics – Numbers and Operations
Arithmetic is one of the first few subjects that you learned in lower grades. It deals with numbers and basic operations on them. It is the foundation for studying other branches of mathematics.
Arithmetic originated from the Greek word arithmos, which is a branch of mathematics that consists of the study of counting numbers and the properties of the traditional operations on them such as addition(+), subtraction(-), multiplication(x), and division(). Arithmetic is an elementary part of number theory.
In addition to basic operations, this subject also includes more advanced operations, such as percentage, square roots, exponentiation, logarithmic functions, trigonometric functions, and many more.
The four basic operations addition, subtraction, multiplication, and division are commonly referred to as the four arithmetic operations.
The four main properties of operations are:
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Commutative Property
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Associative Property
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Distributive Property
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Additive Identity
The BODMAS or PEMDAS rule is followed for order of operation involved +, −,×, and ÷. The order of operation is:
B:- Brackets
O: -Order
D: -Division
M:- Multiplication
A: -Addition
S: -Subtraction
Geometry-Shapes
Geometry is the study of shapes. It is broadly classified into two types: plane geometry and solid geometry. Plane geometry deals with two-dimensional figures like squares, circles, rectangles, triangles, and many more. Whereas Solid geometry deals with the study of three-dimensional shapes like cube, cuboid, cylinder, cone, sphere, and many more.
The study of this shape is needed to find lengths, widths, area, volume, perimeter, and many more terms.
In mathematics, we need specific terms again and again to solve problems. It becomes difficult to write the full terms repeatedly, hence the shortcuts for these terms are discovered and it is called a symbol.
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Algebra
Algebra is one of the branches of Mathematics that deals with variables and numbers. A combination of constants and variables connected by the signs of the fundamental operation of addition, subtraction, multiplication, and division is called an algebraic expression. Various parts of an algebraic expression that are separated by the signs of + or – are called the terms of the expression. An algebraic expression is defined as a sum, difference, product, or quotient of constants and variables.
Consider,
12x + 50
Here this expression is called an algebraic expression where x varies in values so it is a variable and 50 is constant. 12x and 50 are the terms and they are separated by the sign +. We can write anything a, b, c ….z in place of variables.
Algebra consists of different methods of solving a pair of linear equations:
1. Elimination method
2. Substitution method
3. Cross multiplication method
Let us understand the difference between Arithmetic and Algebra.
Difference Between Arithmetic and Algebra
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Arithmetic |
Algebra |
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Arithmetic, being the most basic of all branches of mathematics, deals with the basic counting of numbers and by using operations like addition, multiplication, division, and subtraction on them. |
Algebraic is a branch of mathematics that deals with variables and numbers for solving problems. It uses generalized rules for problem-solving. |
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Generally, associated with elementary school mathematics |
Generally, associated with high school mathematics |
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Computation with specific numbers |
Introduces generality and abstraction related concepts |
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Four operations (adding, subtracting, multiplication and division) |
Algebra uses numbers and variables for solving problems. It is based on the application of generalized rules for problem-solving |
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Based on the information provided in the problem (memorized results for small values of numbers) |
Based on the standard moves of elementary algebra |
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Number related |
Variable related |
Differences between arithmetic and algebra will make the arithmetic and algebra concepts more clear.
Let us understand the difference between Algebra and Geometry
Difference Between Algebra and Geometry
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Algebra |
Geometry |
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Algebra is a branch of mathematics that uses variables, in the forms of letters and symbols, to act as numbers or quantities in equations and formulas. |
Geometry is a branch of mathematics that studies points, lines, varied-dimensional objects and shapes, surfaces, and solids. |
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The main focuses in algebra are arithmetic, equations, and understanding relationships between variables or ratios. |
Geometry focuses on understanding the geometric shapes and using their formulas. Most formulas convey how to find missing numbers, degrees, and radians. |
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Algebra does not use angles or degrees. |
Measurements consist of determining the degrees or radians o.f angles, areas, perimeters, and points. |
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Algebra has to do with equations and formulas |
Geometry has to do with objects and shapes. |
Differences between algebra and geometry will make the algebra and geometry concepts more clear.
Fun Facts:
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It was Babylonians who came up with Algebra in 1900 BC.
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The use of signs addition(+) and subtraction(-) prove to be beneficial in performing algebraic equations. Before that, people used written words to express the functions of addition and subtraction which was a time-consuming process.
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Arithmetic is something that is always around you. Just take a look at the ice tray and pick two ice cubes out of it, how many in total are left? To find the answer to it, one must subtract the total number of ice cube slots by 2.
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The history of math goes a long way back but most of the mathematical symbols were not invented till the 16th century as equations were written in words before that.
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There is no doubt that Greeks were keen, but they used geometry in making artwork like buildings and much more, which gives students another reason to love this subject.
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The two of the most important tools of geometry that are considered powerful as they helped in the advancement and construction of the subject are straight edge and compass.