**Algebra 1 Textbook**

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Algebra is an integral and extremely important part of mathematics. To be put plainly, it is indispensable in core mathematical subjects. It also finds vast applications of itself in several science subjects, viz. Physics, Chemistry, Biology, Computer Science, Statistics, etc.It is an immensely powerful branch of math, which possesses tools to find otherwise impossible facts, figures and values. Hence, there is no doubt that students must learn this part well enough, which includes the basics of **algebra 1 textbook**.

But, what are these textbooks for and what do they say? Students must look into their books to find this answer and even after that if they cannot understand, they can approach us. The specific class of books concerned here comprises some basic parts of this subject. It initially seems that **algebra 1 textbook** includes pretty simple mathematical computations, but without a thorough learning and grip on them it is impossible to get ahead with core algebraic formulations and math.

**On this topic**

Let us first define this subject. In junior levels, it is defined as a branch of mathematics involving a lot of factors and relations between them where unknown factors are computed using predefined and verified formulas.In fact, the great Albert Einstein was once introduced to this subject as a game of hunting the animal â€˜xâ€™! However, in true sense and in higher mathematics, it is said to be a general case of geometrical mathematics.

Algebra is precisely geometry of higher dimensions where there are no pictorial representations at all. However, for initial levels the first definition is enough to deal with. This subject is made up of several parts and there are certain important terms related to them. They are:

**Constants â€“**

Mathematical objects or figures whose values never change.E.g. 4, 3.67, Ï€, etc.

**Variables â€“**

Algebraic assumed figures whose values are not certain. It changes from case to case or is yet to be found out. E.g. a, x, sinÎ¸, etc.

**Formulas/Identities â€“**

Relations amongst variables, constants and certain operations, which are always true no matter whatever values the variables adopt. E.g. the most popular, (a+b)^{2}= a^{2}+2ab+b^{2}, and so on.

**Hypotheses â€“**

Mathematical or logical relations and statements which are yet to be proved or to be disproved.

**Axioms/Postulates â€“**

Assumptions made before dealing with a certain factor or mathematical situation. They cannot be proved or disproved. E.g. Euclidean axioms, like â€˜Parallel straight lines never meetâ€™, etc.

**Theorems â€“**

Mathematical and logical statements which have been proved and verified as true.

These are basically some of the formulations and terms which a student is introduced to in **algebra 1 textbook**. They should try to go through and solve the problems in the books. If they get stuck up or face problems and doubts regarding some chapters, then they can come to us with those queries and we will be happy to help them and assist them in getting better grades in exams.

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