Any major competitive exam in India, such as IBPS PO, IBPS Clerk, SBI PO, SBI Clerk, SSC CGL, SSC CHSL, and more are known to turn up the difficulty level of the exam with every passing year. An aspirant looking to join any of the government jobs faces his biggest challenge in the Quantitative Aptitude section of these exams.

Generally speaking, the questions in this section would have a situation explained where few conditions are provided. The trick is to understand the given conditions correctly and get the required answer for the question, all under the matter of a few seconds. All these conditions can be framed in terms of equations and to get the required answer, the aspirant needs to solve the equation correctly.

It is very important to understand how to frame the different equations and how to solve the equation to get the required answer.

**What Are The Different Types of Equations**

There are, of course, other types of equations such as cubic equations, but from a competitive exam’s point of view, it would suffice to understand just the two mentioned above.

**What is Linear Equation?**

In a Linear Equation, the power or the degree of the variable(s) is 1 and it does not occur in any other powers.

Explanation: Variable is the unknown value that needs to be determined. And constants are the values already given in the conditions in the question.

In the general form given above,

Points to remember: In a linear equation with 1 variable, only one such equation is needed to find the solution. However, in a case of equations with 2 variables, where we are required to find values of 2 unknown, we need 2 linear equations. And quite similarly, to solve and find the values of 3 variables in a linear equation, we need to have 3 different linear equations.

In bank exams and many other competitive exams, linear equations with 3 variables are very rare.

Example 1:

Linear equation with 1 variable:

Solution:

In order to solve a linear equation, we must take the known values on the right-hand side by changing the signs.

**x = 3**

Explanation: When the variable x is substituted with its value 3, the left-hand side equals the right-hand side.

Example 2:

Linear equations with 2 variables:

Solution:

To solve linear equations with 2 variables, we must eliminate either one of them, i.e., x or y. And in order to do that, the coefficients of the variables in the 2 equations must be equated.

To equate the coefficients of x in both these equations, we must multiply the first equation with the coefficient of the second and the second equation with that of the first.

First Equation:

Second Equation:

To get the value of x, we must subtract the 2 equations:

**y = 2**

We eliminated the variable x by equating the corresponding coefficients and then subtracting the 2 equations to find y.

Since we now have y, we can substitute the variable with its value in any of the equation and find out the value of the other variable, x.

**x = 3**

Example 3:

Solve the equations given below and establish the relationship between x and y.

Solution:

We can easily equate the coefficients of x in the 2 equations by multiplying the second equation with 2.

To get the value of x, we must subtract the 2 equations:

**y = 9**

Substituting value of y in the first equation:

**x = 5**

**x<y**

**x = -4/3**

**y = -16/9**

**x>y**

**x = 28**

**y = 28**

**x=y**

**x = 600**

**y = 1000**

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