Hii. I'm sharing a unique method for solving maths equations in 2 variables. As I was solving some them , I thought of experimenting with them to find a new method of my own.

Successfully I found it out :)

I searched on the internet for methods of solving linear equations in two variables. I found 3 of them - substitution method , addition method , Cramer's method , leaving the graphical one. So this one is really different from these.

In other methods , you need certain conditions so that using the methods may solve the equation easily. But this one doesn't need any conditions. It can solve all of them. Let's get started with it !

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## Step 1: Finding an Equation:

A very simple step. Choose any equation you like. Take a simple one if you are experimenting with it :)

I take it as-

8x+3y=11......(1)

3x-y=2...........(2)

## Step 2: Knowing the Way:

This is the main part. In this method , first we find out the value of x in both the equations.

So, 8x+3y=11......(1)

8x=11-3y

x=(11-3y)/8.........(a)

3x-y=2............(2)

3x=2+y

x=(2+y)/3............(b)

## Step 3: Solving Them:

As the value of x is same for both the equations, putting (a) and (b) one before the other.

(11-3y)/8=(2+y)/3

Crossmultiplying....

3(11-3y)=8(2+y)

33-9y=16+8y

33-16=8y+9y

17=17y

17/17=y

y=1

Similarly,

Finding the value of y from the equations,

8x+3y=11......(1)

3y=11-8x

y=(11-8x)/3...........(c)

3x-y=2............(2)

-y=2-3x

y=-2+3x.................(d)

Putting ( c) and (d) one before the other,

(11-8x)/3=-2+3x

11-8x=3(-2+3x)

11-8x=-6+9x

11+6=9x+8x

17=17x

17/17=x

x=1

## Step 4: Checking It:

You can check it with other methods only to find that this one is much simpler, easier and versatile. I couldn't find a platform for publishing this new method. Thanks to Instructables.

Let me know if you liked it.

## 2 Discussions

5 days ago

This is just a solution by substitution, not a different method.

Reply 2 days ago

Hii. This method is totally independent and separate from the others. In substitution method, we find the value of x and substitute in the other equation. Similarly, we find the value of y and substitute in the other equation.

In this method, we find the value of x from both the equations and equate them. Similarly, we find the value of y from the equations and equate them. This gives us the value of x and y.

Its hard to solve equations with substitution method which can be solved with addition method. It is not so with this method. Thank you for your question.