 Hi, and welcome to this session. Let's discuss the following question. The question says, draw the graph of each of the following linear equations in two variables. Second equation is x minus y is equal to 2. Let's now start the solution. Given linear equation is x minus y is equal to 2. We have to draw the graph of this equation. For drawing the graph, we need at least two solutions of this equation. So let's first find the two solutions of this equation. For drawing the graph of this equation, we need at least two solutions of this equation. So let's first find two solutions of this equation. When x is equal to 0, then the given equation reduces to 0 minus y is equal to 2. Right, and this implies that minus y is equal to 2 and this implies that y is equal to minus 2. Now we will find the second solution. When y is equal to 0, then given equation reduces to x minus 0 is equal to 2. Right, and this implies that x is equal to 2. So when y is equal to 0, then x is equal to 2. Let's now represent this solution in the table of form. So let's make a table. When x is equal to 0, then y is equal to minus 2. And when y is equal to 0, then x is equal to 2. Let's now represent this solution on the graph. We have drawn the two coordinate axes x and y. We have marked the positive numbers to the right of the origin and negative numbers to the left of origin on the x-axis. And we have marked the positive numbers above the origin and negative numbers below the origin on the y-axis. And we have chosen one unit as one centimeter. Now we will plot the solutions on the graph. When x is equal to 0, then y is equal to minus 2. And when y is equal to 0, then x is equal to 2. Let's first plot the point 0 minus 2. Now when x is equal to 0, then y is equal to minus 2. This is the first required point. And the second point is 2, 0. So when y is equal to 0, then x is equal to 2. This is the second required point. Now we will draw the line to join these two points. This is the line which is representing the equation x minus y is equal to 2. So this completes the solution. Bye and take care.