 Hi, and welcome to the session. Let us just ask the following question. The question says, find equation of the line parallel to the line 3x minus 4 y plus 2 is equal to 0 and passing through the point minus 2 3. Now before solving this question, we should know that equation of line 2 point 1 y1 by slope m is given by y minus y1 is equal to n into x minus x1. You should also know that lines have equal slopes. That equation of line passing through point x1 y1 and having slope m is y minus y1 is equal to m into x minus x1 equal to slopes. Now begin with the solution. We have to find the equation of line parallel to the line 3x minus 4 y plus 2 is equal to 0. Since the required line is parallel to this line, therefore slope of required line is equal to the slope of line 3x minus 4 y plus 2 is equal to 0. And the required line also passes through the point minus 2 3. So in determining the slope of the required line, we can easily find its equation by using the formula y minus y1 is equal to m into x minus x1. So let's first find the slope of the required line. Now the given line is 4 y plus 2 is equal to 0. This minus 4 y is equal to minus 3x minus 2 implies y is equal to 3 y in this equation as equation number 1. On comparing equal to mx plus c, we find that 3 by 4 required line is 4 y to 0. Therefore, equation of line passing through x1 y1 and having slope m is y minus y1 is equal to m into x minus x1. Now here the required line passes through. So this mean is equal to minus. And we know that x1 y1, the equation y minus y1 is equal to m into, substituting the values, we get y is equal to 3 by 4 into x minus minus 2 is equal to 3 by 4 into x plus 2 is equal to 3x minus 12 minus 6 is equal to 0. This implies minus 3x y minus 18 is equal to 0. This implies 3x minus 4 y plus 18 is equal to 0. Hence the required equation of line minus 4 y 18 is equal to 0. This is our required answer. So this completes the session I and Take Kill.