 Hello and welcome to the session. In this session we will discuss a question which says that find the approximate solution of the following system of equations and the equations are y is equal to x minus 2 whole square and x minus 2 whole square plus y square is equal to 4. Now let us start with the solution of the given question. Now we have given the system of equations. Let this be equation number 1 and this be equation number 2. Now we want to find its solution. Let us draw the graph of the two equations. Let us take the first equation. Now the first equation is of the form y is equal to x square which is equation of a parabola that is an upward parabola. Now let us draw its graph. So this is the graph of the first equation that is y is equal to x minus 2 whole square which is an upward parabola with vertex 2 0. Now the second equation is of the form x minus h whole square plus y minus k whole square is equal to r square that is equation of circle with center k and radius. So we can write the given equation as x minus 2 whole square plus y minus 0 whole square is equal to 2 square. This is the equation of circle with center k that is 2 0 and radius that is 2. So let us draw its graph which will be a circle with center 2 0 and radius 2 0. This is the circle with center. This is the graph of second equation. Now in this graph you can see that the two curves intersect each other at two points that is point A and point B. Now here we can see that for point A x coordinate is approximately 0.7 and y coordinate is approximately 1.5. So point A has coordinates 0.7, 1.5 similarly point B has coordinates 3.3, 1.5. Now these two points give the solution of the given system of equations. The approximate solutions of the given system of equations are the order pair 0.7, 1.5 and the order pair 3.3, 1.5. So this is the solution of the given question. That is all for this session. Hope you all have enjoyed the session.