Question 360958
Not necessarily! <br>

It is easy to make a linear equation that will satisfy the first point (2,3)<br>

For example, one equation that would work is {{{y=x+1}}}<br>

If you plug in the point (2,3) it will be a true statement, ie {{{3=3}}}<br>

Now use the other point, plugging in (3,2) into the equation.<br>

You will get a false statement, ie {{{2=4}}}<br>

We could find a line that has (2,3) and (3,2) as solutions, but it looks like in this example you needed to find a way to show that both points will not necessarily be a solution to the same linear equation.<br>

Try to find another linear equation that (2,3) would be a solution for, but (3,2) would not, and then you will have support for your answer.<br>

I hope this helps!<br>