The correct answer is D.
In fact, when written in the form [tex] y=mx+q [/tex], [tex] m [/tex] represents the slope of the line, and two lines are parallel if they have the same slope.
In this case, the slopes are not the same (they are [tex] 2 [/tex] and [tex] -2 [/tex], respectively), so option C is wrong.
And neither they are the same line, because the equations are different, so option A is wrong as well.
Finally, the lines intersect, because if you ask
[tex] 2x+5=-2x+5 [/tex]
you get
[tex] 4x=0 \iff x=0 [/tex]
and so [tex] (0,5) [/tex] is the point of intersection, and option B is wrong as well.
