Let's look at the figure to deduce the coordinates of the points:
[tex] A = (0,6),\quad B = (6,8),\quad C = (6,0),\quad D = (0,-2) [/tex]
Now recall the formula to compute the distance between two points [tex] P = (P_x, P_y), Q = (Q_x, Q_y) [/tex]:
[tex] d(P,Q) = \sqrt{(P_x-Q_x)^2 + (P_y - Q_y)^2} [/tex]
One diagonal is the distance between A and C, so the formula becomes
[tex] d(A,C) = \sqrt{(0-6)^2 + (6-0)^2} = \sqrt{36+36} = \sqrt{72} = 6\sqrt{2} [/tex]
Similarly, the other diagonal is the distance between B and D, so the formula becomes
[tex] d(B,D) = \sqrt{(6-0)^2 + (8-(-2))^2} = \sqrt{36+100} = \sqrt{136} = 2\sqrt{34} [/tex]
So, the lengths of the two diangonals are not the same
