z_n  = z  x_n  = x  and  y_n  = y.

Proof () Given > 0 there exist  N₁, N₂ :

{  1  } | x_n – x | < /₂ ,  n > N₂ {  2  }.

So {  3  } | x_n – x | + | y_n – y | < .
Now | x_n + iy_n – (x + iy) | {  4  } < .    So  z_n  = z.

Match the above boxes 1, 2, 3, 4 with the selections
(a) n > N₁, (b) n > max(N₁, N₂), (c) | y_n – y | < /₂, (d) | x_n – x | + | y_n – y |.

My solutions: