Define the product topology on X x Y. Denote this topology by T and show that Tx: (X x Y,T) → (X, T₁) (x,y) → x is continuous. Keeping the notation from (iii), let T be another topology on X x Y, such that TX: (X ×Y,7) → (X,T) (x, y) → x and Ty : (X × Y, Ť) → (X, T₂) (x, y) → y are continuous. Show that TCT.
