Answer: The correct option is (A) ∠XWY ≅ ∠ZWY.
Step-by-step explanation: We are given to select the correct additional information that is needed to prove the triangles WXY and WZY are congruent by the SAS Postulate.
From the figure, we notice that
in triangles WXY and WZY, we have
WX ≅ WZ [Given]
WY ≅ WY [Common side to both the triangles]
So, to prove that ΔWXY ≅ ΔWZY by SAS (side-angle-side) postulate, the angle lying between the corresponding pair of sides must be congruent.
In triangle XWZ, angle lying between the sides WX and WY is ∠XWY,
in triangle ZWY, angle lying between the sides WZ and WY is ∠ZWY.
Therefore, we must have
∠XWY ≅ ∠ZWY.
Thus, the correct option is (A) ∠XWY ≅ ∠ZWY.