Option B:
ASA congruence
Solution:
Step 1: Given
[tex]\overline{Q S} \perp \overline{Q T}[/tex]
Step 2: Given
[tex]\overline{R T} \perp \overline{R S}[/tex]
Step 3: Given
[tex]\overline{Q U} \cong \overline{R U}[/tex] (Included side)
Step 4: All right angles are congruent.
[tex]\angle Q \cong \angle R[/tex] (Angle)
Step 5: By vertical angle theorem
[tex]\angle Q U T \cong \angle R U S[/tex] (Angle)
Step 6: By ASA congruence
QU and RU are included side of corresponding angles.
Therefore by ASA congruence rule,
[tex]\Delta Q T U \cong \Delta R S U[/tex]
Option B is the correct answer.
Hence proved.
