Proof: Similar Triangles Example 2

Let's prove the following theorem:

if ∠ZXY is a right angle and ∠XPY is a right angle and m∠YPZ = 180, then △PYX ∼ △XYZ

X Y Z P

Proof:

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Given
1 ZXY is a right angle
2 XPY is a right angle
3 m∠YPZ = 180
Proof Table
# Claim Reason
1 m∠XYZ = m∠XYP if m∠YPZ = 180, then m∠XYZ = m∠XYP
2 m∠XYZ = m∠PYX if m∠XYZ = m∠XYP, then m∠XYZ = m∠PYX
3 m∠ZXY = m∠XPY if ∠ZXY is a right angle and ∠XPY is a right angle, then m∠ZXY = m∠XPY
4 XYZ ∼ △PYX if m∠ZXY = m∠XPY and m∠XYZ = m∠PYX, then △XYZ ∼ △PYX
5 PYX ∼ △XYZ if △XYZ ∼ △PYX, then △PYX ∼ △XYZ

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