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
Proof:
Given
| 1 | ∠ZXY is a right angle |
|---|---|
| 2 | ∠XPY is a right angle |
| 3 | m∠YPZ = 180 |
| # | 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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