Quiz (1 point)
Prove that:
△ABC ∼ △XYZ
The following properties may be helpful:
- if △ABC ∼ △DEF, then m∠CAB = m∠FDE
- if △ABC ∼ △DEF, then m∠ABC = m∠DEF
if the following are true:
- a = b
- a = c
then b = c
if the following are true:
- a = b
- a = c
then b = c
- if (m∠ABC = m∠DEF) and (distance BC = distance EF) and (m∠BCA = m∠EFD), then △ABC ≅ △DEF
- if △ABC ≅ △DEF, then △BCA ≅ △EFD
- if △ABC ≅ △DEF, then △ABC ∼ △DEF
- if (△ABC ∼ △DEF) and (△DEF ∼ △XYZ), then △ABC ∼ △XYZ
Please write your proof in the table below. Each row should contain one claim. The last claim is the statement that you are trying to prove.