QUESTION IMAGE
Question
in the following triangle, \\(\frac{ec}{ae} = \frac{db}{ad}\\).
below is the proof that \\(\overline{ed} \parallel \overline{cb}\\). the proof is divided into two parts, where the title of each part indicates its main purpose.
complete part b of the proof.
part a: prove \\(\frac{ac}{ae} = \frac{ab}{ad}\\)
show the steps.
part b: prove \\(\overline{ed} \parallel \overline{cb}\\)
| statement | reason |
|---|---|
| 9 \\(\triangle aed \sim \triangle\\) abc | side - side - side similarity (part a, 8) |
| 10 \\(\angle 1 \cong \angle 2\\) | measures of corresponding angles of similar triangles are equal. (9) |
| 11 \\(\overline{ed} \parallel \overline{cb}\\) | if a transversal crosses two lines and corresponding angles are congruent, then the lines are parallel. (10) |
Step1: Confirm reflexive angle
$\angle A \cong \angle A$
Step2: Prove triangle similarity
$\triangle AED \sim \triangle ABC$ (by side-side-side similarity, using $\frac{AC}{AE}=\frac{AB}{AD}$ from Part A and $\angle A \cong \angle A$)
Step3: State congruent corresponding angles
$\angle 1 \cong \angle 2$ (corresponding angles of similar triangles are congruent)
Step4: Conclude parallel lines
$\overline{ED} \parallel \overline{CB}$ (if corresponding angles from a transversal are congruent, lines are parallel)
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The completed Part B proof is:
- $\boldsymbol{\angle A \cong \angle A}$ | Reflexive property
- $\boldsymbol{\triangle AED \sim \triangle ABC}$ | Side-side-side similarity (Part A, 8)
- $\boldsymbol{\angle 1 \cong \angle 2}$ | Measures of corresponding angles of similar triangles are equal. (9)
- $\boldsymbol{\overline{ED} \parallel \overline{CB}}$ | If a transversal crosses two lines and corresponding angles are congruent, then the lines are parallel. (10)