QUESTION IMAGE
Question
given $de \parallel ac$
prove $\frac{ab}{db} = \frac{cb}{eb}$
(image of triangle abc with de parallel to ac, d on ab, e on cb)
statement | reason
--- | ---
$de \parallel ac$ | given
$\square$ | when parallel lines are cut by a transversal, corresponding angles are congruent.
$\square$ | reflexive property
$\square$ | aa similarity
$\square$ | corresponding sides of similar triangles are proportional.
options:
$\because \frac{ab}{db} = \frac{cb}{eb}$
$\because \frac{ab}{db} = \frac{ce}{eb}$
$\because \angle b \cong \angle b$
$\because \angle c \cong \angle c$
$\because \angle d \cong \angle a$
$\because \angle a \cong \angle e$
$\because \triangle abc \sim \triangle dbe$
Step1: Identify Corresponding Angles
Since \( DE \parallel AC \), when transversal \( AB \) cuts them, \( \angle D \cong \angle A \) (corresponding angles). When transversal \( CB \) cuts them, \( \angle E \cong \angle C \) (though we'll use the first pair and the common angle).
Step2: Identify Common Angle
\( \angle B \cong \angle B \) (reflexive property).
Step3: Apply AA Similarity
With \( \angle D \cong \angle A \) and \( \angle B \cong \angle B \), by AA (Angle - Angle) similarity, \( \triangle ABC \sim \triangle DBE \).
Step4: Use Proportional Sides
Since \( \triangle ABC \sim \triangle DBE \), corresponding sides are proportional. So, \( \frac{AB}{DB}=\frac{CB}{EB} \) (corresponding sides \( AB \) & \( DB \), \( CB \) & \( EB \)).
Now, filling the table:
- First blank (corresponding angles): \( \boldsymbol{\angle D \cong \angle A} \)
- Second blank (reflexive property): \( \boldsymbol{\angle B \cong \angle B} \)
- Third blank (AA Similarity): \( \boldsymbol{\triangle ABC \sim \triangle DBE} \)
- Fourth blank (proportional sides): \( \boldsymbol{\frac{AB}{DB}=\frac{CB}{EB}} \)
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- First row (Reason: When parallel lines...): \( \angle D \cong \angle A \)
- Second row (Reason: Reflexive property): \( \angle B \cong \angle B \)
- Third row (Reason: AA Similarity): \( \triangle ABC \sim \triangle DBE \)
- Fourth row (Reason: Corresponding sides...): \( \frac{AB}{DB}=\frac{CB}{EB} \)