a) Prove that if two triangles \( \triangle ABC \) and \( \triangle A'B'C' \) are similar, then the lengths of their sides are proportional in order:
\[ \frac{|AB|}{|A'B'|} = \frac{|BC|}{|B'C'|} = \frac{|CA|}{|C'A'|} \]
Diagram:
Given:
- \( \triangle ABC \) and \( \triangle A'B'C' \) are similar - Leaving Cert Mathematics - Question 6 - 2021
Question 6
a) Prove that if two triangles \( \triangle ABC \) and \( \triangle A'B'C' \) are similar, then the lengths of their sides are proportional in order:
\[ \frac{|AB|}... show full transcript
Worked Solution & Example Answer:a) Prove that if two triangles \( \triangle ABC \) and \( \triangle A'B'C' \) are similar, then the lengths of their sides are proportional in order:
\[ \frac{|AB|}{|A'B'|} = \frac{|BC|}{|B'C'|} = \frac{|CA|}{|C'A'|} \]
Diagram:
Given:
- \( \triangle ABC \) and \( \triangle A'B'C' \) are similar - Leaving Cert Mathematics - Question 6 - 2021
Step 1
Given / Diagram
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Answer
Given: ( \triangle ABC ) and ( \triangle A'B'C' ) are similar.
Step 2
To Prove:
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Answer
The lengths of the sides of the triangles are proportional in order:
[ \frac{|AB|}{|A'B'|} = \frac{|BC|}{|B'C'|} = \frac{|CA|}{|C'A'|} ]
Step 3
Construction:
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Answer
Mark ( B'' ) on ( AB ) such that ( |AB''| = |A'B'| ).
Mark ( C'' ) on ( AC ) such that ( |AC''| = |A'C'| ).
Join ( B''C'' ).
Step 4
Proof:
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Answer
( \triangle A'B'C' ) is congruent to ( \triangle ABC ) (Reason: SAS).
Therefore, ( B''C'' \parallel BC ) due to corresponding angles: ( \angle A'B'C' = \angle ABC ).
This implies that ( \frac{|AB|}{|A'B'|} = \frac{|AC|}{|A'C'|} ) and similarly for the other sides.
Step 5
Given:
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Answer
Lines ( PA, HK, ) and ( BR ) are parallel.
Step 6
To Prove:
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Answer
|AP| \times |QB| = |AP| \times |HB|.
Step 7
Geometrical Statements:
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Answer
( |HQ| = |HB| ) alternate segments.
( \angle QHB = \angle QAP ) are equal because they are alternate interior angles (PA || HK).
Since triangles are similar, we can state that ( |AP| \times |QB| = |AP| \times |HB| ).
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![a)-Prove-that-if-two-triangles-\(-\triangle-ABC-\)-and-\(-\triangle-A'B'C'-\)-are-similar,-then-the-lengths-of-their-sides-are-proportional-in-order:--\[-\frac{|AB|}{|A'B'|}-=-\frac{|BC|}{|B'C'|}-=-\frac{|CA|}{|C'A'|}-\]--Diagram:--Given:---\(-\triangle-ABC-\)-and-\(-\triangle-A'B'C'-\)-are-similar-Leaving Cert Mathematics-Question 6-2021.png](https://cdn.simplestudy.cloud/assets/backend/uploads/question/20230303200545.png)
