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Step1: Fill Similar Polygons definitions
- Polygons with the same shape but different size
- Polygons are similar if:
(1) Corresponding angles are congruent
(2) Corresponding sides are proportional
- The ratio of corresponding sides is called the scale factor
- If polygons are similar, then their perimeters (and corresponding heights/altitudes) are also proportional
Step2: Calculate scale factor (△ABC to △DEF)
Take ratio of corresponding sides:
$\frac{AB}{DE} = \frac{8}{12} = \frac{2}{3}$
Step3: Calculate scale factor (△DEF to △ABC)
Take reciprocal of previous ratio:
$\frac{DE}{AB} = \frac{12}{8} = \frac{3}{2}$
Step4: Calculate perimeter ratio (△DEF to △ABC)
Perimeter ratio equals scale factor of △DEF to △ABC:
$\frac{3}{2}$
Step5: Write similarity statement
Match corresponding angles (marked angles):
$\triangle ABC \sim \triangle EDF$
Symbol for Similar: $\sim$
Step6: Solve △JKL ~ △PMN
Angles:
$\angle J \cong \angle P$, $\angle K \cong \angle M$, $\angle L \cong \angle N$
Sides:
$\frac{JK}{PM} = \frac{KL}{MN} = \frac{LJ}{NP}$
Step7: Solve △XYZ ~ △RYS
Angles:
$\angle X \cong \angle R$, $\angle Y \cong \angle Y$, $\angle Z \cong \angle S$
Sides:
$\frac{XY}{RY} = \frac{YZ}{YS} = \frac{ZX}{SR}$
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Similar Polygons Notes:
- Polygons with the same shape but different size
- Polygons are similar if:
(1) Corresponding angles are congruent
(2) Corresponding sides are proportional
- The ratio of corresponding sides is called the scale factor
- If polygons are similar, then their perimeters are also proportional
Scale Factor:
- Scale factor of $\triangle ABC$ to $\triangle DEF$: $\frac{2}{3}$
- Scale factor of $\triangle DEF$ to $\triangle ABC$: $\frac{3}{2}$
- Ratio of perimeter of $\triangle DEF$ to $\triangle ABC$: $\frac{3}{2}$
Similarity Statements:
- Symbol for Similar: $\sim$
- Similarity statement: $\triangle ABC \sim \triangle EDF$
1. $\triangle JKL \sim \triangle PMN$
| Angles | Sides |
|---|---|
| $\angle K \cong \angle M$ | $\frac{KL}{MN} = \frac{LJ}{NP}$ |
| $\angle L \cong \angle N$ | $\frac{LJ}{NP} = \frac{JK}{PM}$ |
2. $\triangle XYZ \sim \triangle RYS$
| Angles | Sides |
|---|---|
| $\angle Y \cong \angle Y$ | $\frac{YZ}{YS} = \frac{ZX}{SR}$ |
| $\angle Z \cong \angle S$ | $\frac{ZX}{SR} = \frac{XY}{RY}$ |