Answer: Triangle P
Step-by-step explanation:
Given:
- Triangle P: Two angles measure 50°.
If any triangle have same measurement it must be similar to triangle P by AA similarity criteria but not congruent.
Hence it is not unique.
- Triangle Q: All sides have length 13 cm.
Since all sides have same length, thus it must be an equilateral triangle with all angles 60 °.
If any triangle have same sides it must be congruent to this by SSS congruence rule.
Hence, it is unique.
- Triangle R: Two sides have length 3 cm, and the included angle measures 60°.
If any triangle exists with same measure as triangle R then it must be congruent to triangle R by SAS congruence criteria.
Hence, it is unique.
- Triangle S: Base has length 5 cm, and base angles measure 30°.
If any triangle exists with same measure as triangle R then it must be congruent to triangle R by ASA congruence criteria.
Hence, it is unique.
