Final answer:
The sets of lengths that can form triangles, complying with the Triangle Inequality Theorem, are option b (14 cm, 6 cm, 20 cm) and option e (10 cm, 15 cm, 24 cm).
Step-by-step explanation:
The student has asked to identify which sets of three lengths could form a triangle. This can be determined using the Triangle Inequality Theorem, which states that the sum of the lengths of any two sides of a triangle must be greater than the length of the third side.
- 2 cm, 15 cm, 28 cm - This cannot form a triangle because 2 cm + 15 cm is not greater than 28 cm.
- 14 cm, 6 cm, 20 cm - This can form a triangle because 14 cm + 6 cm is greater than 20 cm, and all the other two-sum combinations are greater than the third side as well.
- 20 cm, 7 cm, 9 cm - This cannot form a triangle because 7 cm + 9 cm is not greater than 20 cm.
- 6 cm, 24 cm, 10 cm - This cannot form a triangle because 6 cm + 10 cm is not greater than 24 cm.
- 10 cm, 15 cm, 24 cm - This can form a triangle because all two-sum combinations are greater than the third side.
Therefore, the sets of lengths that can form triangles are option b (14 cm, 6 cm, 20 cm) and option e (10 cm, 15 cm, 24 cm).