The mid-segment of a triangle is the segment joining the midpoints of two sides. This segment is parallel to the third side and has what length relation to that side?

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Study for the Honors Mathematics 3 Exam. Engage with comprehensive flashcards and multiple choice questions, each with detailed explanations. Prepare and excel in your exam journey!

Multiple Choice

The mid-segment of a triangle is the segment joining the midpoints of two sides. This segment is parallel to the third side and has what length relation to that side?

Explanation:
The mid-segment theorem tells us the segment joining the midpoints of two sides is parallel to the third side and has half its length. If M and N are the midpoints of AB and AC, then MN is parallel to BC. The triangles AMN and ABC are similar because they share angle A and MN is parallel to BC, making the other corresponding angles equal. Since AM = AB/2 and AN = AC/2, the similarity ratio is 1/2, so MN corresponds to BC with that same factor: MN = BC/2. Thus the mid-segment runs parallel to the third side and is half as long as that side.

The mid-segment theorem tells us the segment joining the midpoints of two sides is parallel to the third side and has half its length. If M and N are the midpoints of AB and AC, then MN is parallel to BC. The triangles AMN and ABC are similar because they share angle A and MN is parallel to BC, making the other corresponding angles equal. Since AM = AB/2 and AN = AC/2, the similarity ratio is 1/2, so MN corresponds to BC with that same factor: MN = BC/2. Thus the mid-segment runs parallel to the third side and is half as long as that side.

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