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What is the ratio of the lengths of sides in triangle abc to the lengths of corresponding sides in triangle rst?

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Answer:

To determine the ratio of the lengths of corresponding sides in two triangles, we need to compare the lengths of corresponding sides.

Let's assume triangle ABC and triangle RST have corresponding sides AB and RS, BC and ST, and AC and RT.

The ratio of the lengths of sides in triangle ABC to the lengths of corresponding sides in triangle RST can be expressed as:

Ratio = (Length of AB / Length of RS) : (Length of BC / Length of ST) : (Length of AC / Length of RT)

For example, if the length of AB is 5 units, the length of RS is 2 units, the length of BC is 8 units, the length of ST is 4 units, the length of AC is 7 units, and the length of RT is 3 units, the ratio would be:

Ratio = (5 / 2) : (8 / 4) : (7 / 3)

Ratio = 2.5 : 2 : 2.333

The ratio of the lengths of sides in triangle ABC to the lengths of corresponding sides in triangle RST would be approximately 2.5 : 2 : 2.333.

Remember to compare the lengths of corresponding sides to determine the ratio accurately for any given triangles.

Step-by-step explanation:

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