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20 January, 01:21

The perimeters of similar triangles are in the same ratio as the corresponding sides

Answers: always, never, sometimss

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  1. 20 January, 04:57
    0
    Always

    Step-by-step explanation:

    Suppose you have triangle ABC with side lengths a, b, c. Suppose that is similar to triangle DEF with side lengths d, e, f.

    Now, let k be the ratio of corresponding sides ...

    k = d/a

    Because the same factor applies to all sides, we also have ...

    k = e/b = f/c

    That is, if we multiply by the denominators of each of these fractions, we get ...

    d = a·k e = b·k f = c·k

    The perimeter of ΔABC is ...

    perimeter (ABC) = a + b + c

    The perimeter of ΔDEF is ...

    perimeter (DEF) = d + e + f = a·k + b·k + c·k

    perimeter (DEF) = k (a + b + c) = k·perimeter (ABC)

    k = perimeter (DEF) / perimeter (ABC)

    That is, the perimeters are in the same ratio as corresponding sides.
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