In a rectangle, which statement about the diagonals is true?

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Master the Certify Teacher EC-6 (391) Mathematics Test. Use flashcards and multiple choice questions with explanations. Boost your confidence and excel in your exam!

Multiple Choice

In a rectangle, which statement about the diagonals is true?

Explanation:
In a rectangle, the diagonals have equal length. Imagine the rectangle has width w and height h. One diagonal forms a right triangle with legs w and h, so its length is sqrt(w^2 + h^2). The other diagonal also spans the same width and height, so it has the same length sqrt(w^2 + h^2). Thus both diagonals are equal in length. The diagonals are not perpendicular in a typical rectangle (that happens in special cases like a square). They do intersect at the center, but they are not parallel. The key point is their lengths are the same.

In a rectangle, the diagonals have equal length. Imagine the rectangle has width w and height h. One diagonal forms a right triangle with legs w and h, so its length is sqrt(w^2 + h^2). The other diagonal also spans the same width and height, so it has the same length sqrt(w^2 + h^2). Thus both diagonals are equal in length.

The diagonals are not perpendicular in a typical rectangle (that happens in special cases like a square). They do intersect at the center, but they are not parallel. The key point is their lengths are the same.

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