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How are the areas of 2 similar figures related? - Answers
The areas of two similar figures are related by the square of the ratio of their corresponding side lengths. If the ratio of the side lengths of the two figures is ( k:1 ), then the ratio of their areas will be ( k^2:1 ). This means that if one figure is scaled up or down by a factor, its area will change by the square of that factor. Thus, similar figures have areas that scale proportionally to the square of their linear dimensions.
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How are the areas of 2 similar figures related? - Answers
The areas of two similar figures are related by the square of the ratio of their corresponding side lengths. If the ratio of the side lengths of the two figures is ( k:1 ), then the ratio of their areas will be ( k^2:1 ). This means that if one figure is scaled up or down by a factor, its area will change by the square of that factor. Thus, similar figures have areas that scale proportionally to the square of their linear dimensions.
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How are the areas of 2 similar figures related? - Answers
The areas of two similar figures are related by the square of the ratio of their corresponding side lengths. If the ratio of the side lengths of the two figures is ( k:1 ), then the ratio of their areas will be ( k^2:1 ). This means that if one figure is scaled up or down by a factor, its area will change by the square of that factor. Thus, similar figures have areas that scale proportionally to the square of their linear dimensions.
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