If we are referring to similar triangles, then the answer is yes, the ratios of the other corresponding adjacent sides are also equal to k. This is because in similar triangles, all corresponding angles are congruent, and therefore the corresponding sides are proportional to each other with the same scale factor k. So, if we have two similar triangles with sides a, b, and c and a', b', and c', then a/a' = b/b' = c/c' = k.
However, if we are not referring to similar triangles and are instead considering other shapes or situations, then the answer may be different. In general, we cannot assume that the ratios of the corresponding sides will always be equal to k, as the relationship between the sides of a shape or object can vary depending on its specific properties and characteristics.
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If we are referring to similar triangles, then the answer is yes, the ratios of the other corresponding adjacent sides are also equal to k. This is because in similar triangles, all corresponding angles are congruent, and therefore the corresponding sides are proportional to each other with the same scale factor k. So, if we have two similar triangles with sides a, b, and c and a', b', and c', then a/a' = b/b' = c/c' = k.
However, if we are not referring to similar triangles and are instead considering other shapes or situations, then the answer may be different. In general, we cannot assume that the ratios of the corresponding sides will always be equal to k, as the relationship between the sides of a shape or object can vary depending on its specific properties and characteristics.