Answer:In order for a set of numbers to represent the three sides of a triangle, they must satisfy the triangle inequality theorem, which states that the sum of the lengths of any two sides must be greater than the length of the third side. Let’s consider each set of numbers in turn to see if they meet this condition.The set {15,27,43} does not represent the sides of a triangle, as 15 + 27 < 43, which violates the triangle inequality theorem. In other words, the sum of the first two sides is not greater than the third side, so a triangle cannot be formed with these side lengths.The set {7,22,28} does represent the sides of a triangle. To see this, we can check that each pair of sides satisfies the triangle inequality theorem: 7 + 22 > 28, 7 + 28 > 22, and 22 + 28 > 7. Therefore, a triangle can be formed with these side lengths.The set {14,17,32} does not represent the sides of a triangle, as 14 + 17 < 32, violating the triangle inequality theorem. Therefore, a triangle cannot be formed with these side lengths.The set {8,19,27} does represent the sides of a triangle. We can check that each pair of sides satisfies the triangle inequality theorem: 8 + 19 > 27, 8 + 27 > 19, and 19 + 27 > 8. Therefore, a triangle can be formed with these side lengths.In general, when considering whether a given set of numbers represents the sides of a triangle, we must check that the sum of any two sides is greater than the length of the third side. This inequality is essential for ensuring that the three sides can form a closed shape. If this condition is not satisfied, the set of numbers cannot represent the sides of a triangle. Conversely, if the condition is satisfied, then a triangle can be formed with those side lengths.
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