Which statement about the range is true if an absolute value graph opens downward?

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Study for the Algebra 1 Honors End-of-Course Test. Study with flashcards and multiple-choice questions, each question has hints and explanations. Get ready for your exam!

Multiple Choice

Which statement about the range is true if an absolute value graph opens downward?

Explanation:
If an absolute value graph opens downward, the vertex sits at the top of the graph and represents the highest y-value. In the standard form y = a|x − h| + k, the vertex is (h, k), and a negative a makes the graph open downward. Because the arms go downward from that top point, y can never exceed k, but it can go as low as you like as x moves away from h. So the range is all y-values less than or equal to k. For example, y = −|x| + 3 has its highest point at y = 3, and smaller y-values as you move away from the vertex. The statement that matches this is that the range is y ≤ k, given the graph opens downward.

If an absolute value graph opens downward, the vertex sits at the top of the graph and represents the highest y-value. In the standard form y = a|x − h| + k, the vertex is (h, k), and a negative a makes the graph open downward. Because the arms go downward from that top point, y can never exceed k, but it can go as low as you like as x moves away from h. So the range is all y-values less than or equal to k. For example, y = −|x| + 3 has its highest point at y = 3, and smaller y-values as you move away from the vertex. The statement that matches this is that the range is y ≤ k, given the graph opens downward.

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