5. Twenty-five sixth-grade students entered a math contest consisting of 20 questions. The student who
answered the greatest number of questions correctly will receive a graphing calculator. The rules of the
contest state that if two or more students tie for the greatest number of correct answers, one of these
students will be chosen to receive the calculator.
No student answered all 20 questions correctly, but four students (Allan, Beth, Carlos, and Denesha) each
answered 19 questions correctly.
What would be a fair way to use two coins (a dime and a nickel) to decide which student should get the
calculator? Explain what makes your method fair.
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