1990 AHSME Problems/Problem 26
Problem
Ten people form a circle. Each picks a number and tells it to the two neighbors adjacent to them in the circle. Then each person computes and announces the average of the numbers of their two neighbors. The figure shows the average announced by each person (not the original number the person picked.) The number picked by the person who announced the average was
Solution 1 (One Variable)
For suppose Person announces the number
Let be the number picked by Person It follows that
SOLUTION IN PROGRESS
Solution 2 (Ten Variables)
Number the people to in order in which they announced the numbers. Let be the number chosen by person .
For each , the number is the average of and (indices taken modulo ). Or equivalently, the number is the sum of and .
We can split these ten equations into two independent sets of five - one for the even-numbered peoples, one for the odd-numbered ones. As we only need , we are interested in these equations:
Summing all five of them, we get , hence .
If we now take the sum of all five variables and subtract equations and , we see that .
See also
1990 AHSME (Problems • Answer Key • Resources) | ||
Preceded by Problem 25 |
Followed by Problem 27 | |
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