تم الحل ✓
categoryإحصاء
schoolبكالوريوس
event_available2026-07-14
السؤال
Transcribed Image Text:
"The Iowa State basketball team needs to win 3 straight games to win the Big 12
tournament. The points that lowa State will score follows a Triangular distribution
with a minimum = 55, most likely = 64, and maximum = 73.
The points that Iowa State's first opponent will score follows a Triangular distribution
with a minimum = 57, most likely = 68, and maximum = 72.
The points that Iowa State's second opponent will score follows a Triangular
distribution with a minimum = 47, most likely = 48, and maximum = 64.
The points that lowa State's third opponent will score follows a Triangular
distribution with a minimum = 63, most likely = 76, and maximum = 91.
Assume that the Triangular distribution for lowa State remains the same for all 3
games. Simulate the number of points that lowa State will score in each game and
the number of points that each of its opponents will score using the above
distributions with 100,000 trials. Define three output cells as the difference in points
between lowa State and each opponent. Use ""countif"" to calculate the probability
that Iowa State beats each opponent (i.e., the probability that ISU points - opponent
points >0). What is the probability that Iowa State wins all three games? Express
your answer as a decimal between 0 and 1."
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