Weekly Dose 10 - Maths Olympiad Practice
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In a class of students, 80% participated in basketball, 85% participated in football, 74% participated in baseball, 68% participated in volleyball. What is the minimum percent of the students who participated in all the four sports events? Solution: Let say only two sports: basketball and football. To get the minimum percent of students who participated in both: 80% play basketball 20% not playing 85% play football 15% not playing Scenario 1: if the 15% not playing football also not playing basketball, then 5% not playing basketball but play football. We get this: playing both. Scenario 2: if the 15% not playing football and 20% not playing basketball are not the same students, we get the below venn diagram: playing both. So, need to use scenario 2 to get the minimum percent of students participated in both. Meaning, we must assume
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Transcript of Weekly Dose 10 - Maths Olympiad Practice
In a class of students, 80% participated in basketball, 85% participated in football, 74% participated in baseball, 68% participated in volleyball. What is the minimum percent of the students who participated in all the four sports events?Solution: Let say only two sports: basketball and football. To get the minimum percent of students who participated in both:
80% play basketball 20% not playing85% play football 15% not playing
Scenario 1: if the 15% not playing football also not playing basketball, then 5% not playing basketball but play football. We get this:
playing both.
Scenario 2: if the 15% not playing football and 20% not playing basketball are not the same students, we get the below venn diagram:
playing both.
So, need to use scenario 2 to get the minimum percentof students participated in both. Meaning, we must assume each student misses at most one sport.
In a class of students, 80% participated in basketball, 85% participated in football, 74% participated in baseball, 68% participated in volleyball. What is the minimum percent of the students who participated in all the four sports events?
Solution (continue):For our question, to minimize the number of students playing in all four sports, we make each students misses at most one sport. The number of students not playing basketball, football, baseball and volleyball are .
The percent of students who participated in all the four sports events are
Answer:
Ten whole numbers (not necessarily all different) have the property that if all but one of them are added, the possible sums (depending on which one is omitted) are: 82, 83, 84, 85, 87, 89, 90, 91, 92. The 10th sum is a repetition of one of thesse. What is the sum of the ten whole numbers?Solution:
Assuming the 10 numbers are . Given:
Since is also a multiple of 9, the must be a multiple of 9 also. Of the nine known sums, only is a multiple of 9, therefore, the is .
Answer:
Solution:
The number of tiles in 2004th square The number of tiles in 2005th square
The difference
Answer:
A sequence of square is made of identical square tiles. The edge of each square is one tile length longer than the edge of the previous square. The first three squares are shown. How many more tiles does the 2005th square have than the 2004th ?
Solution:
Assume the money Obet received from each of them is .
Total received by Obet Total moneyFraction
Answer:
Lucky, Michael, Nelson and Obet were good friends. Obet had no money. Michael gave one-fifth of his money to Obet. Lucky gave one-fourth of his money to Obet. Finally, Nelson gave one-third of his money to Obet. Obet received the same amount of money from each of them. What fraction of the group’s total money did Obet have at the end?
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