Paul and Sammy take part in a race.
The probability tha Paul wins the race is 9/35.
The probability that Sammy wins the race is 26%.
Who is more likely to win the race?
Give a reason for your answer.
Divide 9 by 35, Multiply the quotient by 100 to get the percent.
Paul and Sammy take part in a race.
The probability that Paul wins the race is 9/35
The probability that Sammy wins the race is 26%.
Who is more likely to win the race?
Give a reason for your answer.
To determine who is more likely to win the race, we need to compare the probabilities of Paul winning (9/35) and Sammy winning (26%).
To compare these probabilities, we can convert both to decimal form.
Paul's winning probability of 9/35 can be rewritten as 0.2571 (rounded to four decimal places) when divided (9 ÷ 35).
Sammy's winning probability of 26% can be written as 0.26 in decimal form.
Comparing the two probabilities, we can see that 0.26 is greater than 0.2571.
Therefore, Sammy (with a probability of 26%) is more likely to win the race compared to Paul (with a probability of 9/35 or 0.2571).
To determine who is more likely to win the race, we compare the probabilities of Paul and Sammy winning.
The probability that Paul wins the race is given as 9/35. This means that out of 35 races, Paul is expected to win 9 times.
The probability that Sammy wins the race is given as 26%. This means that out of 100 races, Sammy is expected to win 26 times.
To compare these probabilities, we can convert the fraction probability of Paul winning to a percentage.
9/35 is approximately 0.2571 when rounded to four decimal places. To convert to a percentage, we multiply by 100 to get 25.71%.
Comparing the two probabilities, we find that Sammy's 26% probability is slightly higher than Paul's 25.71% probability. Therefore, it is more likely that Sammy will win the race.
In summary, Sammy is more likely to win the race based on the given probabilities.