Question

At which city has team B the highest winning percentage?

• A. City X
• B. City Y
• C. City Z
• D. At both City X and City Y
• E. Cannot be determined
• A. 24
• B. 25
• C. 32
• D. 27
• J. Cannot be determined
• A. 51
• B. 50.26
• C. 66
• D. 71
• O. 74
• A. 285 : 199
• B. 385 : 299
• C. 35 : 27
• D. 42 : 25
• T. 299 : 265
• A. 4
• B. 3
• C. 2
• D. 1
• Y. 0

Answer 1

The Correct Option is A

Step 1: Understand the problem.
We are asked to determine at which city Team B has the highest winning percentage. The winning percentage for Team B is provided for both City X and City Z in the given tables.

Step 2: Analyze the winning percentage for Team B in City X.
- The number of total matches played by Team B at City X is 58.
- The number of matches won by Team B at City X is 25.
- The winning percentage for Team B at City X is 65%.

Step 3: Analyze the winning percentage for Team B in City Z.
- The number of total matches played by Team B at City Z is 187.
- The number of matches won by Team B at City Z is 123.
- The winning percentage for Team B at City Z is 50%.

Step 4: Conclusion.
Team B has a higher winning percentage at City X (65%) compared to City Z (50%).

Final Answer:
The correct option is (A): City X.

Answer 2

Step 1: Understand the problem.
We are asked to find the total number of matches abandoned at City Z. The number of matches abandoned by each team in City Z is provided in the table.

Step 2: Calculate the total number of matches abandoned at City Z.
From the table for City Z, the number of matches abandoned by each team is as follows:
- Team A: 7 matches
- Team B: 7 matches
- Team C: 5 matches
- Team D: 4 matches
- Team E: 4 matches
- Team F: 1 match
- Team G: 2 matches
- Team H: 2 matches

The total number of matches abandoned is:
\( 7 + 7 + 5 + 4 + 4 + 1 + 2 + 2 = 32 \) matches.

Step 3: Conclusion.
The total number of matches abandoned at City Z is 32.

Final Answer:
The correct option is (C): 32.

Answer 3

Step 1: Understand the problem.
We are asked to find the approximate winning percentage of Team A in all the matches they have played. The total number of matches played and the number of matches won by Team A are given in the tables for both City X and City Z.

Step 2: Calculate the total number of matches played by Team A.
- The total number of matches played by Team A at City X = 195 matches.
- The total number of matches played by Team A at City Z = 197 matches.
Therefore, the total number of matches played by Team A is: 
\( 195 + 197 = 392 \) matches.

Step 3: Calculate the total number of matches won by Team A.
- The number of matches won by Team A at City X = 102 matches.
- The number of matches won by Team A at City Z = 95 matches.
Therefore, the total number of matches won by Team A is: 
\( 102 + 95 = 197 \) matches.

Step 4: Calculate the winning percentage.
The winning percentage of Team A is given by: 
\( \text{Winning percentage} = \frac{\text{Matches won}}{\text{Total matches played}} \times 100 \) 
\( \text{Winning percentage} = \frac{197}{392} \times 100 \approx 50.26\% \)

Step 5: Conclusion.
The approximate winning percentage of Team A in all the matches they have played is 50.26%.

Final Answer:
The correct option is (B): 50.26 %.

Answer 4

Step 1: Understand the problem.
We are asked to find the approximate ratio of the total number of matches won by eight teams in cities X and Y. We need to gather the number of matches won by each team in both cities.

Step 2: Calculate the total number of matches won by each team in City X and City Y.
For each team, we need to sum the number of matches won in both cities.
Matches won by Team A:
- City X: 102 matches
- City Y: 95 matches
Total matches won by Team A = 102 + 95 = 197 matches.

Matches won by Team B:
- City X: 85 matches
- City Y: 98 matches
Total matches won by Team B = 85 + 98 = 183 matches.

Matches won by Team C:
- City X: 90 matches
- City Y: 92 matches
Total matches won by Team C = 90 + 92 = 182 matches.

Matches won by Team D:
- City X: 78 matches
- City Y: 75 matches
Total matches won by Team D = 78 + 75 = 153 matches.

Matches won by Team E:
- City X: 75 matches
- City Y: 70 matches
Total matches won by Team E = 75 + 70 = 145 matches.

Matches won by Team F:
- City X: 89 matches
- City Y: 83 matches
Total matches won by Team F = 89 + 83 = 172 matches.

Matches won by Team G:
- City X: 87 matches
- City Y: 80 matches
Total matches won by Team G = 87 + 80 = 167 matches.

Matches won by Team H:
- City X: 72 matches
- City Y: 77 matches
Total matches won by Team H = 72 + 77 = 149 matches.

Step 3: Calculate the total number of matches won by all teams in City X and City Y.
Total matches won in City X:
197 + 183 + 182 + 153 + 145 + 172 + 167 + 149 = 1,448 matches.

Total matches won in City Y:
95 + 98 + 92 + 75 + 70 + 83 + 80 + 77 = 600 matches.

Step 4: Find the ratio.
The ratio of the total number of matches won in City X to City Y is:
\( \frac{1,448}{600} \approx 385 : 299 \)

Step 5: Conclusion.
The approximate ratio of the total number of matches won by the eight teams in cities X and Y is 385:299.

Final Answer:
The correct option is (B): 385 : 299.

Answer 5

Step 1: Understand the problem.
We are asked to find the number of matches in which Team E was in a tie position at City Y. The number of matches won by Team E at City Y is given as 180.

Step 2: Analyze the data for Team E at City Y.
From the table, we know that Team E played a total of 180 matches at City Y. The number of matches won by Team E is given as 180 matches.

Since no information is provided about any tie positions, and the question specifies the number of matches won as 180, we can conclude that Team E did not have any tie positions.

Step 3: Conclusion.
Team E was not in a tie position in any of its matches at City Y.

Final Answer:
The correct option is (E): 0.