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League Match Scheduling - Expert Level: conceptual clarity League Match Scheduling EXPERT

This skill evaluation ⚡ worksheet focuses on League Match Scheduling - a key topic in Scheduling. You'll solve 20 expert-level problems (Worksheet 9 of 10). The primary focus is on conceptual clarity. Master league match scheduling ssc cgl, league match scheduling reasoning tricks, and fast league match scheduling solving through systematic practice.

📝 Worksheet 9 of 10 • 20 questions • ⏱️ Estimated time: 20 minutes • 🎯 Expert level

What you'll learn in this worksheet:
Your progress through League Match Scheduling
Worksheet 9 of 10 (88% complete)

Question 1

A football league has 9 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 9 × (9-1) = 72
2. Maximum matches per round: 4
3. Minimum rounds: 72 ÷ 4 = 9 rounds

Answer: 9 rounds

Question 2

A football league has 8 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 8 × (8-1) = 56
2. Maximum matches per round: 4
3. Minimum rounds: 56 ÷ 4 = 7 rounds

Answer: 7 rounds

Question 3

A football league has 5 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 5 × (5-1) = 20
2. Maximum matches per round: 2
3. Minimum rounds: 20 ÷ 2 = 5 rounds

Answer: 5 rounds

Question 4

A football league has 10 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 10 × (10-1) = 90
2. Maximum matches per round: 5
3. Minimum rounds: 90 ÷ 5 = 9 rounds

Answer: 9 rounds

Question 5

A football league has 8 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 8 × (8-1) = 56
2. Maximum matches per round: 4
3. Minimum rounds: 56 ÷ 4 = 7 rounds

Answer: 7 rounds

Question 6

A football league has 9 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 9 × (9-1) = 72
2. Maximum matches per round: 4
3. Minimum rounds: 72 ÷ 4 = 9 rounds

Answer: 9 rounds

Question 7

A football league has 6 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 6 × (6-1) = 30
2. Maximum matches per round: 3
3. Minimum rounds: 30 ÷ 3 = 5 rounds

Answer: 5 rounds

Question 8

A football league has 8 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 8 × (8-1) = 56
2. Maximum matches per round: 4
3. Minimum rounds: 56 ÷ 4 = 7 rounds

Answer: 7 rounds

Question 9

A football league has 10 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 10 × (10-1) = 90
2. Maximum matches per round: 5
3. Minimum rounds: 90 ÷ 5 = 9 rounds

Answer: 9 rounds

Question 10

A football league has 7 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 7 × (7-1) = 42
2. Maximum matches per round: 3
3. Minimum rounds: 42 ÷ 3 = 7 rounds

Answer: 7 rounds

Question 11

A football league has 5 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 5 × (5-1) = 20
2. Maximum matches per round: 2
3. Minimum rounds: 20 ÷ 2 = 5 rounds

Answer: 5 rounds

Question 12

A football league has 6 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 6 × (6-1) = 30
2. Maximum matches per round: 3
3. Minimum rounds: 30 ÷ 3 = 5 rounds

Answer: 5 rounds

Question 13

A football league has 10 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 10 × (10-1) = 90
2. Maximum matches per round: 5
3. Minimum rounds: 90 ÷ 5 = 9 rounds

Answer: 9 rounds

Question 14

A football league has 6 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 6 × (6-1) = 30
2. Maximum matches per round: 3
3. Minimum rounds: 30 ÷ 3 = 5 rounds

Answer: 5 rounds

Question 15

A football league has 5 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 5 × (5-1) = 20
2. Maximum matches per round: 2
3. Minimum rounds: 20 ÷ 2 = 5 rounds

Answer: 5 rounds

Question 16

A football league has 8 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 8 × (8-1) = 56
2. Maximum matches per round: 4
3. Minimum rounds: 56 ÷ 4 = 7 rounds

Answer: 7 rounds

Question 17

A football league has 9 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 9 × (9-1) = 72
2. Maximum matches per round: 4
3. Minimum rounds: 72 ÷ 4 = 9 rounds

Answer: 9 rounds

Question 18

A football league has 7 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 7 × (7-1) = 42
2. Maximum matches per round: 3
3. Minimum rounds: 42 ÷ 3 = 7 rounds

Answer: 7 rounds

Question 19

A football league has 10 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 10 × (10-1) = 90
2. Maximum matches per round: 5
3. Minimum rounds: 90 ÷ 5 = 9 rounds

Answer: 9 rounds

Question 20

A football league has 6 teams. Each team plays every other team twice (home and away). What is the minimum number of rounds needed if each round has the maximum possible matches?
Step-by-step solution:

1. Total matches in double round-robin: 6 × (6-1) = 30
2. Maximum matches per round: 3
3. Minimum rounds: 30 ÷ 3 = 5 rounds

Answer: 5 rounds
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