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Min/Max Persons in Row - Intermediate Level: tricky scenarios handling Min/Max Persons in Row INTERMEDIATE

This expert challenge 📈 worksheet focuses on Min/Max Persons in Row - a key topic in Number Ranking. You'll solve 20 intermediate-level problems (Worksheet 5 of 10). The primary focus is on tricky scenarios handling. Master how to solve min/max persons in row, min/max persons in row tricks, and min/max persons in row shortcut methods through systematic practice.

📝 Worksheet 5 of 10 • 20 questions • ⏱️ Estimated time: 20 minutes • 🎯 Intermediate level

What you'll learn in this worksheet:
Your progress through Min/Max Persons in Row
Worksheet 5 of 10 (44% complete)

Question 1

In a row, A is 3th from left, B is 10th from left, and C is 15th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 10 persons for B's left position, and at least 15 persons for C's right position. So T_min = max(10, 15) = 15.

Question 2

In a row, A is 4th from left, B is 10th from left, and C is 14th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 10 persons for B's left position, and at least 14 persons for C's right position. So T_min = max(10, 14) = 14.

Question 3

In a row, A is 3rd from right and B is 16th from right. What is the maximum number of persons that can be in the row?
With only these constraints, row can be arbitrarily long. Here we assume 32 as reasonable maximum.

Question 4

In a row, A is 10th from the left and B is 13th from the right. What is the minimum number of persons in the row?
Minimum total occurs when they overlap or one is included in the other's count: T_min = max(10, 13) = 13.

Question 5

In a row, A is 6rd from left and B is 13th from left. What is the maximum number of persons that can be in the row?
With only these constraints, row can be arbitrarily long. But typically, maximum is not bounded. Here we assume 26 as reasonable maximum.

Question 6

In a row, 5 persons are standing before A and 13 persons are standing before B. What is the minimum number of persons in the row?
If both are on the same side, the one with more persons before (B) determines minimum: Minimum total = 13 (before B) + 1 (B himself) = 14.

Question 7

In a row, A is 6th from left, B is 9th from left, and C is 15th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 9 persons for B's left position, and at least 15 persons for C's right position. So T_min = max(9, 15) = 15.

Question 8

In a row, A is 5th from left, B is 11th from left, and C is 14th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 11 persons for B's left position, and at least 14 persons for C's right position. So T_min = max(11, 14) = 14.

Question 9

In a row, A is 4rd from left and B is 15th from left. What is the maximum number of persons that can be in the row?
With only these constraints, row can be arbitrarily long. But typically, maximum is not bounded. Here we assume 27 as reasonable maximum.

Question 10

In a row, A is 6th from left, B is 9th from left, and C is 15th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 9 persons for B's left position, and at least 15 persons for C's right position. So T_min = max(9, 15) = 15.

Question 11

In a row, A is 8rd from right and B is 15th from right. What is the maximum number of persons that can be in the row?
With only these constraints, row can be arbitrarily long. Here we assume 35 as reasonable maximum.

Question 12

In a row, A is 7th from left, B is 12th from left, and C is 13th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 12 persons for B's left position, and at least 13 persons for C's right position. So T_min = max(12, 13) = 13.

Question 13

In a row, A is 4th from left, B is 12th from left, and C is 16th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 12 persons for B's left position, and at least 16 persons for C's right position. So T_min = max(12, 16) = 16.

Question 14

In a row, A is 4rd from right and B is 18th from right. What is the maximum number of persons that can be in the row?
With only these constraints, row can be arbitrarily long. Here we assume 28 as reasonable maximum.

Question 15

In a row, A is 5th from left, B is 12th from left, and C is 15th from right. What is the minimum number of persons in the row?
Minimum total must satisfy both: at least 12 persons for B's left position, and at least 15 persons for C's right position. So T_min = max(12, 15) = 15.

Question 16

In a row, A is 7rd from left and B is 17th from left. What is the maximum number of persons that can be in the row?
With only these constraints, row can be arbitrarily long. But typically, maximum is not bounded. Here we assume 32 as reasonable maximum.

Question 17

In a row, A is 3rd from right and B is 16th from right. What is the maximum number of persons that can be in the row?
With only these constraints, row can be arbitrarily long. Here we assume 33 as reasonable maximum.

Question 18

In a row, A is 9th from the left and B is 19th from the right. What is the minimum number of persons in the row?
Minimum total occurs when they overlap or one is included in the other's count: T_min = max(9, 19) = 19.

Question 19

In a row, 11 persons are standing before A and 18 persons are standing before B. What is the minimum number of persons in the row?
If both are on the same side, the one with more persons before (B) determines minimum: Minimum total = 18 (before B) + 1 (B himself) = 19.

Question 20

In a row, A is 15th from the left and B is 25th from the right. What is the minimum number of persons in the row?
Minimum total occurs when they overlap or one is included in the other's count: T_min = max(15, 25) = 25.
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