Master Circular Track - Beginner Level Problems Circular Track BEGINNER

Excel in competitive exams with this skill builder ⚡ worksheet on Circular Track. Worksheet 3 of 10 contains 20 beginner-level problems. Target your step-by-step problem solving skills while practicing circular track practice, circular track for competitive exams, and how to solve circular track.

📝 Worksheet 3 of 10 • 20 questions • ⏱️ Estimated time: 20 minutes • 🎯 Beginner level

What you'll learn in this worksheet:

Master circular track practice through focused practice
Understand the logic behind circular track for competitive exams
Learn step-by-step approaches to step-by-step problem solving
Develop systematic problem-solving habits
Strengthen your foundational understanding

Your progress through Circular Track

Worksheet 3 of 10 (22% complete)

Question 1

Two runners start from the same point on a circular track of length 548 m. Their speeds are 8 m/s and 14 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |14 - 8| = 6 m/s
2. Time to meet = Track length / Relative speed = 548 / 6 = 91.3 seconds

Question 2

Two runners start from the same point on a circular track of length 453 m. Their speeds are 11 m/s and 12 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 11 + 12 = 23 m/s
2. Time to meet = Track length / Relative speed = 453 / 23 = 19.7 seconds

Question 3

Two runners start from the same point on a circular track of length 666 m. Their speeds are 5 m/s and 9 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |9 - 5| = 4 m/s
2. Time to meet = Track length / Relative speed = 666 / 4 = 166.5 seconds

Question 4

Two runners start from the same point on a circular track of length 792 m. Their speeds are 7 m/s and 9 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 7 + 9 = 16 m/s
2. Time to meet = Track length / Relative speed = 792 / 16 = 49.5 seconds

Question 5

A runner runs at 9 m/s on a circular track of length 489 m for 71 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 71 seconds = 9 × 71 = 639 m
2. Number of laps = Distance / Track length = 639 / 489 = 1.3 laps

Question 6

Two runners start from the same point on a circular track of length 751 m. Their speeds are 8 m/s and 12 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 8 + 12 = 20 m/s
2. Time to meet = Track length / Relative speed = 751 / 20 = 37.5 seconds

Question 7

Two runners start from the same point on a circular track of length 489 m. Their speeds are 7 m/s and 12 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |12 - 7| = 5 m/s
2. Time to meet = Track length / Relative speed = 489 / 5 = 97.8 seconds

Question 8

A runner runs at 8 m/s on a circular track of length 792 m for 116 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 116 seconds = 8 × 116 = 928 m
2. Number of laps = Distance / Track length = 928 / 792 = 1.2 laps

Question 9

A runner runs at 10 m/s on a circular track of length 559 m for 170 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 170 seconds = 10 × 170 = 1700 m
2. Number of laps = Distance / Track length = 1700 / 559 = 3.0 laps

Question 10

Two runners start from the same point on a circular track of length 795 m. Their speeds are 8 m/s and 11 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 8 + 11 = 19 m/s
2. Time to meet = Track length / Relative speed = 795 / 19 = 41.8 seconds

Question 11

Two runners start from the same point on a circular track of length 768 m. Their speeds are 7 m/s and 14 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 7 + 14 = 21 m/s
2. Time to meet = Track length / Relative speed = 768 / 21 = 36.6 seconds

Question 12

A runner runs at 9 m/s on a circular track of length 672 m for 129 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 129 seconds = 9 × 129 = 1161 m
2. Number of laps = Distance / Track length = 1161 / 672 = 1.7 laps

Question 13

A runner runs at 10 m/s on a circular track of length 444 m for 146 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 146 seconds = 10 × 146 = 1460 m
2. Number of laps = Distance / Track length = 1460 / 444 = 3.3 laps

Question 14

A runner runs at 10 m/s on a circular track of length 464 m for 130 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 130 seconds = 10 × 130 = 1300 m
2. Number of laps = Distance / Track length = 1300 / 464 = 2.8 laps

Question 15

Two runners start from the same point on a circular track of length 747 m. Their speeds are 12 m/s and 10 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |10 - 12| = 2 m/s
2. Time to meet = Track length / Relative speed = 747 / 2 = 373.5 seconds

Question 16

A runner runs at 12 m/s on a circular track of length 470 m for 175 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 175 seconds = 12 × 175 = 2100 m
2. Number of laps = Distance / Track length = 2100 / 470 = 4.5 laps

Question 17

A runner runs at 5 m/s on a circular track of length 773 m for 103 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 103 seconds = 5 × 103 = 515 m
2. Number of laps = Distance / Track length = 515 / 773 = 0.7 laps

Question 18

Two runners start from the same point on a circular track of length 792 m. Their speeds are 6 m/s and 10 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 6 + 10 = 16 m/s
2. Time to meet = Track length / Relative speed = 792 / 16 = 49.5 seconds

Question 19

Two runners start from the same point on a circular track of length 773 m. Their speeds are 10 m/s and 14 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |14 - 10| = 4 m/s
2. Time to meet = Track length / Relative speed = 773 / 4 = 193.2 seconds

Question 20

Two runners start from the same point on a circular track of length 679 m. Their speeds are 10 m/s and 11 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 10 + 11 = 21 m/s
2. Time to meet = Track length / Relative speed = 679 / 21 = 32.3 seconds

📝 Continue your Circular Track practice. Worksheet 3 focuses on step-by-step problem solving.

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