Circular Track: Worksheet 2 - Beginner Practice Circular Track BEGINNER

Ready to master Circular Track? This entry level practice worksheet (2/10) presents 20 beginner-level challenges. Focus area: pattern recognition. Learn to solve circular track reasoning questions, handle circular track practice, and perfect circular track for competitive exams with our step-by-step solutions.

📝 Worksheet 2 of 10 • 20 questions • ⏱️ Estimated time: 20 minutes • 🎯 Beginner level

What you'll learn in this worksheet:

Understand the logic behind circular track practice
Learn step-by-step approaches to pattern recognition
Practice basic problem types with clear explanations
Develop systematic problem-solving habits
Master circular track reasoning questions through focused practice

Your progress through Circular Track

Worksheet 2 of 10 (11% complete)

Question 1

A runner runs at 8 m/s on a circular track of length 626 m for 86 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 86 seconds = 8 × 86 = 688 m
2. Number of laps = Distance / Track length = 688 / 626 = 1.1 laps

Question 2

A runner runs at 9 m/s on a circular track of length 559 m for 68 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 68 seconds = 9 × 68 = 612 m
2. Number of laps = Distance / Track length = 612 / 559 = 1.1 laps

Question 3

Two runners start from the same point on a circular track of length 431 m. Their speeds are 11 m/s and 13 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 11 + 13 = 24 m/s
2. Time to meet = Track length / Relative speed = 431 / 24 = 18.0 seconds

Question 4

A runner runs at 11 m/s on a circular track of length 456 m for 167 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 167 seconds = 11 × 167 = 1837 m
2. Number of laps = Distance / Track length = 1837 / 456 = 4.0 laps

Question 5

A runner runs at 9 m/s on a circular track of length 658 m for 162 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 162 seconds = 9 × 162 = 1458 m
2. Number of laps = Distance / Track length = 1458 / 658 = 2.2 laps

Question 6

Two runners start from the same point on a circular track of length 717 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 = 717 / 20 = 35.9 seconds

Question 7

Two runners start from the same point on a circular track of length 722 m. Their speeds are 11 m/s and 15 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |15 - 11| = 4 m/s
2. Time to meet = Track length / Relative speed = 722 / 4 = 180.5 seconds

Question 8

Two runners start from the same point on a circular track of length 542 m. Their speeds are 12 m/s and 8 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 12 + 8 = 20 m/s
2. Time to meet = Track length / Relative speed = 542 / 20 = 27.1 seconds

Question 9

Two runners start from the same point on a circular track of length 630 m. Their speeds are 10 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 - 10| = 1 m/s
2. Time to meet = Track length / Relative speed = 630 / 1 = 630.0 seconds

Question 10

Two runners start from the same point on a circular track of length 774 m. Their speeds are 6 m/s and 15 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |15 - 6| = 9 m/s
2. Time to meet = Track length / Relative speed = 774 / 9 = 86.0 seconds

Question 11

Two runners start from the same point on a circular track of length 418 m. Their speeds are 6 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 - 6| = 8 m/s
2. Time to meet = Track length / Relative speed = 418 / 8 = 52.2 seconds

Question 12

Two runners start from the same point on a circular track of length 772 m. Their speeds are 11 m/s and 9 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 11 + 9 = 20 m/s
2. Time to meet = Track length / Relative speed = 772 / 20 = 38.6 seconds

Question 13

Two runners start from the same point on a circular track of length 424 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 = 424 / 4 = 106.0 seconds

Question 14

Two runners start from the same point on a circular track of length 561 m. Their speeds are 11 m/s and 13 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 11 + 13 = 24 m/s
2. Time to meet = Track length / Relative speed = 561 / 24 = 23.4 seconds

Question 15

Two runners start from the same point on a circular track of length 480 m. Their speeds are 8 m/s and 13 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 8 + 13 = 21 m/s
2. Time to meet = Track length / Relative speed = 480 / 21 = 22.9 seconds

Question 16

Two runners start from the same point on a circular track of length 783 m. Their speeds are 8 m/s and 11 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |11 - 8| = 3 m/s
2. Time to meet = Track length / Relative speed = 783 / 3 = 261.0 seconds

Question 17

A runner runs at 12 m/s on a circular track of length 684 m for 73 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 73 seconds = 12 × 73 = 876 m
2. Number of laps = Distance / Track length = 876 / 684 = 1.3 laps

Question 18

A runner runs at 5 m/s on a circular track of length 670 m for 158 seconds. How many laps does he complete?

Step-by-step:
1. Distance covered in 158 seconds = 5 × 158 = 790 m
2. Number of laps = Distance / Track length = 790 / 670 = 1.2 laps

Question 19

Two runners start from the same point on a circular track of length 684 m. Their speeds are 11 m/s and 9 m/s. If they run in opposite directions, when will they meet?

Step-by-step:
1. Relative speed (opposite direction) = 11 + 9 = 20 m/s
2. Time to meet = Track length / Relative speed = 684 / 20 = 34.2 seconds

Question 20

Two runners start from the same point on a circular track of length 657 m. Their speeds are 11 m/s and 8 m/s. If they run in the same direction, when will they meet again?

Step-by-step:
1. Relative speed (same direction) = |8 - 11| = 3 m/s
2. Time to meet = Track length / Relative speed = 657 / 3 = 219.0 seconds

📝 Continue your Circular Track practice. Worksheet 2 focuses on pattern recognition.

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