Races and Games for Competitive Exam Preparation

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Races and Games

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Races and Games MCQ & Objective Questions

Understanding "Races and Games" is crucial for students preparing for various exams. This topic not only enhances your problem-solving skills but also helps in scoring better through focused practice. Engaging with MCQs and objective questions allows you to grasp important concepts and apply them effectively in your exam preparation.

What You Will Practise Here

Fundamental concepts of races and games
Key formulas related to speed, distance, and time
Types of races and their characteristics
Problem-solving techniques for race-related questions
Graphical representation of race scenarios
Commonly used definitions in races and games
Sample problems and solutions for better understanding

Exam Relevance

The topic of "Races and Games" is frequently tested in CBSE, State Boards, and competitive exams like NEET and JEE. Students can expect questions that require them to calculate speeds, analyze race outcomes, and apply theoretical concepts to practical scenarios. Common question patterns include direct calculations, conceptual applications, and multi-step problems that assess a student's understanding of the topic.

Common Mistakes Students Make

Confusing speed with distance and time calculations
Overlooking the importance of units in calculations
Misinterpreting the problem statement leading to incorrect assumptions
Failing to visualize the scenario, which can hinder problem-solving
Neglecting to practice different types of questions, limiting exposure

FAQs

Question: What are the key formulas I need to remember for Races and Games?
Answer: Key formulas include speed = distance/time, and understanding relative speed for multiple participants.

Question: How can I improve my accuracy in solving Races and Games problems?
Answer: Regular practice with MCQs and understanding the underlying concepts will significantly enhance your accuracy.

Start solving practice MCQs today to test your understanding of Races and Games. This will not only boost your confidence but also prepare you effectively for your upcoming exams!

Q. A and B can complete a task in 10 days and 15 days respectively. If they work together for 5 days, how much of the task is left?

A. 1/3
B. 1/4
C. 1/5
D. 1/6

Solution

A's rate = 1/10, B's rate = 1/15. Combined rate = 1/10 + 1/15 = 1/6. Work done in 5 days = 5/6. Remaining = 1 - 5/6 = 1/6.

Correct Answer: A — 1/3

Q. A and B can complete a task in 15 days and 20 days respectively. How much work can they complete together in 1 day?

A. 1/15
B. 1/20
C. 1/12
D. 1/10

Solution

Work rate of A = 1/15, B = 1/20. Together = 1/15 + 1/20 = 7/60. They can complete 7/60 of the work in 1 day.

Correct Answer: C — 1/12

Q. A and B can complete a task in 15 days and 20 days respectively. If they work together for 5 days, how much of the task is left?

A. 1/3
B. 1/4
C. 1/5
D. 1/6

Solution

A's work in 1 day = 1/15, B's work in 1 day = 1/20. Together = 1/15 + 1/20 = 7/60. In 5 days = 5 * 7/60 = 7/12. Remaining = 1 - 7/12 = 5/12.

Correct Answer: A — 1/3

Q. A and B can complete a work in 12 days and 15 days respectively. If they work together, how long will it take them to complete the work?

A. 6 days
B. 8 days
C. 10 days
D. 5 days

Solution

A's work rate = 1/12, B's work rate = 1/15. Combined rate = 1/12 + 1/15 = 5/60 = 1/12. Time taken = 12 days.

Correct Answer: B — 8 days

Q. A and B can complete a work in 12 days and 15 days respectively. If they work together, how many days will they take to complete the work?

A. 6 days
B. 7 days
C. 8 days
D. 9 days

Solution

A's work rate = 1/12, B's work rate = 1/15. Combined work rate = 1/12 + 1/15 = 5/60 = 1/12. Time taken = 12 days.

Correct Answer: C — 8 days

Q. A and B start a race together. A runs at 10 km/h and B at 8 km/h. How far apart will they be after 1 hour?

A. 2 km
B. 1 km
C. 3 km
D. 4 km

Solution

Distance covered by A = 10 km, Distance covered by B = 8 km. Distance apart = 10 km - 8 km = 2 km.

Correct Answer: A — 2 km

Q. A and B start a race together. A runs at 10 km/h and B at 8 km/h. How far apart will they be after 30 minutes?

A. 1 km
B. 2 km
C. 3 km
D. 4 km

Solution

In 30 minutes, A runs 5 km and B runs 4 km. Distance apart = 5 km - 4 km = 1 km.

Correct Answer: A — 1 km

Q. A can complete a race in 120 seconds, while B can complete it in 180 seconds. How much time will A be ahead of B when they finish the race?

A. 30 seconds
B. 40 seconds
C. 50 seconds
D. 60 seconds

Solution

A finishes in 120 seconds, B in 180 seconds. A is ahead by 180 - 120 = 60 seconds.

Correct Answer: B — 40 seconds

Q. A can finish a race in 100 seconds while B can finish it in 120 seconds. What percentage faster is A than B?

A. 20%
B. 25%
C. 15%
D. 30%

Solution

Speed of A = 1/100, Speed of B = 1/120. Percentage faster = ((1/100 - 1/120) / (1/120)) * 100 = 20%.

Correct Answer: B — 25%

Q. A can finish a race in 100 seconds, while B can finish it in 120 seconds. If they start together, how much time will A be ahead of B when they finish the race?

A. 20 seconds
B. 15 seconds
C. 10 seconds
D. 5 seconds

Solution

A's speed = 1/100, B's speed = 1/120. Time taken by A to finish = 100 seconds, B takes 120 seconds. A is ahead by 120 - 100 = 20 seconds.

Correct Answer: A — 20 seconds

Q. A can finish a race in 100 seconds, while B can finish it in 120 seconds. What is the percentage difference in their speeds?

A. 20%
B. 25%
C. 15%
D. 30%

Solution

Speed of A = distance/100, Speed of B = distance/120. Percentage difference = ((120 - 100) / 120) * 100 = 16.67%.

Correct Answer: B — 25%

Q. A can finish a race in 100 seconds, while B finishes it in 120 seconds. What percentage faster is A than B?

A. 20%
B. 25%
C. 15%
D. 30%

Solution

Speed of A = 1/100, Speed of B = 1/120. Percentage faster = ((120 - 100) / 120) * 100 = 16.67%.

Correct Answer: B — 25%

Q. A can run 10 km in 50 minutes. What is his speed in km/h?

A. 12 km/h
B. 10 km/h
C. 8 km/h
D. 15 km/h

Solution

Speed = Distance / Time = 10 km / (50/60) hours = 12 km/h.

Correct Answer: A — 12 km/h

Q. A can run 20% faster than B. If B can run 30 km in 3 hours, how far can A run in the same time?

A. 36 km
B. 32 km
C. 30 km
D. 28 km

Solution

B's speed = 30 km / 3 hours = 10 km/h. A's speed = 10 km/h * 1.2 = 12 km/h. Distance A can run in 3 hours = 12 km/h * 3 hours = 36 km.

Correct Answer: B — 32 km

Q. A can run 20% faster than B. If B can run 30 km in 3 hours, how much distance can A cover in the same time?

A. 36 km
B. 32 km
C. 30 km
D. 28 km

Solution

B's speed = 30 km / 3 hours = 10 km/h. A's speed = 10 km/h * 1.2 = 12 km/h. Distance A can cover in 3 hours = 12 km/h * 3 hours = 36 km.

Correct Answer: B — 32 km

Q. A can run a distance in 30 minutes, while B can run the same distance in 45 minutes. What is the ratio of their speeds?

A. 3:2
B. 2:3
C. 1:1
D. 4:3

Solution

Speed is inversely proportional to time. Ratio of speeds = 45:30 = 3:2.

Correct Answer: A — 3:2

Q. A can run a distance in 30 minutes, while B takes 45 minutes for the same distance. What is the ratio of their speeds?

A. 3:2
B. 2:3
C. 1:1
D. 4:3

Solution

Speed ratio = time taken by B : time taken by A = 45:30 = 3:2.

Correct Answer: A — 3:2

Q. A can run a distance in 30 minutes, while B takes 45 minutes. What is the ratio of their speeds?

A. 3:2
B. 2:3
C. 1:1
D. 4:3

Solution

Speed is inversely proportional to time. Ratio of speeds = 45:30 = 3:2.

Correct Answer: A — 3:2

Q. A can run a distance in 30 minutes. If he increases his speed by 50%, how much time will he take to cover the same distance?

A. 20 minutes
B. 25 minutes
C. 15 minutes
D. 10 minutes

Solution

If speed increases by 50%, time decreases by 1/(1 + 0.5) = 2/3. Time taken = 30 minutes * 2/3 = 20 minutes.

Correct Answer: A — 20 minutes

Q. A can run a race in 100 seconds, while B can run it in 120 seconds. If they start together, how much time will A lead B after 1 minute?

A. 20 seconds
B. 25 seconds
C. 30 seconds
D. 15 seconds

Solution

A's speed = 1/100, B's speed = 1/120. In 60 seconds, A covers 60/100 = 0.6 km, B covers 60/120 = 0.5 km. Lead = 0.6 - 0.5 = 0.1 km. Time lead = 0.1 / (1/100) = 10 seconds.

Correct Answer: B — 25 seconds

Q. A can run a race in 50 seconds and B can run it in 60 seconds. What is the percentage difference in their times?

A. 20%
B. 25%
C. 15%
D. 30%

Solution

Percentage difference = ((60 - 50) / 60) * 100 = 16.67%.

Correct Answer: A — 20%

Q. A can run a race in 50 seconds, while B can run it in 70 seconds. What is the ratio of their times?

A. 5:7
B. 7:5
C. 10:14
D. 14:10

Solution

Ratio of times = 50:70 = 5:7.

Correct Answer: A — 5:7

Q. A can run a race in 80 seconds and B can run it in 100 seconds. What is the percentage difference in their times?

A. 20%
B. 25%
C. 15%
D. 30%

Solution

Percentage difference = ((100 - 80) / 100) * 100 = 20%.

Correct Answer: A — 20%

Q. A can run a race in 80 seconds, while B can run it in 100 seconds. What is the percentage by which A is faster than B?

A. 20%
B. 25%
C. 15%
D. 30%

Solution

Percentage faster = ((100 - 80) / 100) * 100 = 20%.

Correct Answer: A — 20%

Q. A cyclist covers a distance of 90 km in 3 hours. What is his average speed?

A. 25 km/h
B. 30 km/h
C. 20 km/h
D. 35 km/h

Solution

Average speed = Total distance / Total time = 90 km / 3 hours = 30 km/h.

Correct Answer: B — 30 km/h

Q. A cyclist travels at a speed of 15 km/h. How long will it take to cover 45 km?

A. 2 hours
B. 3 hours
C. 4 hours
D. 5 hours

Solution

Time = Distance / Speed = 45 km / 15 km/h = 3 hours.

Correct Answer: B — 3 hours

Q. A horse runs 50% faster than a donkey. If the donkey runs at 12 km/h, how fast does the horse run?

A. 18 km/h
B. 20 km/h
C. 24 km/h
D. 30 km/h

Solution

Horse's speed = 12 km/h * 1.5 = 18 km/h.

Correct Answer: B — 20 km/h

Q. A jogger runs at a speed of 8 km/h. How far can he run in 45 minutes?

A. 5 km
B. 6 km
C. 7 km
D. 4 km

Solution

Distance = Speed * Time = 8 km/h * (45/60) hours = 6 km.

Correct Answer: A — 5 km

Q. A jogger runs at a speed of 8 km/h. How far will he run in 45 minutes?

A. 6 km
B. 5 km
C. 4 km
D. 3 km

Solution

Distance = Speed * Time = 8 km/h * (45/60) hours = 6 km.

Correct Answer: A — 6 km

Q. A jogs at a speed of 8 km/h and B jogs at 10 km/h. If they start together and A runs for 30 minutes, how far ahead will A be?

A. 2 km
B. 3 km
C. 4 km
D. 1 km

Solution

Distance A runs = 8 km/h * 0.5 h = 4 km. Distance B runs = 10 km/h * 0.5 h = 5 km. A is 1 km behind.

Correct Answer: A — 2 km

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