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Clocks and Calendar - Clock Problem

Clocks and Calendar - Concepts

Clocks and Calendar - Angle Problem

Clocks and Calendar - Faulty Clock

Clocks and Calendar - Calendar Problem

Clocks and Calendar - Clock Problem

Calender Problem Basics

Day of The Week With Reference

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Concept Explanation

Clocks and Calendar - Clock Problem

Clocks and Calendar - Clock Problem: This concept revolves around the calculation of the angular distance traversed by the different hand of the clock. The different hands of the clock move with different speed.The hour hand takes 12 hours to traverse an angle of 360 degree, and the minute hand completes one rotation in one hour i.e. it covers $360^{0}$ in 1 hour .

Speed of minute hand = $360^{0}$ in 1 hour ( 60 min )

= $6^{0}$ per minute

Speed of hour hand = $360^{0}$ in 12 hours

= $30^{0}$ in 1 hour ( 60 min )

= $left ( frac{1}{2} right )^0; per;minute$

As they are moving in the same direction

So, the relative speed of minute hand over hour hand will be difference of their speeds

$=6^{0}-frac{1^{0}}{2}=frac{11^{0}}{2}; per; minute$

Illustration: At what time immediately after 2 o' clock, do the hands of clocks coincide?

A. 10 minutes 11 seconds. B. 10 minutes 10 seconds. C. 10 minutes 55 seconds. D. 9 minutes 55 seconds.

Answer: C

Solution: At 2 o'clock, the hands of the clock are $60^{0}$ apart.

The minute hand covers this $60^{0}$ at a speed of $frac{11^{0}}{2}$ per minute.

To cover $frac{11^{0}}{2}$ , time required = 1 min

TO cover $60^{0}$ , time required $=frac{2}{11}times60^{0}$

$=frac{120}{11}$

$=10frac{10}{11}$ minutes

If we convert $frac{10}{11}$ minutes to seconds, it is equal to $frac{10}{11}times60$

= 55 seconds (approx)

So, the answer is 10 minutes 55 seconds.

Sample Questions

(More Questions for each concept available in Login)

Question : 1

A clock is set right at 10 am. the clock gains 10 minute in 24 hours. What will be the right time when the clock indicates 1 pm on the following day?
A. 11.40 pm	B. 12.49pm	C. 12pm	D. 10pm
Right Option : B
View Explanation

Question : 2

At what time immediately after 5 o' clock, do the hands of clocks coincide?
A. 25 minutes 17 seconds.	B. 26 minutes 17 seconds.	C. 27 minutes 17 seconds.	D. 29 minutes 17 seconds.
Right Option : C
View Explanation

Question : 3

At what time between 4 and 5 o'clock will the hands of a watch point in opposite directions?
A. 45 minute past 4	B. 40 minute past 4	C. $50frac{4}{11}$ minute past 4	D. $54frac{6}{11}$ minute past 4
Right Option : D
View Explanation

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Clocks and Calendar - Clock Problem

Clocks and Calendar - Clock Problem

Students / Parents Reviews [10]

Archit Segal

Manish Kumar

Prisha Gupta

Shreya Shrivastava

Shivam Rana

Om Umang

Hiya Gupta

Yatharthi Sharma

Aman Kumar Shrivastava

Eshan Arora