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In 60 minutes, the minute hand completely circumnavigates the face of the clock,

and returns to where it was 60 minutes earlier. That's a travel of 360 degrees.

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Q: How angle described by minute hand in 60 minute?
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What is the angle turned by hour hand of a clock in 30 minutes and 15 seconds?

In one hour the hour hand completes 360/12 degree i.e. 30o. 1 hour is equal to 60 minutes so in 1 minute angle completed by hour hand is 30o/60 i.e 0.5o, so angle completed in 30 minutes is 0.5o x 30 = 15o. 1 minute is equal to 60 seconds so angle completed by hour hand in 1 sec is equal to 0.5o/60 so angle completed in 15 seconds is 0.5o x 15/60 = 0.125o. So, the total angle turned by our hand = 15o + 0.125o = 15.125o.


What is the measure of the smaller angle between the hour hand and the minute hand at 9.30 o'clock?

105 degrees.A clock has 60 divisions around the outer edge representing the 60 minutes per hour. At 9.30 the minute hand will be at exactly 30 minutes. The hour hand will be exactly halfway between 9 hours and 10 hours (which is equal to 47.5 minutes according to the 60 minute divisions).As there are 60 divisions, and a circle is equal to 360 degrees, then each division is equal to 6 degrees.Therefore, the difference in minute divisions between the two hands = 47.5 - 30 = 17.5. The angle is therefore equal to 17.5 * 6 = 105 degrees.


What is the angle for 1 minute?

1 minute is equal to one sixtieth (or 1/60) of a degree.


What is the angle between the two hands of a clock when the time is 3 hours 40 minutes 20 seconds?

This problem can be solved as follows: The angle Ah of the hour hand of a clock, measured from the position at noon or midnight when the hour and minute hands exactly coincide, is Ah = (360 degrees/12 hours)th, where th is the time in hours, including fractions of hours, because the hour hand moves the entire 360 degrees around the clock in 12 hours. Similarly, the angle Am of the minute hand = (360 degrees/60 minutes)tm, where tm is the time in minutes only, including fractions of minutes. The stated time is 3 + 40/60 + 20/3600 hours = 3.672222... hours and the angle is therefore about 110. 11666666... degrees, using the formula above. The time in minutes only is 40 + 20/60 = 40.33333...., so that the angle of the minute hand is 242 degrees. The difference between them is therefore about 131.833..... degrees, or in fraction form 131 and 5/6.


How many degrees does the minute hand of a clock turn in 10 minutes?

There are 360 degrees on the clock face that the minute hand travels in one hour which is 6 x 10 minutes. So the degrees turned by the minute hand in 10 minutes is 360/6 = 60

Related questions

What is the angle in nearest degrees created by the minute hand and the hour hand at 515?

60 degrees


What is the angle described by hour hand in 10 minutes?

60 minutes = one whole circle = 360 degrees. That is, 1 minute = 360/60 = 6 degrees So 10 minutes = 10*6 = 60 degrees.


What angle do the hand form at 10 o'clock?

The minute and hour hands form an angle of 60 degrees at 10 o'clock


How many seconds are in a minute of angle?

Each angle minute is divided into 60 seconds.


What is the angle turned by hour hand of a clock in 30 minutes and 15 seconds?

In one hour the hour hand completes 360/12 degree i.e. 30o. 1 hour is equal to 60 minutes so in 1 minute angle completed by hour hand is 30o/60 i.e 0.5o, so angle completed in 30 minutes is 0.5o x 30 = 15o. 1 minute is equal to 60 seconds so angle completed by hour hand in 1 sec is equal to 0.5o/60 so angle completed in 15 seconds is 0.5o x 15/60 = 0.125o. So, the total angle turned by our hand = 15o + 0.125o = 15.125o.


C code to find angle between hour hand and minute hand?

Lets start by thinking of a clock as a circle, with directly up being 0 degrees. At 12:00, both hands are at 0 pointing straight up. Every 60 minutes, the minute hand will make a complete revolution, so at any given time its angle is: minute_deg = minute * 360 / 60 = minute * 6; The hour hand will make a complete revolution every hour, so its formula is: hour_deg = hour * 360 / 12 = hour * 30; A function to find the angle would be: int angleBetweenHands(int hour, int minute) { if(hour > 12) // In case of 24 hour clock hour -= 12; int angle = hour * 30 - minute * 6; if(angle > 180) angle = 360 - angle; return(angle); }


Through what angle does the minute hand of a clock turn in 12 minute of time?

60 minutes = 1 rotation = 360 degrees So 12 minutes = 360*12/60 = 72 degrees.


What does Minute of angle mean?

A minute of angle is one sixtyeth of an angle. If you had a circle and took one degrees out from it. Then you split that into 60 parts. 1 part would be a minute of angle.


What is the angle of rotation of the minute hand of a clock moving from 610 to 700?

It will have moved through: (50/60)*360 = 300 degrees


How much is 1 minute of angle 700 meters?

1 minute of an angle is 1/60 of a degree. Minutes have no relationship with meters.


What is the measure of the smaller angle between the hour hand and the minute hand at 9.30 o'clock?

105 degrees.A clock has 60 divisions around the outer edge representing the 60 minutes per hour. At 9.30 the minute hand will be at exactly 30 minutes. The hour hand will be exactly halfway between 9 hours and 10 hours (which is equal to 47.5 minutes according to the 60 minute divisions).As there are 60 divisions, and a circle is equal to 360 degrees, then each division is equal to 6 degrees.Therefore, the difference in minute divisions between the two hands = 47.5 - 30 = 17.5. The angle is therefore equal to 17.5 * 6 = 105 degrees.


What is the angle for 1 minute?

1 minute is equal to one sixtieth (or 1/60) of a degree.