150°, each 5 minute section of the clock is 30°, the minute hand will be at 12, and the hour hand on 5, 5x30=150.
the answer is 5:20
Hour hand is on the seven and eight and minute hand is on the 5.
short answer 150o long answer a hour hand pointing at 5 and the minute hand pointing at 12. the calculation is as follows 5(360/12) = 150 the 12 is because their are 12 numbers on a clock, ie the clock is divided evenly into twelfths. 5 is the fifth number after 12 so the resulting number is multiplied by 5
The little hand is on the 11 and the big hand is on the 5.
The minute hand will be on the 6 and the hour hand on the 5. This is is somewhat like 5:30, but at 5:30, the minute hand would still point to the six but the hour hand would be midway between the 5 and 6. There is no time when the hour hand is on the 5 and the minute hand on the 6.
the long hand is the minute hand the short hand is the hour hand the short hand show the hours the minute hand show minutes the long goes by 5's so if it was on the 4 i would be 20 mins
Angular speed is angle covered by time taken ... in 60 min the angle covered by minute hand is 360. in 5 min it will be 360/60x 5 it will be 30 degrees or pie/6 time taken is 5 minutes Angular velocity --- pie/6x5 pie/30
According to that, the hand will move 5/60 or 1/12. Every minute on a clock face is 6 degrees. An hour hand will move 30 degrees in an hour.
5:36. the 28 minute mark is between 5 and 6; there the hour is 5. there are 5 minutes between the 5 (25 minutes) and 6 (30 minutes). every minute represents 12 minutes (60 minutes/5 minutes). 28 minutes is the 3rd minute b/t 5 and 6. 3 x 12=36. 5:36. on a clock, the small hand (hour hand) moves to the next minute marker every 12 minutes.
The hour hand moves 360/12=30 degrees every hour (so in 12 hours it moves 360 degrees -- back to where it started). One minute is 1/60 of an hour, so in 1 minute the hour hand moves 30/60=1/2 degree. In the meantime the minute hand has moved 1/60th of the distance around the clock, or 1/60 x 360 = 6 degrees. So at 12:01 the angle between the hands is 6 - 1/2 = 5 1/2 degrees
Assuming that you are referring to a clock face, the long hand represents the minute's hand. To calculate how many minutes the long hand will take to move from 1 to 8, we need to determine the angle between these two positions on the clock face. A clock face is divided into 12 hours, and each hour represents 30 degrees (360 degrees divided by 12 hours). Thus, each minute represents 1/60th of an hour or 0.5 degrees (30 degrees divided by 60 minutes). Therefore, the angle between two consecutive minute marks on the clock face is 6 degrees (0.5 degrees multiplied by 12). To move from 1 to 8, the long hand must pass over 7 minute marks (1, 2, 3, 4, 5, 6, and 7), which represents an angle of 42 degrees (7 multiplied by 6). Since the long hand moves at a constant rate, we can use the formula: time = (angle between the two positions) / (rate of movement) The rate of movement for the long hand is 360 degrees per 60 minutes, or 6 degrees per minute. Thus, the time taken for the long hand to move from 1 to 8 would be: time = 42 degrees / 6 degrees per minute = 7 minutes Therefore, the long hand would take 7 minutes to move from 1 to 8 on a clock face.