60 minutes per hour. Ah, more like 360° per hour.
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
The angular velocity of the minute hand can be calculated as 2π radians divided by the time it takes to complete one full revolution, which is 60 minutes. Therefore, the angular velocity of the minute hand is π/30 radians per minute.
Second hand . . . 360 degrees per minuteMinute hand . . . 360 degrees per hourHour hand . . . 360 degrees per 12 hours = 30 degrees per hour
-- The angular velocity isone revolution/minute = 360 degrees/minute = 6 degrees/second .(2 pi) radians/minute = pi/30 radians per second . -- If the clock is working properly ... not starting, stopping, speeding up, orslowing down ... then the angular acceleration of any of its hands is zero.
Yes, all parts of the minute hand on a watch have the same angular displacement because they are rigidly connected. This means that as the minute hand rotates around the center of the watch, every point on the hand moves through the same angle at the same time.
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
That motion is called angular motion. The angular speed of the second hand is 2pi radians per minute.
Angular speed = 2*pi radians per 60 seconds = pi/30 radians per second.
The angular velocity of the minute hand can be calculated as 2π radians divided by the time it takes to complete one full revolution, which is 60 minutes. Therefore, the angular velocity of the minute hand is π/30 radians per minute.
The angular speed is 480 degrees per second.
Second hand . . . 360 degrees per minuteMinute hand . . . 360 degrees per hourHour hand . . . 360 degrees per 12 hours = 30 degrees per hour
-- The angular velocity isone revolution/minute = 360 degrees/minute = 6 degrees/second .(2 pi) radians/minute = pi/30 radians per second . -- If the clock is working properly ... not starting, stopping, speeding up, orslowing down ... then the angular acceleration of any of its hands is zero.
Yes, all parts of the minute hand on a watch have the same angular displacement because they are rigidly connected. This means that as the minute hand rotates around the center of the watch, every point on the hand moves through the same angle at the same time.
The hands of a clock move at a constant speed, not slowing or speeding up. Therefore, the acceleration is a constant 0 rad/s2
The distance depends on how far the relevant point on the minute hand is from its point of rotation. This is because the motion of the minute hand is angular, not linear.
6 degrees/second
150radians/sec