From seven o'clock to (), the clock hand rotates 30 degrees clockwise around o point, and the minute hand rotates () degrees clockwise around o point

From seven o'clock to (), the clock hand rotates 30 degrees clockwise around o point, and the minute hand rotates () degrees clockwise around o point

From seven o'clock to eight o'clock, the clock hand rotates 30 degrees clockwise around o point, and the minute hand rotates 360 degrees clockwise around o point

How many degrees can the minute hand of the clock coincide with the hour hand when it is rotated clockwise from the four o'clock position? The best equation is equation

((4*5)/(1-5/60))*(360/60)
=(20/(1-1/12))*6
=(20/(11/12))*6
=(20*(12/11))*6
=(240/11)*6
=1440/11
=130 (10 / 11) degrees

How many degrees clockwise does the minute hand of the clock coincide with the hour hand,
When the minute hand of the clock rotates clockwise from four o'clock, how many degrees can the minute hand coincide with the hour hand?

Because the minute hand is going when the hour hand is going, so the minute hand not only has to go 12 to 4, but also has to go where the hour hand is going. Because everyone walks at the same time, the distance is in direct proportion to the speed. The speed ratio of the hour hand and the minute hand is 1 / 12. Let the minute hand go x degrees, and the equation: (X-30 * 4) / x = 1 / 12, x = 130.9 degrees, that is