Question

Find the number of degrees moved by the minute hand of a clock in the given amount of time. 7/12 hour

Answer 1

To find the number of degrees moved by the minute hand in 7/12 hour, multiply 360 degrees by 7/12 to get 210 degrees.

Step-by-step explanation:

The minute hand of a clock moves 360 degrees in one hour. To find out how many degrees the minute hand moves in 7/12 hour, we multiply the total degrees in an hour by the fraction of the hour given.

First, calculate the fraction of an hour:

• 7/12 hour is the fraction of the hour we are interested in.

Next, calculate the total degrees the minute hand will move:

• 360 degrees (full revolution) × 7/12 = 210 degrees

Therefore, the minute hand will move 210 degrees in 7/12 of an hour.

Answer 2

The minute hand rotates 210º in
`(7)/(12)` hour.

Step-by-step explanation:

The minute hand rotates 360º each hour, then the amount of degrees moved by the minute hand of the clock in
`(7)/(12)` hour is determined by the following simple rule of three:

`x = 360^(\circ)* (7)/(12)`

`x = 210^(\circ)`

The minute hand rotates 210º in
`(7)/(12)` hour.