A clock's minute hand moves 60 grade in 10 minutes and 180 grade in 30 minutes low far does it move from 11:00 to 11:40? What is the problem asking you to find? The measure of the angle on a clock from What do you need to know to solve the problem? What is the measure of the angle from 11:00 to 11:30?- What is the measure of the angle from m:30 to 11:40? How can you find the missing angle measure? You can use an equation. Write an addition equation. Angle from Angle from Angle from 11:00 to 11:30 11:30 to 11:40 11:00 to 11:40...Subtract to check the sum Angle from Angle from Angle from 11:00 to 11:40 11:00 to 11:30 11:30 to 11:40 From 11:00 to 11:40, the minute hand moves
It moved 60° in 10 minute.
11:00 t0 11:40 is 40 minutes.
4 times as long, 4 times as many degrees: 240°
To find out how far the minute hand moves from 11:00 to 11:40, we can break it down into smaller intervals.
First, we need to find the measure of the angle from 11:00 to 11:30. We know that the minute hand moves 180 degrees in 30 minutes, so for 30 minutes, it moves 180 degrees.
Next, we need to find the measure of the angle from 11:30 to 11:40. We are given that the minute hand moves 60 degrees in 10 minutes, so for 10 minutes, it moves 60 degrees.
To find the missing angle measure from 11:00 to 11:40, we need to add the angles from 11:00 to 11:30 and from 11:30 to 11:40. So the equation becomes:
Angle from 11:00 to 11:40 = Angle from 11:00 to 11:30 + Angle from 11:30 to 11:40
Substituting the values we found earlier:
Angle from 11:00 to 11:40 = 180 degrees + 60 degrees
Angle from 11:00 to 11:40 = 240 degrees
Therefore, the minute hand moves 240 degrees from 11:00 to 11:40.