A circle measures 360 degrees. If this circle were marked with numbers like a clock, every number would represent 30 degrees farther from 0 and closer to 360 degrees. If an angle marker typically found at 11:00 were to rotate to the place normally marked for 4:00, what is the degree measure of the angle formed moving clockwise?
90 isnt an option
options are 120 degrees, 240 degrees, 150 degrees, and 330 degrees
Apologies for the error in the previous response. To find the degree measure of the angle formed when the angle marker moves from 11:00 to 4:00, we need to find the clockwise difference between these two positions.
11:00 represents 30 degrees (since each hour on the clock corresponds to 30 degrees).
4:00 represents 120 degrees.
To find the clockwise difference, we subtract 30 degrees from 120 degrees:
120 degrees - 30 degrees = 90 degrees.
Therefore, the degree measure of the angle formed moving clockwise is 90 degrees. Answer: \boxed{90}.
Well, let's break it down.
Normally, at 11:00, the angle marker would indicate 330 degrees (11 multiplied by 30 degrees). Now, if it rotates to the 4:00 position, which is 120 degrees (4 multiplied by 30 degrees), we need to calculate the difference between the two positions.
So, the angle formed by moving clockwise from 11:00 to 4:00 would be 120 degrees - 330 degrees... but wait, negative degrees are not really a thing, right?
In this case, we can think of it as wrapping around the circle. 360 degrees of the circle is the same as 0 degrees. So, we add 360 degrees to the negative result.
Thus, the degree measure of the angle formed moving clockwise from 11:00 to 4:00 would be -210 degrees + 360 degrees, which equals 150 degrees!
Why did the angle marker go to 4:00? Because it wanted to be fashionably late to the 5:00 party!
To find the degree measure of the angle formed by moving clockwise from 11:00 to 4:00 on a circle, we need to find the difference in degrees between these two positions.
From 11:00 to 12:00, the clockwise movement covers 30 degrees.
From 12:00 to 4:00, the clockwise movement covers 4 hours. Since each hour on a clock represents 30 degrees, 4 hours would represent 4 * 30 = 120 degrees.
Therefore, the total degree measure of the angle formed by moving clockwise from 11:00 to 4:00 is 30 degrees (from 11:00 to 12:00) + 120 degrees (from 12:00 to 4:00) = 150 degrees.
To find the degree measure of the angle formed, we need to find the difference between the positions of 11:00 and 4:00 on the clock.
11:00 represents 330 degrees (11 times 30 degrees = 330 degrees).
4:00 represents 120 degrees (4 times 30 degrees = 120 degrees).
To find the difference, we subtract 120 degrees from 330 degrees:
330 degrees - 120 degrees = <<330-120=210>>210 degrees.
Therefore, the degree measure of the angle formed moving clockwise is 210 degrees. Answer: \boxed{210}.
I apologize for the confusion. Let's try solving it again.
To find the degree measure of the angle formed when the angle marker moves from 11:00 to 4:00, we need to consider that each hour on the clock represents 30 degrees.
11:00 represents 11 hours * 30 degrees/hour = 330 degrees.
4:00 represents 4 hours * 30 degrees/hour = 120 degrees.
To find the clockwise difference between the positions, we subtract 120 degrees from 330 degrees:
330 degrees - 120 degrees = 210 degrees.
Therefore, the degree measure of the angle formed moving clockwise is 210 degrees. Answer: \boxed{210}.