Unfortunately, we cannot determine the length of arcXPY without more information. We would need to know the measure of the central angle that subtends arc XPY in order to use the formula:
arc length = (central angle in radians) x (radius)
Without this information, we cannot give a specific answer in terms of pi.
What is the length of arcXPY in terms of pi? radious = 10m
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What is the length of arcXPY in terms of pi? radius = 10m
and 90 degrees is the central angle in the radians
and 90 degrees is the central angle in the radians
We know that the central angle is 90 degrees, which is equal to pi/2 radians. Therefore, we can use the formula:
arc length = (central angle in radians) x (radius)
arcXPY = (pi/2) x 10
arcXPY = 5pi
So the length of arcXPY in terms of pi is 5pi meters.
arc length = (central angle in radians) x (radius)
arcXPY = (pi/2) x 10
arcXPY = 5pi
So the length of arcXPY in terms of pi is 5pi meters.
1 answer