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What is the length of a minor arc that has a central angle of 120 and a diameter of 10?
r*theta = where theta is the angle measured in radians.
= 5*120*pi/180 = 10.472 units (approx).
r*theta = where theta is the angle measured in radians.
= 5*120*pi/180 = 10.472 units (approx).
r*theta = where theta is the angle measured in radians.
= 5*120*pi/180 = 10.472 units (approx).
r*theta = where theta is the angle measured in radians.
= 5*120*pi/180 = 10.472 units (approx).
What else can I help you with?
What is the arc length of the minor arc of 85 and 13?
To find the arc length of a minor arc, you need the radius of the circle and the central angle in radians. If the central angle is given in degrees, convert it to radians by multiplying by (\frac{\pi}{180}). Assuming you have a circle with a radius of 85 units and a central angle of 13 degrees, the formula for arc length is (L = r \theta), where (r) is the radius and (\theta) is the angle in radians. Thus, the arc length would be (L = 85 \times \left(\frac{13 \times \pi}{180}\right)).
Is the central angle of a minor arc an acute angle?
Not necessarily. Only if the minor arc is less than 1/4 of the circle. If the minor arc is more than 1/4 of the circle, then the central angle is obtuse.
What is the length of the minor arc if the angle is 30 degrees?
It's 0.524 of the length of the radius.
If the measure of a minor arc is 155 what is the measure of its central angle?
Oh, dude, it's like a piece of cake! So, a minor arc is like a slice of pizza, right? And the central angle is like the angle at the center of the pizza. If the minor arc is 155 degrees, then the central angle is also 155 degrees. Easy peasy, lemon squeezy!
What is the relation between inscribed angle and central angle of minor arc?
minor arc of cord is half of major arc of same cord
What is the arc length of the minor arc if the central angle is 150 and the circumference is 31.4?
Minor arc/Circumference = 150/360 Minor arc = 31.4*150/360 = 13.0833...
What is the arc length of the minor arc of 85 and 13?
To find the arc length of a minor arc, you need the radius of the circle and the central angle in radians. If the central angle is given in degrees, convert it to radians by multiplying by (\frac{\pi}{180}). Assuming you have a circle with a radius of 85 units and a central angle of 13 degrees, the formula for arc length is (L = r \theta), where (r) is the radius and (\theta) is the angle in radians. Thus, the arc length would be (L = 85 \times \left(\frac{13 \times \pi}{180}\right)).
Is the central angle of a minor arc an acute angle?
Not necessarily. Only if the minor arc is less than 1/4 of the circle. If the minor arc is more than 1/4 of the circle, then the central angle is obtuse.
Is The central angle of a minor arc is an acute angle?
Not necessarily. It can be obtuse. It cannot, however, be a reflex angle.
What is the length of the minor arc if the angle is 30 degrees?
It's 0.524 of the length of the radius.
If the measure of a minor arc is 155 what is the measure of its central angle?
Oh, dude, it's like a piece of cake! So, a minor arc is like a slice of pizza, right? And the central angle is like the angle at the center of the pizza. If the minor arc is 155 degrees, then the central angle is also 155 degrees. Easy peasy, lemon squeezy!
What is the relation between inscribed angle and central angle of minor arc?
minor arc of cord is half of major arc of same cord
In the diagram below what is the approximate length of the minor arc X?
I'm sorry, but I can't see any diagrams or images. To determine the approximate length of the minor arc X, you would typically need to know the radius of the circle and the central angle that subtends the arc. The formula for the length of an arc is given by ( L = \frac{\theta}{360} \times 2\pi r ), where ( L ) is the arc length, ( \theta ) is the central angle in degrees, and ( r ) is the radius. If you can provide those values, I can help you calculate the length of the arc.
Is the measure of a minor arc equal to the measure of its central angle?
CONGRUENT
What does the central angle split the circle into?
A central angle splits a circle into two distinct arcs: a major arc and a minor arc. The minor arc is the smaller arc that lies between the two points on the circle defined by the angle, while the major arc is the larger arc that encompasses the rest of the circle. The measure of the central angle is equal to the measure of the minor arc it subtends.
How do you find measure of minor arc?
the measure of a minor arc equals the measure of the central angle that intercepts it.
What is the length of the minor arc if the angle in the circle is 90 and the radius of the circle is 15?
The total circumference of the circle is (2 pi R) = 30 pi.The central angle of 90° is 90/360 = 1/4 of the circle.The minor arc = 30 pi/4 = 23.562 (rounded)
