If the radius of the circle is r units and the angle subtended by the arc at the centre is x radians, then the length of the arc is r*x units.
If you are still working with angles measured in degrees, then the answer is
r*pi*y/180 where the angle is y degrees.
If r and x (or y) are not available, or cannot be deduced, then you cannot find the length of the arc.
The answer depends on the information that you have. If the arc subtends an angle of x radians in a circle with radius r cm, then the arc length is r*x cm.
If you have only the arc length then you cannot find the diameter.
If you have the arc length:where:L is the arc length.R is the radius of the circle of which the sector is part.
Find the circumference of the whole circle and then multiply that length by 95/360.
It depends on what information you do have.
find the arc length of minor arc 95 c= 18.84
The answer depends on the information that you have. If the arc subtends an angle of x radians in a circle with radius r cm, then the arc length is r*x cm.
It will be 1/3 of the circle's circumference
5.23
I'm assuming that "c" is short for "circumference". The length of an arc is (circumference)*(360/angle). So the length of an arc in a circle with circumference length of 18.84 is 6782.4/angle, where the angle is measured in degrees.
13.08
the fraction of the circle covered by the arc
If you have only the arc length then you cannot find the diameter.
If you have the arc length:where:L is the arc length.R is the radius of the circle of which the sector is part.
Find the circumference of the whole circle and then multiply that length by 95/360.
To find the arc length, you also need to know the radius (or diameter) of the arc. The arc length is then found by finding the circumference of the full circle (2xPIxradius) and then dividing by 4 to find just one quarter of the circle (90 degrees).
19.28