circumfrence off the circle
s = rθs=arc lengthr=radius lengthθ= degree measure in radiansthis formula shows that arc length depends on both degree measure and the length of the radiustherefore, it is possible to for two arcs to have the same degree measure, but different radius lengthsthe circumference of a circle is a good example of an arc length of the whole circle
depth equals volume divided by length times width
An arc can be measured either in degree or in unit length. An arc is a portion of the circumference of the circle which is determined by the size of its corresponding central angle. We create a proportion that compares the arc to the whole circle first in degree measure and then in unit length. (measure of central angle/360 degrees) = (arc length/circumference) arc length = (measure of central angle/360 degrees)(circumference) But, maybe the angle that determines the arc in your problem is not a central angle. In such a case, find the arc measure in degree, and then write the proportion to find the arc length.
Invalid conversion: square inches is a measure of area and inches is a measure of length or distance.
Divide the arc's degree measure by 360°, then multiply by the circumference of the circle.
The arc length is the radius times the arc degree in radians
Area divided by width equals length
A millimetre is a measure of distance or length that is, it measures linear displacement. A degree is a measure of angular displacement. The two measure different things and, according to basic principles of dimensional analysis, conversion from one to the other is not valid without further information.
It is usually a measure of distance. The distance is often along a straight line or it could refer to the length of an arc, and depends on the metric that is defined on the relevant space.
length plus width equals perimetre
The measure of the central angle divided by 360 degrees equals the arc length divided by circumference. So 36 degrees divided by 360 degrees equals 2pi cm/ 2pi*radius. 1/10=1/radius. Radius=10 cm.
s = rθs=arc lengthr=radius lengthθ= degree measure in radiansthis formula shows that arc length depends on both degree measure and the length of the radiustherefore, it is possible to for two arcs to have the same degree measure, but different radius lengthsthe circumference of a circle is a good example of an arc length of the whole circle
There are two different meanings of "degree", but none of them is a unit of length.
Not valid to change area measure to length measure
No, in order to fine the arc length you need a formula which is: Circumference x arc measure/360 degrees
A millimeter is a measure of length. It has nothing to do with the litre which is a measure of volume and is divided into 1,000 millilitres
345 mm is a measure of length. A measure of density would have units of mass divided by volume.