A central angle can subtend (form) an arc of a circle. That has an area of 2 x pi x r x (angle A) / 360.
the general formula is arc length is equal the radius times the angle. s=r< s=arc length r=radius <=angle
the formula for the arc of a triangle is the arc length is equal to the angle times the radius. s=arc length theta=angle made y length of the arc lenth r=radius s=theta times radius
you need to know the formula the arc length is equal to the radius times the angle made by the length of arc s = r(theta) s=arc length r=radius theta=angle
s=arc lengthr=radiusAnswer: (r^2).(asin(s/(2r))-(s/16).sqrt(4r^2-s^2)
Area of a square: A=s*s A=s2
If you remove the battery You will see the following: LT18 or LT15 The LT15 is for the arc The LT18 is for the arc s
It depends on what it is ,for example ,the square"s area =side*side
the general formula is arc length is equal the radius times the angle. s=r< s=arc length r=radius <=angle
Area of a square is sides squared (s^2 or s*s). For Example if you want to find the area of a square with a side of 6 you would just square it, so the area would be 26 units^2.
the formula for the arc of a triangle is the arc length is equal to the angle times the radius. s=arc length theta=angle made y length of the arc lenth r=radius s=theta times radius
it is more accurately called the "arc" the arc in circles are measure by the radius and the angle of projection. the formula is... s=r(angle) s is the arc length r is the radius length angle is the angle that the entire arc length makes
you need to know the formula the arc length is equal to the radius times the angle made by the length of arc s = r(theta) s=arc length r=radius theta=angle
s=arc lengthr=radiusAnswer: (r^2).(asin(s/(2r))-(s/16).sqrt(4r^2-s^2)
Area of a square: A=s*s A=s2
If s represents the length of one side, the area is s * s or s2.
Sony Ericsson Xperia arc S was created in 2011.
We have a formula of finding the arc length, s = θr, where s is the length of the intercepted arc, θ is the central angle measured in radians, and r is the radius of the circle. So that we need to convert 50 degrees in radians. 1 degrees = pi/180 radians 50 degrees = 50(pi/180) radians = 5pi/18 radians s = θr (replace θ with 5pi/18, and r with 3.5) s = (5pi/18)(3.5) = (17.5/18) pi ≈ 3 Thus, the length of the arc is about 3.