Given the width of the lawnmower is 2.5 feet and the length of the rope is 25 feet, calculate the radius (R) of the pole that will produce a perfect lawn

The radius is 0.398 feet to produce a perfect lawn for the lawnmower.It is given that the width of the lawnmower is 2.5 feet and the length of the rope is 25 feet.It is required to calculate the radius (R) of the pole that will produce a perfect lawn.What is a circle?It is defined as the combination of points that and every point has an equal distance from a fixed point ( called the center of a circle). We have,Width of the lawnmower =  2.5 feetLength of the rope = 25 feetFor the perfectly mowed lawn, it means the lawnmower width which is 2.5 feet must wrap the pole with radius R, mathematically:The perimeter of the pole = width of the lawnmower2πR = 2.5R =  0.398 Feet     ( π = 3.14 )Thus, the radius is 0.398 feet to produce a perfect lawn for the lawnmower.Learn more about circle here: