Each edge of the winding walkway in the diagram is made of two circular arcs with a radius of 25 feet. the radius is depicted by a dashed line. if the width of the walkway is 5 feet, what is the difference of the lengths of the two edges of the walkway?
answer choices:
0.50 feet
1.25 feet
1.80 feet
2.15 feet
view the attachment for the picture.

Refer to the table below if needed. second quadrant third quadrant fourth quadrant sin(1800- - cos(180° -) tan(180°-e) =- tane cot(1800-0) 10 it to solo 888 sin(180° +c) = - sine cos(180° +) =- cose tan(180° +c) = tane cot(180° +o) = cote sec(180° + c) = - seco csc(180° +2) = - csce sin(360° -) =- sine cos(360° -) = cose tan(360° - e) =- tane cot(360° -) = -cote sec(360° -) = seco csc(360° -) = csco sec(180° -) = csc(180° -) = csca 1991 given that sine = 3/5 and lies in quadrant ii, find the following value. tane

The test scores of 32 students are listed below. construct a boxplot for the data set and include the values of the 5-number summary. 32 37 41 44 46 48 53 55 57 57 59 63 65 66 68 69 70 71 74 74 75 77 78 79 81 82 83 86 89 92 95 99

What is the quotient of m^6/5 ÷ 5/m^2? assume m does not equal pl