Answer:
2.8 cm
Explanation:
radius of front sprocket (R1) = 12 cm = 0.12 m
angular speed of the front sprocket (ω1) = 0.6 rev/s = 3.77 rad/s
radius of the rear wheel (R°2) = 0.31 m
tangential speed of the rear wheel (V°2) = 5 m/s
(take note that the tangential speed of the rear wheel is the same as that of the rear sprocket, V°2 = V2 (rear sprocket))
speed at any point on the front sprocket = speed at any point on the rear sprocket
V1 = V2 ....equation 1
V1 = 0.12 x 3.77 = 0.45 m/s
take note that the speed of the rear wheel is the same as the speed of
the rear sprocket, which means ω2 is the same for both the rear
wheel and the rear sprocket. This also means we can use the
parameters for the rear wheel (V°2 and R2°) to find ω2
ω2 = [tex]\frac{V°2}{R2°}[/tex]
ω2 = [tex]\frac{5}{0.31}[/tex] = 16.1 rad/s
therefore V2 = R1 x ω2 = 16.1 x R1
recall that V1 = V2 ....equation 1
now we can put the values of V1 and V2 into equation 1
0.45 = 16.1 x R1
R1 = 0.45 / 16.1 = 0.028 m = 2.8 cm
