Respuesta :
Answer: 2.5 m/s
Explanation: The velocity in in uniform circular motion is given by:
v=w^2*r where w is angular frequency
w=2*Pi/T where T is the period
Finally we can calculate v= (2*Pi)^2/T^2*R where R=1 m
Answer:
16m/s
Explanation:
The velocity v is given by the following relationship;
[tex]v=\omega R.......... (1)[/tex]
where [tex]\omega[/tex] is the angular velocity and R is the radius of the circular path. Angular velocity is defined as the number of revolutions made by a body in circular motion per unit time or the angle turned through per unit time. It is measured in radians per second.
Also, the following relationship holds for [tex]\omega[/tex];
[tex]\omega=\theta /t...............(2)[/tex]
where [tex]\theta[/tex] is the angle turned through and t is the time taken.
Given; t = 4s, number of revolutions n = 10.
The angle turned can be obtained from the number of revolutions by recalling the following;
[tex]1 revolution=2\pi rad\\hence\\10revolutions=10*2\pi rad=20\pi rad[/tex]
Hence; [tex]\theta=20\pi rad[/tex]
Substituting [tex]\theta[/tex] and t into equation (2), the obtain the angular velocity as follows;
[tex]\omega=20\pi/4\\\omega=5\pi rads^{-1[/tex]
Finally we substitute into equation (1) to obtain the linear velocity v as required.
[tex]v=5\pi*1=5\pi m/s[/tex]
Taking [tex]\pi =22/7[/tex];
v = 15.7m/s which is approximately 16m/s
