Answer:
Angular velocity:
[tex]w=1.2/s[/tex]
Linear velocity:
[tex]v=6.24m/s[/tex]
Explanation:
When he swings he es ina a circular movement with radius 5.2m. To maintain this circular movement at any time there must be total force on Tarzan equal to the centripetal force:
[tex]F_{cent}=m*r*w^{2}[/tex]
where m is his mass, r the radius and w the angular velocity. At the lowest point on Tarzan there are two forces acting, gravity and the rope tension, this rope tension equals the force on Tarzan arms:
[tex]F_{tot}=T-W[/tex]
Where T is the tension on his arms, and W the weigth calculated as:
[tex]W=m*g[/tex]
Where g is the acceleration of gravity. replacing this and remembering that the total force must equal the centripetal force:
[tex]F_{tot}=T-m*g[/tex]
[tex]F_{cent}=m*r*w^{2}=T-m*g[/tex]
Solving for w:
[tex]w=\sqrt{\frac{T/m-g}{r}}=\sqrt{\frac{1420N/81.9kg-9.8m/s^{2}}{5.2m}}=1.2/s[/tex]
To get the linear velocity at this point:
[tex]v=w*r=1.2/s*5.2m=6.24m/s[/tex]
