Answer:[tex]1+10(1-\cos (\frac{\pi t}{9}))[/tex]
Step-by-step explanation:
Given
radius of wheel [tex]r=10 m[/tex]
Time period of Wheel [tex]T=18 s[/tex]
and [tex]T\cdot \omega =2\pi [/tex] , where [tex]\omega =angular velocity of wheel[/tex]
[tex]\omega =\frac{2\pi }{18}[/tex]
Let at any angle [tex]\theta [/tex]with vertical position of a point is given by
[tex]x=r\sin \theta [/tex]
[tex]y=y_0+r(1-\cos \theta )[/tex]
and [tex]\theta =\omega \times t[/tex]
for velocity differentiate x and y to get
[tex]v_x=r\cos \theta =r\cos (\omega t)[/tex]
[tex]v_y=0+r(\sin \theta )=r\sin (\omeag t)[/tex]
Height at any time t is given by
[tex]h=1+10(1-\cos \theta )=1+10(1-\cos (\frac{\pi t}{9}))[/tex]
