Respuesta :
Answer:
Height covered after crossing window top = 0.75 m
Explanation:
In the question,
The height of the window pane = 1.8 m
Time for which the flowerpot is in view = 0.66 s
So,
The time for which it was in view while going up is = 0.33 s
Time for which it was in view while going down = 0.33 s
So,
Let us say,
The initial velocity of the flowerpot = u m/s
So,
Using the equation of the motion,
[tex]s=ut+\frac{1}{2}at^{2}\\1.8=u(0.33)-\frac{1}{2}(9.8)(0.33)^{2}\\1.8=0.33u-0.5336\\0.33u=2.33\\u=7.07\,m/s[/tex]
So,
Velocity at the top of the window pane is given by,
[tex]v=u+at\\v=7.07-(9.8)(0.33)\\v=3.836\,m/s[/tex]
Now,
Let us say the height to which the flowerpot goes after crossing the window pane is = h
So,
Using the equation of motion,
[tex]v^{2}-u^{2}=2as\\(0)^{2}-(3.836)^{2}=2(-9.8)h\\h=\frac{14.714}{19.6}\\h=0.75\,m[/tex]
Therefore, the height covered by the flowerpot after window is = 0.75 m
