Question

Water drips from the nozzle of a shower onto the floor 189 cm below. The drops fall at regular (equal) intervals of time, the first drop striking the floor at the instant the fourth drop begins to fall. When the first drop strikes the floor, how far below the nozzle are the (a) second and (b) third drops?

Answer 1

0.83999 m

0.20999 m

Step-by-step explanation:

g = Acceleration due to gravity = 9.81 m/s² = a

s = 189 cm

`s=ut+(1)/(2)at^2\\\Rightarrow 1.89=0t+(1)/(2)* 9.81* t^2\\\Rightarrow t=\sqrt{(1.89* 2)/(9.81)}\\\Rightarrow t=0.62074\ s`

When the time intervals are equal, if four drops are falling then we have 3 time intervals.

So, the time interval is

`t'=(t)/(3)\\\Rightarrow t'=(0.62074)/(3)\\\Rightarrow t'=0.206913\ s`

For second drop time is given by

`t''=2t'\\\Rightarrow t''=2* 0.2069133\\\Rightarrow t''=0.4138266\ s`

Distance from second drop

`s=ut+(1)/(2)at^2\\\Rightarrow y''=ut''+(1)/(2)at''^2\\\Rightarrow s=0* t+(1)/(2)* 9.81* 0.4138266^2\\\Rightarrow s=0.839993\ m`

Distance from second drop is 0.83999 m

Distance from third drop

`s=ut+(1)/(2)at^2\\\Rightarrow y''=ut'+(1)/(2)at'^2\\\Rightarrow s=0* t+(1)/(2)* 9.81* 0.206913^2\\\Rightarrow s=0.20999\ m`

Distance from third drop is 0.20999 m