Answer:
27.82 m/s
Explanation:
The radius of the hose is half of its diameter
[tex]r = d/2 = 5.45\times10^{-3}/2 = 0.002725 m[/tex]
So its area must be
[tex]A = \pi r^2 = \pi 0.002725^2 = 2.33\times10^{-5} m^2[/tex]
The speed of water coming out of the hose is its flow rate divided by the cross-section area of the hose
[tex]v = \dot{V}/A =0.000649 / 2.33\times10^{-5} = 27.82 m/s[/tex]
