Answer:
[tex]P_g' = 0.075 atm[/tex]
Explanation:
Gauge pressure at the bottom of the cylinder depends on the height of water in the cylinder
So here we can say that
[tex]P_g = \rho g h[/tex]
now when liquid is filled to height "h" in base area "A" then gauge pressure of the liquid at the bottom is given as
[tex]P_g = 0.30 atm[/tex]
now we put the whole liquid into another cylinder with twice radius of the first cylinder
So area becomes 4 times
now by volume conservation we can say that if area is increased by 4 times then height of liquid will decrease by 4 times
so we have
[tex]h' = \frac{h}{4}[/tex]
so gauge pressure is given as
[tex]P_g' = \frac{0.30}{4} = 0.075 atm[/tex]
