Bernoulli's Principle and water tank

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mad_monkey_j
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Homework Statement



A sealed tank is completely full of water. The water in the tank is stationary. The gauge pressure at the top of the tank is 150 kPa.
A mechanical failure of the tank creates a hole of area 1.00 cm2 at the top of the tank. Water flows out of the hole, rising in a vertical column.

What is the speed of the water as it emerges from the hole?

What is the height of the column of water?

Homework Equations



P+1/2*rho*v^2+rho*gy=constant
v=(2gh)^1/2


The Attempt at a Solution



I calculated the abs pressure as 251.3k Pa
But then i don't know how to find the speed without the height of the water?
 
on Phys.org
Considering the tank is completely full of water, I think the gauge pressure would be the absolute pressure?

Anyway;

[tex]P =\rho gh[/tex]

You know what the pressure at the top of the tank is, you know what the density of water is, and you know what gravity is.

:)
 
Did not think of using that equation at all, thanks.
 
No worries. On second thought though, they specifically say gauge pressure, so you were probably right on the absolute pressure you calculated before.
 
Yeah the absolute pressure I calculated was right.