Hydrostatic Equation/Finding depth

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One atmosphere of pressure equals 101,325 Pa, and the density of water is 998 kg/m3. To find the depth needed to reach 2 atm of pressure, the hydrostatic equation p = -wh is used, where w is the specific weight calculated as 9790.38 N/m3. The resulting depth calculation yields approximately 20.7 meters, which should be expressed as a positive value since it represents depth below the surface. The discussion clarifies that the reference pressure is the surface pressure, making the calculation valid for determining the necessary depth to achieve 2 atm relative to the surface.
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One atmosphere of pressure is equal to 101,325 Pa. If the density of water is 998 kg/m3, what is the necessary depth to reach 2 atm of pressure relative to the surface



Hydrostatic equation: p=-wh where p is change in density, w is specific weight (density*gravity), and h is change in altitude.




Now the hydrostatic equation is p=-wh where p is change in density, w is specific weight, and h is change in altitude. Now, to get w, it is simply w=(998)(9.81)=9790.38. So we now have p=-(9790.38)h. Now it is (101325*2)=-(9790.38)h. Multiply and divide and we get -20.69889014=h.

My question is whether I did this right or not. If I was successful, should I put it as positive 20.698 meters?
 
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I do not think your equation applies. For this problem, the density of water can be considered constant (incompressible fluid assumption).
 
Well, he gave us a hint of: "Hint: what equation relates altitude (or depth) with pressure?"

This equation would make sense. I'm not sure what you mean by the density being a constant. It already is. However, when calculating for pressure you need the specific weight of water which requires gravity times density. Also, from what I was told, 1 atm is 10.3 meters, so this answer should make sense.
 
The answer does make sense. I am just questioning how you got there.
Hydrostatic equation: p=-wh where p is change in density...
So, what was the change in density... of a constant-density fluid?
 
My apologies, I meant p is change in pressure.
 
Then back to your original question, a positive number for "depth" is appropriate. Good work.
 
Well, now that I think about it, wouldn't this answer be wrong? If it is the change in pressure, and we are going down to 2atm, wouldn't it still come out at positive 1atm, since the starting atm is 1? Or do we just count the starting pressure as 0?!
 
what is the necessary depth to reach 2 atm of pressure relative to the surface
They are looking for relative pressure. Surface pressure is your reference.
Prelative = Pabsolute@20.6 - Pabsolute@0
 

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