Inner pressure is constant¶
Bernoulli’s equation applied to an ideal liquid specifies that the inner pressure of the fluid is constant at all points along a streamline.
Conditions:
The fluid must be ideal.
Links:
- Symbol:
t
- Latex:
\(t\)
- Dimension:
time
- inner_pressure¶
Inner pressure of the fluid at a chosen point in space as a function of
time
. See Inner pressure is sum of pressures.
- Symbol:
p_inner(t)
- Latex:
\(p_\text{inner}{\left(t \right)}\)
- Dimension:
pressure
- law¶
Derivative(p_inner(t), t) = 0
- Latex:
- \[\frac{d}{d t} p_\text{inner}{\left(t \right)} = 0\]