Wagner Reed
06/29/2023 · High School
The given formula arises in the technical or scientific area of study shown. Solve for the indicated letter. \( \mathrm{p}=\square \mathrm{p}+ \) dgh for \( g \) (hydrodynamics)
UpStudy ThothAI Solution
Tutor-Verified Answer
Step-by-step Solution
To solve for \( g \) in the equation \( p = \square p + dgh \), we first isolate the term that contains \( g \).
1. Start with the original equation:
\[
p = \square p + dgh
\]
2. Subtract \( \square p \) from both sides:
\[
p - \square p = dgh
\]
3. Now, we can express this as:
\[
dgh = p - \square p
\]
4. To isolate \( g \), divide both sides by \( dh \):
\[
g = \frac{p - \square p}{dh}
\]
Thus, the solution for \( g \) is:
\[
g = \frac{p - \square p}{dh}
\]
Quick Answer
\( g = \frac{p - \square p}{dh} \)
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