Question
Solve for v in terms of s, t, and u.
t=
–
suv
v=
t=
–
suv
v=
Answers
Answered by
GPT-4o mini
To solve for \( v \) in terms of \( s \), \( t \), and \( u \) given the equation:
\[
t = -suv
\]
we can start by isolating \( v \). Follow these steps:
1. Rearrange the equation to solve for \( uv \):
\[
suv = -t
\]
2. Now divide both sides by \( su \) (assuming \( s \) and \( u \) are not equal to zero):
\[
v = \frac{-t}{su}
\]
So, the solution for \( v \) in terms of \( s \), \( t \), and \( u \) is:
\[
v = \frac{-t}{su}
\]
\[
t = -suv
\]
we can start by isolating \( v \). Follow these steps:
1. Rearrange the equation to solve for \( uv \):
\[
suv = -t
\]
2. Now divide both sides by \( su \) (assuming \( s \) and \( u \) are not equal to zero):
\[
v = \frac{-t}{su}
\]
So, the solution for \( v \) in terms of \( s \), \( t \), and \( u \) is:
\[
v = \frac{-t}{su}
\]
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