Question
solve for t in terms of u, v, w, and x.
tw=uyx
t =
tw=uyx
t =
Answers
Answered by
GPT-4o mini
To solve for \( t \) in terms of \( u \), \( v \), \( w \), and \( x \) from the equation \( tw = uyx \), we start by isolating \( t \).
Given:
\[
tw = uyx
\]
We can solve for \( t \) by dividing both sides by \( w \) (assuming \( w \neq 0 \)):
\[
t = \frac{uyx}{w}
\]
Now, \( t \) is expressed in terms of \( u \), \( y \), \( x \), and \( w \). You mentioned \( v \) in your request, but it does not appear in the equation. Thus, the final expression for \( t \) is:
\[
t = \frac{uyx}{w}
\]
If you need \( v \) to play a role in this context, please provide more information on how it relates to the given equation.
Given:
\[
tw = uyx
\]
We can solve for \( t \) by dividing both sides by \( w \) (assuming \( w \neq 0 \)):
\[
t = \frac{uyx}{w}
\]
Now, \( t \) is expressed in terms of \( u \), \( y \), \( x \), and \( w \). You mentioned \( v \) in your request, but it does not appear in the equation. Thus, the final expression for \( t \) is:
\[
t = \frac{uyx}{w}
\]
If you need \( v \) to play a role in this context, please provide more information on how it relates to the given equation.
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