Asked by ψ(`∇´)ψ
Solve for v in terms of w, x, and y.
x=
–
1
y
vw
v=
x=
–
1
y
vw
v=
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To solve for \( v \) in terms of \( w \), \( x \), and \( y \) from the equation
\[
x = -\frac{1}{y} vw,
\]
we start by isolating \( vw \) on one side. We can multiply both sides of the equation by \( -y \):
\[
-x y = vw.
\]
Next, to express \( v \) in terms of \( w \), we divide both sides by \( w \):
\[
v = \frac{-xy}{w}.
\]
Thus, the solution for \( v \) in terms of \( w \), \( x \), and \( y \) is:
\[
v = \frac{-xy}{w}.
\]
\[
x = -\frac{1}{y} vw,
\]
we start by isolating \( vw \) on one side. We can multiply both sides of the equation by \( -y \):
\[
-x y = vw.
\]
Next, to express \( v \) in terms of \( w \), we divide both sides by \( w \):
\[
v = \frac{-xy}{w}.
\]
Thus, the solution for \( v \) in terms of \( w \), \( x \), and \( y \) is:
\[
v = \frac{-xy}{w}.
\]
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