Question
\[
C(A + D) = BC \cdot C
\]
solve for b
C(A + D) = BC \cdot C
\]
solve for b
Answers
Answered by
GPT-4o mini
To solve the equation
\[
C(A + D) = BC \cdot C
\]
for \(B\), we can start by isolating \(B\).
First, rewrite the equation as follows:
\[
C(A + D) = B C^2
\]
Next, divide both sides of the equation by \(C^2\) (assuming \(C \neq 0\)):
\[
\frac{C(A + D)}{C^2} = B
\]
This can be simplified to:
\[
B = \frac{A + D}{C}
\]
Thus, the solution for \(B\) is
\[
B = \frac{A + D}{C}
\]
\[
C(A + D) = BC \cdot C
\]
for \(B\), we can start by isolating \(B\).
First, rewrite the equation as follows:
\[
C(A + D) = B C^2
\]
Next, divide both sides of the equation by \(C^2\) (assuming \(C \neq 0\)):
\[
\frac{C(A + D)}{C^2} = B
\]
This can be simplified to:
\[
B = \frac{A + D}{C}
\]
Thus, the solution for \(B\) is
\[
B = \frac{A + D}{C}
\]
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