AetheronInc

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We are given the system of equations:

\(\frac{xy}{x + y} = 1, \quad \frac{xz}{x + z} = 1, \quad \frac{yz}{y + z} = 2\)

Step 1: Simplify each equation

Let’s start by simplifying the equations one by one.

From the first equation: \(\frac{xy}{x+y}=1\)
This implies:
\(xy=x+y\)
Rearranging:
\(xy-x-y=0\)
Factorizing:
\((x-1)(y-1)=1\)

From the second equation:
\(\frac{xz}{x+z}=1\)
This implies:
\(xz=x+z\)
Rearranging:
\(xz-x-z=0\)
Factorizing:
\((x-1)(z-1)=1\)

From the third equation:
\(\frac{yz}{y+z}=2\)
This implies:
\(yz=2(y+z)\)
Expanding:
\(yz=2y+2z\)
Rearranging:
\(yz-2y-2z=0\)
Factorizing:
\((y-2)(z-2)=4\)

Step 2: Analyze the system

We now have the following system of equations:

\((x-1)(y-1)=1\\ (x-1)(z-1)=1\\ (y-2)(z-2)=4\)

Step 3: Solve for the variables

From equations 1 and 2, we notice that:
\((x-1)(y-1)=(x-1)(z-1)=1\)
Since both are equal to 1, we can conclude that:
\(y-1=z-1\)
This gives us:
\(y=z\)

Substituting y = z into the third equation:
\((z-2)(z-2)=4\)
Expanding:
\((z-2)^2=4\)
Taking the square root of both sides:
\(z-2=\pm2\)
Therefore,
\(z=4\) or \(z=0\)

Step 4: Check each solution

Case 1: z = 4

If \(z=4\), then \(y=4\). Substituting \(y=4\) into equation 1:
\((x-1)(4-1)=1\\ (x-1)(3)=1\\ x-1=\frac{1}{3}\\ x=\frac{4}{3}\)

 

So, \(x=\frac{4}{3}\), \(y=z\), and \(z=4\) is a solution.

Case 2: z = 0

 

If \(z=0\), then \(y=0\). Substituting \(y=0\) into equation 1:
\((x-1)(0-1)=1\\ (x-1)(-1)=1\\ x-1=-1\\ x=0\)

 

So, \(x=0\), \(y=0\), and \(z=0\) is a possible solution. However, substituting into the second equation:
\( \frac{0 \times 0}{0+0}\nexists\), which is not valid. So, \(z=0\) is not a valid solution.

Step 5: Conclusion

The only valid solution is \(x=\frac{4}{3}\), \(y=4\), and \(z=4\). Therefore, the value of z is: \(z=4\).

Nov 20, 2024