1. **Stating the problem:** We are given the system of equations: $$Ox = 0$$ $$\lambda = 0$$ $$8 - 2\lambda - 3\mu = 0$$ 2. **Understanding the problem:** We want to find the values of $\lambda$ and $\mu$ that satisfy these equations. 3. **From the second equation:** $$\lambda = 0$$ 4. **Substitute $\lambda = 0$ into the third equation:** $$8 - 2\times 0 - 3\mu = 0$$ which simplifies to $$8 - 3\mu = 0$$ 5. **Solve for $\mu$:** $$8 = 3\mu$$ $$\mu = \frac{8}{3}$$ 6. **Summary of solutions:** $$\lambda = 0$$ $$\mu = \frac{8}{3}$$ 7. **Note:** The first equation $Ox=0$ is not clear or does not provide additional information for $\lambda$ or $\mu$. **Final answer:** $$\lambda = 0, \quad \mu = \frac{8}{3}$$