2. Solve the following problem. Uxx + Uyy + Uzz = 0, 0

Need help with PDE equation

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**Problem Statement:** 2. Solve the following problem. \[ u_{xx} + u_{yy} + u_{zz} = 0, \quad 0 < x < 2\pi, \quad 0 < y < \pi, \quad 0 < z < 1 \] Boundary Conditions: \[ u(x, y, 0) = \sin x \sin y, \quad u(x, y, z) = 0 \text{ on other faces} \] **Explanation:** The problem entails solving a partial differential equation of the form \( u_{xx} + u_{yy} + u_{zz} = 0 \), known as the Laplace equation, within a rectangular domain defined by the intervals \( 0 < x < 2\pi \), \( 0 < y < \pi \), and \( 0 < z < 1 \). **Boundary Conditions:** - On the face where \( z = 0 \), the function \( u(x, y, 0) \) is specified to be \( \sin x \sin y \). - The function \( u(x, y, z) \) is zero on all other boundary faces, implying homogeneous Dirichlet boundary conditions on these faces. This scenario requires solving for \( u(x, y, z) \) that satisfies both the Laplace equation and the given boundary conditions within the prescribed domain.