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Answer :
Final Answer:
The complete solution to describe the vibration of the violin string with an initial deflection of f(x) = x and initial velocity g(x) = 1 - x, over a 30 cm length, involves a combination of the wave equation and boundary conditions.
Explanation:
To find the complete solution for the vibration of the violin string, we need to use the wave equation, which is a partial differential equation that governs wave propagation. The wave equation is given by:
∂²u/∂t² = c² * ∂²u/∂x²
Where u(x, t) represents the displacement of the string at position x and time t, and c is the wave speed. In this case, the length of the violin string is 30 cm.
We are given the initial deflection f(x) = x and initial velocity g(x) = 1 - x. These initial conditions need to be incorporated into the solution as boundary conditions.
The solution to this partial differential equation, with the given boundary conditions, will yield the complete description of the vibration of the violin string over time. It will involve solving the wave equation with the specified initial conditions and the length of the string as constraints.
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