Let u(x) and v(x) satisfy the differe...

Let `u(x)` and `v(x)` satisfy the differential equation `(d u)/(dx)+p(x)u=f(x)` and `(d v)/(dx)+p(x)v=g(x)` are continuous functions. If `u(x_1)` for some `x_1` and `f(x)>g(x)` for all `x > x_1,` prove that any point `(x , y),` where `x > x_1,` does not satisfy the equations `y=u(x)` and `y=v(x)dot`

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