2. Let u,v be functions of x. The first order derivative of uv can be derived by the following product rule: (uv)⁰ = uºv + uvo. The general n-th order derivative of uv, called the general Leibniz rule, was obtained by the German mathematician Gottfried Wilhelm Leibniz: where (2) = Ch = (uv) (n) = [ - Σ (2) ² k=0 n! k!(n − k)!. u(k) y(n-k) (a) Verify the general Leibniz's rule when n = 1,2,3. (b) Find f(1510)(x) if f(x) = (x² + x) sin(2x)

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2. Let u,v be functions of x. The first order derivative of uv can be derived by the following product rule: (uv)⁰ = uºv + uvº. The general n-th order derivative of uv, called the general Leibniz rule, was obtained by the German mathematician Gottfried Wilhelm Leibniz: where (2) CK n (uv) (re)(n) = (17.) () k=0 n! k!(n − k)!. u(k) y(n-k) (a) Verify the general Leibniz's rule when n= 1,2,3. (b) Find f(1510)(x) if f(x) = (x² + x)sin(2x)