作业帮设f(x)在上连续,在[0,π]内可导,证明至少存在一点x属于(0,π),使f'(x)=-f(x)cotx
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![设f(x)在上连续,在[0,π]内可导,证明至少存在一点x属于(0,π),使f'(x)=-f(x)cotx](/uploads/image/z/6974049-57-9.jpg?t=%E8%AE%BEf%28x%29%E5%9C%A8%E4%B8%8A%E8%BF%9E%E7%BB%AD%2C%E5%9C%A8%5B0%2C%CF%80%5D%E5%86%85%E5%8F%AF%E5%AF%BC%2C%E8%AF%81%E6%98%8E%E8%87%B3%E5%B0%91%E5%AD%98%E5%9C%A8%E4%B8%80%E7%82%B9x%E5%B1%9E%E4%BA%8E%280%2C%CF%80%29%2C%E4%BD%BFf%27%28x%29%3D-f%28x%29cotx)
设f(x)在上连续,在[0,π]内可导,证明至少存在一点x属于(0,π),使f'(x)=-f(x)cotx
设f(x)在上连续,在[0,π]内可导,证明至少存在一点x属于(0,π),使f'(x)=-f(x)cotx
设f(x)在上连续,在[0,π]内可导,证明至少存在一点x属于(0,π),使f'(x)=-f(x)cotx
设g(x) = f(x)sin(x).
则g(x)在[0,π]连续, 在(0,π)可导, 且g(0) = 0 = g(π).
由Rolle定理, 存在ξ ∈ (0,π)使g'(ξ) = 0.
即有f'(ξ)sin(ξ)+f(ξ)cos(ξ) = 0.
又ξ ∈ (0,π), 故sin(ξ) ≠ 0, 有f'(ξ) = -f(ξ)cot(ξ).
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