Question: Does the Mean Value Theorem apply to f(x) = xsquared + 2x - 5, between [1, 5]? Responses f(x) is differentiable everywhere in the interval

Does the Mean Value Theorem apply to f(x) = xsquared + 2x - 5, between [1, 5]? Responses f(x) is differentiable everywhere in the interval between [1, 5] so the MVT does apply. f(x) is differentiable everywhere in the interval between [1, 5] so the MVT does apply. f(x) is neither differentiable nor continuous everywhere in the interval between [1, 5] so the MVT does not apply. f(x) is neither differentiable nor continuous everywhere in the interval between [1, 5] so the MVT does not apply. f(x) is continuous between [1, 5] so MVT applies. f(x) is continuous between [1, 5] so MVT applies. f(x) is not differentiable everywhere between [1, 5] so MVT does not apply. f(x) is not differentiable everywhere between [1, 5] so MVT does not apply

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