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प्रश्न
Verify Lagrange’s mean value theorem for the following function:
f(x) = log x on [1, e]
उत्तर
The function f given as f(x) = log x is a logarithmic function which is continuous for all positive real numbers.
Hence, it is continuous on [1, e] and differentiable on (1, e).
Thus, the function f satisfies the conditions of Lagrange’s mean value theorem.
∴ There exists c ∈ (1, e) such that
f'(c) = `(f(e) - f(1))/(e - 1)` ...(1)
Now, f(x) = log x
∴ f(1) = log 1 = 0 and f(e) = log e = 1
Also, f'(x) = `d/dx(logx) = 1/x`
∴ f'(c) = `(1)/c`
∴ From (1), `1/c = (1 - 0)/(e - 1) = (1)/(e - 1)`
∴ c = e – 1 ∈ (1, e)
Hence, Lagrange's mean value theorem is verified.
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