Find value of c(a point in a curve where slope of tangent to curve is zero) where f(x) = \(\begin{cases}x^2-x & 0<x<1\\3

Post by **answerhappygod** » Thu Jul 14, 2022 9:27 am

a) 1.5
b) Rolle’s Theorem is not applied, because function is not continuous in interval [0,2]
c) Rolle’s Theorem is not applied, because function is not differential in interval (0,2)
d) Function is both continuous and differentiable but Rolle’s theorem is not applicable as f(0) ≠ f(2)

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Find value of c(a point in a curve where slope of tangent to curve is zero) where f(x) = \(\begin{cases}x^2-x & 0<x<1\\3

Find value of c(a point in a curve where slope of tangent to curve is zero) where f(x) = \(\begin{cases}x^2-x & 0<x<1\\3

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This topic has 1 reply

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