2. cuts the curve at Q, such that Let ƒ be a continuous and differentiable Tunction in (x,, x.). If ƒ(x).ƒ'(x)≥ x√1-(ƒ(x))*__and (f(x))² = 1 and then minimum value of x-x is λ then equals to lim X-X1 lim X->x₂ (f(x))² = 119 2 2 I 1.33
2. cuts the curve at Q, such that Let ƒ be a continuous and differentiable Tunction in (x,, x.). If ƒ(x).ƒ'(x)≥ x√1-(ƒ(x))*__and (f(x))² = 1 and then minimum value of x-x is λ then equals to lim X-X1 lim X->x₂ (f(x))² = 119 2 2 I 1.33
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter9: Systems Of Equations And Inequalities
Section: Chapter Questions
Problem 12T
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