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6.9 Calculus of the Hyperbolic Functions - Calculus Volume 1
WebbLet X be a set, and define d(x,y) ={0, if x=y; 1, otherwise (a) Show that the function d defines a metric on X. (b) A sequence (xn) ⊆ X is called eventually constant if there is N ∈ N such that xm=xn; m, n > N. Show that any eventually constant sequence converges. WebbAnswer to Solved Show that d/dx 4 square root 1 + tanh(x)/1-tanh(x) = WebbAnswer: For the equation (D^2 - 1)y = sinh(x) the characteristic polynomium is m^2 - 1 =0 . Roots 1 , - 1.The solution to the homogeneous part of the equation is yh = C1e^x + C2e^ … cronovit bc kids