Either f a continuous and strictly positive function over an interval [a,b]
Show that : (We have at least α>0);(for any x from [a,b]) f(x)=>α
Either g and h a continuous functions over [a,b]
Such that:
(for any x from [a,b]) g(x)>h(x)
Show that:
(We have at least ω>0);(for any x from [a,b]) g(x)=>h(x)+ω
Show that : (We have at least α>0);(for any x from [a,b]) f(x)=>α
Either g and h a continuous functions over [a,b]
Such that:
(for any x from [a,b]) g(x)>h(x)
Show that:
(We have at least ω>0);(for any x from [a,b]) g(x)=>h(x)+ω