Let F be continuous, show that f([a,b]) is a closed interval.

Let f be a monotonic increasing function on a closed interval [a, b]. Show that f...

Let f be a monotonic increasing function on a closed interval [a, b]. Show that f is Riemann integrable on [a, b].

Let f be continuous on a closed interval. then f assumes its minimum and maximum values....

Let f be continuous on a closed interval. then f assumes its minimum and maximum values. Hint Construct a squence(xn) for which (f(xn) converges to the supremum M of f, apply the Bolzano-Weierstrass theorem to get a convergent subsequence of (xn), and invoke the continuity of f at the limit of that convergent subsequence. (Extreme Value Theorem)

Let f: [a,b] to R be continuous and strictly increasing on (a,b). Show that f is...

Let f: [a,b] to R be continuous and strictly increasing on (a,b). Show that f is strictly increasing on [a,b].

2. Suppose [a, b] is a closed bounded interval. If f : [a, b] → R...

2. Suppose [a, b] is a closed bounded interval. If f : [a, b] → R is a continuous function, then prove f has an absolute minimum on [a, b].

Let f be a continuous from a topological space X to the reals. Let a be...

Let f be a continuous from a topological space X to the reals. Let a be in the reals and let A = {x in X : f(x)=a} Show that A is closed inX.

If X is a continuous random variable with pdf f(x) on the interval [a,b] then show...

If X is a continuous random variable with pdf f(x) on the interval [a,b] then show that a<E(X)<b.

Let f and g be continuous functions on the reals and let S={x in R |...

Let f and g be continuous functions on the reals and let S={x in R | f(x)>=g(x)} . Show that S is a closed set.

Let f, g : [a, b] ---> R continuous such that (f(a) - g(a)) (f(b) -...

Let f, g : [a, b] ---> R continuous such that (f(a) - g(a)) (f(b) - g(b)) < 0. b) Show that inf {|f(x) - g(x)| : x ϵ [a,b]} = 0 and is achieved (is a minimum).

Let f, g : [a, b] ---> R continuous such that (f(a) - g(a)) (f(b) -...

Let f, g : [a, b] ---> R continuous such that (f(a) - g(a)) (f(b) - g(b)) < 0. a) Show that sup{|f(x) - g(x)| : x ϵ [a, b]} is strictly positive and achieved (is a maximum).

If R is the ring of all real valued continuous functions defined on the closed interval...

If R is the ring of all real valued continuous functions defined on the closed interval [0,1] and if M = { f(x) belongs to R : f(1/3) = 0}. Show that M is a maximal ideal of R