Let f: [a, b] → [a,b] be a continuous function, where a, b are real numbers with a < b. Show that f has a fixed point (i.e., there exists x e [a, b] such that f(x) = x).
Exercise 1. Let f : R R be differentiable on la, b, where a, b R and a < b, and let f be continuous on [a, b]. Show that for every e> 0 there exists a 6 > 0 such that the inequality f(x)- f(c) T-C holds for all c, x E [a, 히 satisfying 0 < |c-x| < δ
Let f : [a, b] → R and xo e (a,b). Assume that f is continuous on [a,b] \{x0} and lim x approaches too x0 f(x) = L (L is finite) exists. Show that f is Riemann integrable. 1. (20 pts) Let f : [a, b] R and to € (a,b). Assume that f is continuous on [a, b]\{ro} and limz-ro f (x) = L (L is finite) exists. Show that f is Riemann integrable. Hint: We split it into...
(7) Let R= {f [0,1] - R | f continuous} be the ring of all continuous functions from the interval [0,1] to the real numbers. (a) For cE [0, 1, prove that Me := {feR | f(c) = 0} is a maximal ideal of R. Hint: consider the evaluation map ec- (b) Show that if M is any maximal ideal of R then there exists a cE [0,1 such that M = Me. Hint: show that any maximal ideal M...
2. Let f R R and g R-R be functions that are continuous on1,1 and differentiable on (1,1). Suppose that f(-1-f(1) and 9(-1). Show that there exists c e (1,1) such that 2. Let f R R and g R-R be functions that are continuous on1,1 and differentiable on (1,1). Suppose that f(-1-f(1) and 9(-1). Show that there exists c e (1,1) such that
1. (20 pts) Let f : [a, b R and ro € a, b. Assume that f is continuous on lim (r) L (L is finite) exists. Show that f is Riemann integrable a, b\{ro} and
1. (20 pts) Let f : [a, b] R and xo € (a,b). Assume that f is continuous on [a, b] \ {xo} and lim, L (L is finite) exists. Show that f is Riemann integrable. 2x=20 f (x)
3. Let f: R+R be a function. (a) Assume that f is Riemann integrable on [a, b] by some a < b in R. Does there always exist a differentiable function F:RR such that F' = f? Provide either a counterexample or a proof. (b) Assume that f is differentiable, f'(x) > 1 for every x ER, f(0) = 0. Show that f(x) > x for every x > 0. (c) Assume that f(x) = 2:13 + x. Show that...
Let f : [a, b] → R and g : [a, b] → R be two continuous functions such that f(x) > g(x) for all x € (a,b]. 1. Show that there exists d > 0 such that f(x) > g(x) + 8 for all x € [a, b]. (Hint: introduce h := f -9] 2. Assume that g(x) > 0 for all x € [a, b]. Show that there exists k >1 such that f(x) > kg(x) for all...
Let f [a, b [a, b] such Exercise 28: R be continuous. Show that there exists x E : that 1 f(x)= f. 6-a Hint: Intermediate value theorem Let f [a, b [a, b] such Exercise 28: R be continuous. Show that there exists x E : that 1 f(x)= f. 6-a Hint: Intermediate value theorem