Show there does not exist a sequence of polynomials converging uniformly on R to f if...

Show there does not exist a sequence of continuous functions fn : [0,1] → R converging...

Show there does not exist a sequence of continuous functions fn : [0,1] → R converging pointwise to the function f : [0,1] → R given by f(x) = 0 for x rational, f(x) = 1 for x irrational.

Suppose that pn is a sequence of polynomials converging uniformly to f on [0,1] and f...

Suppose that pn is a sequence of polynomials converging uniformly to f on [0,1] and f is not a polynomial. Prove that the degrees of the pn are not bounded. Hint: An Nth-degree polynomial p is uniquely determined by its values at N + 1 points via Lagrange's interpolation formula.

In the ring R[x] of polynomials with real coefficients, show that A = {f 2 R[x]...

In the ring R[x] of polynomials with real coefficients, show that A = {f 2 R[x] : f(0) = f(1) = 0} is an ideal.

Show that f: R -> R, f(x) = x^2 + 2x is not uniformly continuous on...

Show that f: R -> R, f(x) = x^2 + 2x is not uniformly continuous on R.

Let f(x) g(x) and h(x) be polynomials in R[x]. Show if gcd(f(x), g(x)) = 1 and...

Let f(x) g(x) and h(x) be polynomials in R[x]. Show if gcd(f(x), g(x)) = 1 and gcd(f(x), h(x)) = 1, then gcd(f(x), g(x)h(x)) = 1.

Does there exist a continuous onto function f : [0, 1] → R? Does there exist...

Does there exist a continuous onto function f : [0, 1] → R? Does there exist a continuous onto function f : (0, 1) → (−1, 0) ∪ (0, 1)?

show that f: R^2->R^2 be f(x,y)= (cosx + cosy, sinx + siny). show that f is...

show that f: R^2->R^2 be f(x,y)= (cosx + cosy, sinx + siny). show that f is locally invertible near all points (a,b)such that a-bis not = kpi where k in z and all other points have no local inverse exists  

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show...

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show that this is a ring under ordinary addition and multiplication of polynomials. What are the units of R[x] ? I need a legible, detailed explaination

Let f: R --> R be a differentiable function such that f' is bounded. Show that...

Let f: R --> R be a differentiable function such that f' is bounded. Show that f is uniformly continuous.

Let f: (0,1) -> R be uniformly continuous and let Xn be in (0,1) be such...

Let f: (0,1) -> R be uniformly continuous and let Xn be in (0,1) be such that Xn-> 1 as n -> infinity. Prove that the sequence f(Xn) converges