Use the ε-δ-definition of continuity to show that if f, g : D → R are...

1a. Using the e − δ definition of continuity, show that the absolute value function f(x)...

1a. Using the e − δ definition of continuity, show that the absolute value function f(x) = |x| is continuous at every point a. 1b. Use the e−δ defintion of continuity to prove that any linear function f(x) = mx+b (with m, b constants) is continuous at every point a. (You should be able to find a formula for δ in terms of e, and the slope m.)

Apply ε − δ definition to show that f (x) = 1/x^2 is continuous in (0,  ∞).

Apply ε − δ definition to show that f (x) = 1/x^2 is continuous in (0,  ∞).

Use ε − δ definition to prove that the function f (x) = 2x/3x^2 - 2...

Use ε − δ definition to prove that the function f (x) = 2x/3x^2 - 2 is continuous at the point p = 1.

Let D ⊆ R, a ∈ D, let f, g : D −→ R be continuous...

Let D ⊆ R, a ∈ D, let f, g : D −→ R be continuous functions. If limx→a f(x) = f(a) and limx→a g(x) = g(a) with f(a) < g(a), then there exists δ > 0 such that x ∈ D, 0 < |x − a| < δ =⇒ f(x) < g(x).

Use the ε − δ definition to show that limz→1 z+1/z−i = 2/1−i .

Use the ε − δ definition to show that limz→1 z+1/z−i = 2/1−i .

show that any polynomial is continuous on R using the epsilon-delta definition of continuity (not the...

show that any polynomial is continuous on R using the epsilon-delta definition of continuity (not the limit definition)

Part I) Prove that if f and g are continuous at a, then f+g is continuous...

Part I) Prove that if f and g are continuous at a, then f+g is continuous at a using the epsilon-δ definition. Part II) Let a, L ∈ R. Prove that if a ≥ L− ε for all positive, then a ≥ L.

Using only definition 4.3.1 (continuity), prove that f(x)=x2+3x+4 is continuous on R.

Using only definition 4.3.1 (continuity), prove that f(x)=x2+3x+4 is continuous on R.

Show (-1,1)~R (where R= set of real numbers) by f(x)= x/(1-|x|) Use this to show g(x)=x/(d-|x|)...

Show (-1,1)~R (where R= set of real numbers) by f(x)= x/(1-|x|) Use this to show g(x)=x/(d-|x|) is also a bijection (i.e. g: (-d,d)->R) Finally consider h(x)= x + (a+b)/2 and show it is a bijection where h: (-d,d)->(a,b) Conclude: R~(a,b)

Let f : R → R be a function satisfying |f(x) − f(y)| ≤ 3|x −...

Let f : R → R be a function satisfying |f(x) − f(y)| ≤ 3|x − y|^{1/2} for all x, y ∈ R. Apply E − δ definition to show that f is uniformly continuous in R.