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

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

Use the ε-δ-definition of continuity to show that if f, g : D → R are continuous then h(x) := f(x)g(x) is continuous in D.

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.

1.Using only the definition of uniform continuity of a function, show that f(z) = z^2 is...

1.Using only the definition of uniform continuity of a function, show that f(z) = z^2 is uniformly continuous on the disk {z : |z| < 2}. 2. Describe the image of the circle |z-3| = 1 under the mapping w = f(z) = 5-2z. Be sure to show that your description is correct. Please show full explaination.

hi guys , using this definition for limits in higher dimensions : lim (x,y)→(a,b) f(x, y)...

hi guys , using this definition for limits in higher dimensions : lim (x,y)→(a,b) f(x, y) = L if 1. ∃r > 0 s.th. f(x, y) is defined when 0 < || (x, y) − (a, b) || < r and 2. given ε > 0 we can find δ > 0 s.th. 0 < || (x, y) − (a, b) || < δ =⇒ | f(x, y) − L | < ε how do i show that this is...

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.)

Using the derivative definition, point the derivative value for the given function f(z)=3/z^2 Find in Z0=1+i...

Using the derivative definition, point the derivative value for the given function f(z)=3/z^2 Find in Z0=1+i and write x+iy algebraically.

Assume linear model y=Xβ+ε Assume cov(ε)=σ2I (I is the identity matrix) Show that cov(β-hat) = σ2(XTX)-1...

Assume linear model y=Xβ+ε Assume cov(ε)=σ2I (I is the identity matrix) Show that cov(β-hat) = σ2(XTX)-1 and discuss its meaning

3. Use the definition of a limit (Definition 3.1.1) to show the following: (a) limx→2 (x...

3. Use the definition of a limit (Definition 3.1.1) to show the following: (a) limx→2 (x 2 + 2x − 5) = 3 (b) limx→1 (x 3 + 2x + 1) = 4 (c) limx→0 (x 3 sin(e x 2 )) = 0

Based on the definition of the linear regression model in its matrix form, i.e., y=Xβ+ε, the...

Based on the definition of the linear regression model in its matrix form, i.e., y=Xβ+ε, the assumption that ε~N(0,σ2I), the general formula for the point estimators for the parameters of the model (b=XTX-1XTy), and the definition of varb=Eb-Ebb-EbT Show that varb=σ2XTX-1 Note: the derivations in here need to be done in matrix form. Simple algebraic method will not be allowed.