Problem 4. Suppose that Γ is a curve (x, f(x)) in R2 , where f :...

1. Let f : R2 → R2, f(x,y) = ?g(x,y),h(x,y)? where g,h : R2 → R....

1. Let f : R2 → R2, f(x,y) = ?g(x,y),h(x,y)? where g,h : R2 → R. Show that f is continuous at p0 ⇐⇒ both g,h are continuous at p0

Let the function f on R2 be f(x,y) = x3−3αxy+y3,∀(x,y) ∈R2, where α ∈R is a...

Let the function f on R2 be f(x,y) = x3−3αxy+y3,∀(x,y) ∈R2, where α ∈R is a parameter. Show that f has no global minimizer or global maximizer for any α.

Prove that the function f : R \ {−1} → R defined by f(x) = (1−x)...

Prove that the function f : R \ {−1} → R defined by f(x) = (1−x) /(1+x) is uniformly continuous on (0, ∞) but not uniformly continuous on (−1, 1).

Let f be a continuous function. Suppose theres a sequence (x_n) in [0,1] where lim f(x_n))=5....

Let f be a continuous function. Suppose theres a sequence (x_n) in [0,1] where lim f(x_n))=5. Prove there is a point x in [0,1] where f(x)=5.

Given the probability density function f(x)=(0.064^(4)*x^(3)*e^(−0.06x))/(Γ(4)), determine the mean and variance of the distribution. Round the...

Given the probability density function f(x)=(0.064^(4)*x^(3)*e^(−0.06x))/(Γ(4)), determine the mean and variance of the distribution. Round the answers to the nearest integer. the pdf is 0 for x < 0 Mean= Valence =

True or False? No reasons needed. (e) Suppose β and γ are bases of F n...

True or False? No reasons needed. (e) Suppose β and γ are bases of F n and F m, respectively. Every m × n matrix A is equal to [T] γ β for some linear transformation T: F n → F m. (f) Recall that P(R) is the vector space of all polynomials with coefficients in R. If a linear transformation T: P(R) → P(R) is one-to-one, then T is also onto. (g) The vector spaces R 5 and P4(R)...

let F : R to R be a continuous function a) prove that the set {x...

let F : R to R be a continuous function a) prove that the set {x in R:, f(x)>4} is open b) prove the set {f(x), 1<x<=5} is connected c) give an example of a function F that {x in r, f(x)>4} is disconnected

Suppose that f : R → R such that, the lim h→0 [f(x) − f(x −...

Suppose that f : R → R such that, the lim h→0 [f(x) − f(x − h)] = 0 for all x ∈ R, then is f continuous in this case?

Im stuck on this problem thank you! Suppose F is an exponential function where f(-1) =...

Im stuck on this problem thank you! Suppose F is an exponential function where f(-1) = 5 and f(1) = 3.2 1. What is the 2-unit growth factor for F? 2. What is the 1-unit growth factor for F? 3. What is the initial value of f? f(0) = 4. write a function formula for f. f(x) =

Let X∼Γ(a1,b) be independent of Y, and suppose W=X+Y∼Γ(a2,b), where a2> a1. ShowY∼Γ(a2−a1,b)

Let X∼Γ(a1,b) be independent of Y, and suppose W=X+Y∼Γ(a2,b), where a2> a1. ShowY∼Γ(a2−a1,b)