A function f : R^2 ↦R is called a metric if f(x, y) >= 0 for
all x, y that are an element of R,
f(x,y) = 0 if and only if x = y, and for any x, y, z we have f(x,
z) <=
f(x,y) + f(y, z). Is the function f(x, y) =
the square root of
|x - y| a metric or not?
Foundations of Analysis Let X = {A, B,C,D}. ·Describe a function δ : X × X-> R that is a metric on X. . Describe a function δ : X x X-R that satisfies δ(z,x)-0 and δ(x,y)-δ(y,x) for all z, y E X but that is NOT a metric Let X = {A, B,C,D}. ·Describe a function δ : X × X-> R that is a metric on X. . Describe a function δ : X x X-R that satisfies...
2 Functions a. A function f : A-B is called injective or one-to-one if whenever f(x)-f(y) for some x, y E A then x = y. That is Vz, y A f(x) = f(y) → x = y. Which of the following functions are injective? In each case explain why or why not i. f:Z-Z given by f() 3r +7 (1 mark ii. f which maps a QUT student number to the last name of the student with that student...
2. (a) We want to find the root x of the function f(x); that is, we need f(r) = 0 . This can be done using Newton's method, making use of the iterative formula f(xn) Show that the sequence ofiterates (%) converges quadratically if f'(x) 0 in some appropriate interval of x-values near the root χ 9 point b) We can get Newton's method to find the k-th root of some number a by making it solve the non-linear cquation...
1. Let g : R30,0,0)-R be given by g(x, y, z) 2. 3 (a) Compute Vg(x, y, z) (b) Show that V2g V (Vg) for all (x, y, 2) (c) Verify by direct calculation that (0,0,0) for any sphere S centered at the origin. d) Why do (b) and (c) not contradict the divergence theorem? 2. Let f be C2 on R3 and satisfy Laplace's equation ▽2f-0. Such functions are called harmonic. (a) Applying Green's formulas to f and g...
Consider the set of integers Z with the metric da.y)-2supm e Nu (o): 2" divides (r-y) (a) Describe the open balls of radius 1 around the centres 0 and 1 (b) Let f : Z -R be defined as f()0 if is even and (x)1 f r is odd. Is f a continuous function from (Z, d) to R equipped with the standard metric? Himt: Use the criterion of continuity in terms of open sets
Question 1. Give an example of a complete metric space (X, d) and a function f :X + X such that d(f(x), f(y)) < d(x, y) for all x, y E X with x + y and yet f does not have a fixed point. a map f:X + X has a fixed point if there is an element a E X such that f(a) = a.
a. A function f: A B is called injective or one-to-one if whenever f (x) f(u) for some z, y A then y. Which of the following functions are injective? In r-y. That is Vr,y E A f()-f(u) each case explain why or why not i. f:Z Z given by f(z) 3 7 ii. f which maps a QUT student number to the last name of the student with that student number. b. Suppose that we have some finite set...
0/1 point (graded X, Y have the joint probability density function f (z,y)-1 , 0 < z < 1, z < y < z + 1 . Please enter a number. Cov (X,Y) SubmitYou have used 2 of 3 attempts Save Incorrect (O/1 point) 1 point possible (graded) x ~ f(z) 2be-HA, z є R, b > 0 and Y-sign (X) Cov (X, Y)- SubmitYou have used 0 of 3 attempts Save We were unable to transcribe this image 0/1...
14. If y =f(z) is a continuous function in a neighborhood around f'(c) = 0, does there have to be a local extrema on the graph of u = f(x) at x = c. 15. If/"(z) =-4(-7)2(z + 1) and the domain of f(x) is all real numbers, determine where f(x) is concave up, concave down and find any r-values of inflection points. 14. If y =f(z) is a continuous function in a neighborhood around f'(c) = 0, does there...
We used definition of homeomorphic as follows. If X and Y are topological spaces, a function f: X to Y is called homeomorphism if 1. f is continuous 2. f is bijective 3. inverse of f is continuous And in this case, we say that X is homeomorphic with Y. Thank you ! infinite) (5) Prove that all semiopen intervals in R (finite or homeomorphic are infinite) (5) Prove that all semiopen intervals in R (finite or homeomorphic are