Prove that the open rectangle in R2     S = { (x,y) | 2 < x<5 -8...

Let d be the usual metric on R2. (a) Find d(x,y) when x = (3,−2) and...

Let d be the usual metric on R2. (a) Find d(x,y) when x = (3,−2) and y = (−3,1). (b) Let x = (5,−1) and y = (−3,−5). Find a point z in R2 such that d(x,y) = d(y,z) = d(x,z). (c) Sketch Br(a) when a = (0,0) and r = 1. The Euclidean metric is by no means the only metric on Rn which is useful. Two more examples follow (9.2.10 and 9.2.12).

topology: Prove that the open ball B2: = {(x, y) ∈ R2 | x2 + y2...

topology: Prove that the open ball B2: = {(x, y) ∈ R2 | x2 + y2 <1} in R2 is homeomorphic to the open squared unit C2: = {(x, y) ∈R2 | 0 <x <1.0 <and <1}

1. Consider the set U={(x,y) in R2| -1<x<1 and y=0}. Is U open in R2? Is...

1. Consider the set U={(x,y) in R2| -1<x<1 and y=0}. Is U open in R2? Is it open in R1? Is it open as a subspace of the disk D={(x,y) in R2 | x^2+y^2<1} ? 2. Is there any subset of the plane in which a single point set is open in the subspace topology?

Let S be the set of all real circles, defined by (x-a)^2 + (y-b)^2=r^2. Define d(C1,C2)...

Let S be the set of all real circles, defined by (x-a)^2 + (y-b)^2=r^2. Define d(C1,C2) = √((a1 − a2)^2 + (b1 − b2)^2 + (r1 − r2)^2 so that S is a metric space. Prove that metric space S is NOT a complete metric space. Give a clear example. Describe points of C\S as limits of the appropriate sequences of circles, where C is the completion of S.

Exercise 9.1.11 Consider the set of all vectors in R2,(x, y) such that x + y...

Exercise 9.1.11 Consider the set of all vectors in R2,(x, y) such that x + y ≥ 0. Let the vector space operations be the usual ones. Is this a vector space? Is it a subspace of R2? Exercise 9.1.12 Consider the vectors in R2,(x, y) such that xy = 0. Is this a subspace of R2? Is it a vector space? The addition and scalar multiplication are the usual operations.

The side x of a rectangle is increasing at a rate of 2 cm/s while its...

The side x of a rectangle is increasing at a rate of 2 cm/s while its side y is decreasing at a rate of 1 cm/s. (a) Find how fast the perimeter P of the rectangle is changing when x = 4 cm and y = 3 cm. (b) Find how fast the area A of the rectangle is changing when x = 4 cm and y = 3 cm. (c) Find how fast the length l of diagonal of...

Let S be the surface z = m + x^2 + y^2 above the rectangle [0,...

Let S be the surface z = m + x^2 + y^2 above the rectangle [0, 3] x [0, 4]. Compute the flux of the vector field F(x, y, z) = 4 x i + 2 y j + 4 z k across S. Your answer should be an exact expression. Please help me I need this ASAP

How do I show that a set inequality in R2 containing both x and y is...

How do I show that a set inequality in R2 containing both x and y is open? Ex: 3 < x^2 + y^2 < 9

Prove that the Gromov-Hausdorff distance between subsets X and Y of some metric space Z is...

Prove that the Gromov-Hausdorff distance between subsets X and Y of some metric space Z is 0 if and only if X = Y question related to Topological data analysis 2

Region 2: Draw the region bounded by y=sqrt(x-2) and x-4y=2 . Draw a representative rectangle and...

Region 2: Draw the region bounded by y=sqrt(x-2) and x-4y=2 . Draw a representative rectangle and label its base. Find the coordinates of and label all intersection points. Then, find formulas for the height of the rectangle .Also, set up an integral used to find the area of the region. Evaluate the integral.