show that the set of all similarities Sim(R^2) is a groip with respect to compositons.

Consider R^2 and for all y in R^2, show that R^2 - {y} is connected

Consider R^2 and for all y in R^2, show that R^2 - {y} is connected

Prove that the set R = {0,1,2,3,4,5} is a commutative ring with respect to the operations...

Prove that the set R = {0,1,2,3,4,5} is a commutative ring with respect to the operations of addition modulo 6 and multiplication modulo 6.

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show...

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show that this is a ring under ordinary addition and multiplication of polynomials. What are the units of R[x] ? I need a legible, detailed explaination

Show that the set of all functions from the positive integers to the set {1, 2,...

Show that the set of all functions from the positive integers to the set {1, 2, 3} is uncountable.

Let R be a ring. Show that the set Aut(R) = {φ : R → R|φ...

Let R be a ring. Show that the set Aut(R) = {φ : R → R|φ is a ring isomorphism} is a group with composition.

Let A be an mxn matrix. Show that the set of all solutions to the homogeneous...

Let A be an mxn matrix. Show that the set of all solutions to the homogeneous equation Ax=0 is a subspace of R^n and the set of all vectors b such that Ax=b is consistent is a subspace of R^m. Is the set of solutions to a non-homogeneous equation Ax=b a subspace of R^n? Explain why or why not.

Show that the set GLm,n(R) of all mxn matrices with the usual matrix addition and scalar...

Show that the set GLm,n(R) of all mxn matrices with the usual matrix addition and scalar multiplication is a finite dimensional vector space with dim GLm,n(R) = mn. Show that if V and W be finite dimensional vector spaces with dim V = m and dim W = n, B a basis for V and C a basis for W then hom(V,W)-----MatB--->C(-)--------> GLm,n(R) is a bijective linear transformation. Hence or otherwise, obtain dim hom(V,W). Thank you!

If a, b ∈ R with a not equal to 0, show that the infinite set...

If a, b ∈ R with a not equal to 0, show that the infinite set {1,(ax + b),(ax + b)2 ,(ax + b)3 , · · · } of polynomials is a basis for F[x].

On January 2, 2012, Pal acquired 75% of the outstanding stock of Sim Company for $2,100,000...

On January 2, 2012, Pal acquired 75% of the outstanding stock of Sim Company for $2,100,000 cash. On that date Sim’s stockholders equity included common stock of $1,000,000 and retained earnings of $1,560,000.   As part of the merger agreement, Sim’s former management team signed a contract not to compete with Pal for the next 8-years. The difference between the cost and book value of Sim’s net assets was assigned to these noncompetition agreements. On January 2, 2014, Pal Corporation purchased...

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)