What is Transformation: Definition and 1000 Discussions

In linear algebra, linear transformations can be represented by matrices. If



T


{\displaystyle T}
is a linear transformation mapping





R


n




{\displaystyle \mathbb {R} ^{n}}
to





R


m




{\displaystyle \mathbb {R} ^{m}}
and




x



{\displaystyle \mathbf {x} }
is a column vector with



n


{\displaystyle n}
entries, then




T
(

x

)
=
A

x



{\displaystyle T(\mathbf {x} )=A\mathbf {x} }
for some



m
×
n


{\displaystyle m\times n}
matrix



A


{\displaystyle A}
, called the transformation matrix of



T


{\displaystyle T}
. Note that



A


{\displaystyle A}
has



m


{\displaystyle m}
rows and



n


{\displaystyle n}
columns, whereas the transformation



T


{\displaystyle T}
is from





R


n




{\displaystyle \mathbb {R} ^{n}}
to





R


m




{\displaystyle \mathbb {R} ^{m}}
. There are alternative expressions of transformation matrices involving row vectors that are preferred by some authors.

View More On Wikipedia.org
Recent contents Top users
  1. J

    Transformation Y-Δ with matrix?

    See: http://en.wikipedia.org/wiki/Y-%CE%94_transform#Basic_Y-.CE.94_transformation Is possible to express the following relationships: using matrix?
  2. Q

    MHB Commutativity in the linear transformation space of a 2 dimensional Vector Space

    A variant of a problem from Halmos : If AB=C and BA=D then explain why (C-D)^2 is commutative with all 2x2 matrices if A and B are 2x2 matrices. This result does not hold for any other nxn matrices where n > 2. Explain why. Edit: I tried to show that ((C-D)^2) E - E((C-D)^2) is identically...
  3. S

    Some examples of Möbius transformation

    Homework Statement Find Möbius transformation that maps: a) circle ##|z+i|=1## into line ##Im(z)=2## b) circle ##|z-i|=1## into line ##Im(z)=Re(z)## c) line ##Re(z)=1## into circle ##|z|=2##Homework Equations ##f(z)=\frac{az+b}{cz+d}##The Attempt at a Solution a) Firstly to move the circle...
  4. J

    Transformation behavior of the gradient

    Hi All, I think I have confused myself ... perhaps you can tell me where my reasoning is wrong. The idea is that in general coordinates the partial derivative of a vector, \frac{\partial A^i}{\partial x^j}, is not a tensor because an additional term arises (which is the motivation for...
  5. M

    Unitary transformation of pure states to other pure states

    Is it true that there always exist a unitary matrix that can take a state vector of an arbitrary pure state to another arbitrary pure state ? (of course assuming same hilbert space). If true, how do we prove it ? it look like it is true via geometrical arguments but i have not been able to...
  6. N

    Linear transformation and change of basis

    Homework Statement Let B = {(1, -2),(2, -3)} and S be the standard basis of R2 and [-8,-4;9,4] be a linear transformation expressed in terms of the standard basis? The Attempt at a Solution 1) What is the change of basis matrix PSB ? 1,2 -2,-3 2)What is the change of...
  7. J

    Geometrical interpretation of this coordinate transformation

    How can I geometrically interpret this coordinate transformation (from x,y space to \check{x},\check{y} space)? x = \check{x}cos(β) - \check{y}sin(β) y = \frac{1}{2}(\check{x}2 -\check{y}2)sin(2β) -\check{x}\check{y}cos (2β)
  8. S

    Help with linear transformation problem with variables

    Let L: R3 -> R3 be L(x)= \begin{pmatrix} x1+x2\\ x1-x2\\ 3x1+2x2 \end{pmatrix} find a matrix A such that L(x)=Ax for all x in R2 From what I understand I need to find the transition matrix from the elementary to L(x). However it is'nt a square matrix and it has variables instead of numbers...
  9. S

    Find power series if you know its laplace transformation

    Homework Statement a) Determine power series ##\sum _{n=0}^{\infty }a_nt^n## if you know that its laplace transformation is ##-s^{-1}e^{-s^{-1}}## b) Determine function ##g## that this power series will be equal to ##J_0(g(t))##Homework Equations The Attempt at a Solution Hmmm, I am having...
  10. S

    Laplace transformation: system of DE

    Homework Statement Let ##y_1^{'}+y_1=y_2##, ##y_2^{'}+5y_2=y_3##, ##y_3^{'}+y_3=f## and ##y_1(0)=y_2(0)=y_3(0)=0##. Find ##Y_1(s)## in terms of ##F(s)##. Homework Equations The Attempt at a Solution I am completely lost here. I tried to rewrite the system so that I would...
  11. S

    Laplace Transform for Functions: 5cos(7t+π/4) and e^(3t)sintcost

    Homework Statement Find Laplace transformation for functions ##f(t)##: a) ##5cos(7t+\pi /4)## b) ##e^{3t}sintcost##Homework Equations The Attempt at a Solution a) I know that for ##cos(\omega t)## the laplace is ##\frac{s}{s^2+\omega ^2}## but what can I do with that ##\pi /4## ? I believe I...
  12. P

    Transformation of acceleration between two reference frames

    hello i want to derive the Transformation of acceleration between two reference frames i searched in internet and found a book but i don't understand just one step i attach a picture so you can see what i found in the internet my problem is eq. (1.10) \begin{align}du=\frac{dU}{\gamma...
  13. P

    Wave equation and fourier transformation

    Homework Statement utt=a2uxx Initial conditions: 1)When t=0,u=H,1<x<2 and u=0,x\notin(1<x<2) 2)When t=0,ut=H,3<x<3 and u=0,x\notin(3<x<4) The Attempt at a Solution So I transformed the first initial condition \hat{u}=1/\sqrt{2*\pi} \int Exp[-i*\lambda*x)*H dx=...
  14. E

    Showing that a linear transformation from P3 to R4 is an isomorphism?

    I have a linear transformation, T, from P3 (polynomials of degree ≤ 3) to R4 (4-dimensional real number space). I have a second linear transformation, U, from R4 back to P3. In the first step of this four-step problem, I have shown that the composition TU from R4 to R4 is the identity linear...
  15. adjacent

    Matrix and transformation problem

    Let there be a triangle with coordinates A(2,2) , B(5,2) and C(5,4) I have learned two ways to shear an object(x-axis invariant) in the Cartesian coordinate system. The first way is to find the coordinate vector of a point and multiply the y-component of the vector by the shear factor(2)(Don't...
  16. A

    Galilean transformation problem (Speed)

    Homework Statement A girl is riding a bicycle along a straight road at constant speed, and passes a friend standing at a bus stop (event #1). At a time of 60 s later the friend catches a bus (event #2) If the distance separating the events is 126 m in the frame of the girl on the bicycle...
  17. K

    Given a transformation of the plane F(x,y) = (2x+y,x-2y), find F^-1.

    Homework Statement Given a transformation of the plane F(x,y) = (2x+y,x-2y), find F-1. Homework Equations Actually this exercise had an item (a) which I had to prove this is a transformation. So I proved this function is injective and surjective. I know F(x,y) = (u,v) IFF F-1(u,v) =...
  18. Feodalherren

    Jacobian transformation and 2D curl

    Umm what just happened? I understand as far as u=x+y and v = y/x and when he does the 2d curl. What I don't get is the step thereafter when he flips it. How does he know to flip it? Further, when he flips it wouldn't that make the dvdu inside the integral cancel and hence leave him with dxdy?
  19. Feodalherren

    Jacobian transformation, find new limits

    Homework Statement Homework Equations The Attempt at a Solution What I don't understand is how I'm supposed to find those limits for U and V. That's not at all what I'm getting. I've tried solving for the max and min x,y coordinates from the given graphs but that doesn't yield...
  20. C

    Lorentz Transformation of Velocity 4 Vector Help

    So i am working on a question, which is beyond my knowledge of Lorentz transformations and some help is greatly appreciated. I have a 4 velocity, u=γ(v vector,c) and its transformation properties are the standard lorentz boost. I don't quite understand how I am supposed to do this given that...
  21. M

    Simple question concerning unitary transformation

    Is the transformation of an operator under INFINITESIMAL unitary transformation, U^-1AU or UAU^-1?? I saw that two books defined it differently?
  22. N

    Linear transformation (minor clarification)

    Homework Statement The Attempt at a Solution I don't think I'm interpreting the question correctly. Maybe someone can point me in the right direction? There are 2 conditions: if y =/=0 then f(x,y) = x^2/y and if y=0 then f(x,y) = 0 Let u =(1,1) and v = (1,1) f(v) = f(1,1) =...
  23. N

    Simple Linear Transformation: Proving Linearity with (1,1) Vectors

    Homework Statement f(x,y) -> |x+y| The Attempt at a Solution The answer is that the above transformation is not linear but my working shows otherwise. Here's my go: let u = (1,1) and v = (1,1) f(u) = f(1,1) = 2 f(v) = f(1,1) = 2 f(u) + f(v) = 4 f(u+v) = f(2,2) = 4...
  24. N

    Rotation linear transformation

    Homework Statement Given below are three geometrically defined linear transformations from R3 to R3. You are asked to find the standard matrices of these linear transformations, and to find the images of some points or sets of points. a) T1 reflects through the yz-plane b) T2 projects...
  25. E

    MHB Constructing a matrix version of the transformation algorithm?

    Algorithms like the transformation algorithm: $(x, y)$ --> $(\frac{x}{k} + p, ay + d)$ are not generally used in mathematics. Instead, we use matrices. Multiplying matrixes: you multiply a row of the first matrix by a column of the second. Use the following example: $ \begin{bmatrix}x & y...
  26. N

    Answer check and explanation(Linear transformation)

    Homework Statement Find the standard matrix of the following linear transformation: T(x1, x2, x3, x4) = (-2 x1 - 5 x2 - 4 x3 - x4, 2 x1 + 2 x2 - 5 x3 + x4) The Attempt at a Solution [x1,x2,x3,x4] [-2,2;-5,2;-4,-5;-1,1] =[-2 x1 - 5 x2 - 4 x3 - x4, 2 x1 + 2 x2 - 5 x3 + x4]...
  27. W

    Basis of the range of a Linear Transformation

    Mod note: fixed an exponent (% --> 5) on the transformation definition. Homework Statement A is a (4x5)-matrix over R, and L_A:R^5 --> R^4 is a linear transformation defined by L_a(x)=Ax. Find the basis for the range of L_A. Homework Equations The Attempt at a Solution ##A =...
  28. H

    Constant Jacobian transformation of an inertial frame

    Suppose we do a constant Jacobian transformation (which is not Lorentz) of a SR (inertial) frame, by using four linear change of variables equations. This defines an apparent field with a constant metric (which is not the SR metric) in which there is relative acceleration of separation. From...
  29. C

    Light-cone coordinate and Lorentz transformation

    Assume that, in cartesian coordinate, we have a quark with momentum ##k=(k_0,0,k_0sin\theta,k_0\cos\theta)## and a fragmented hadron ##p=(p_0,0,0,p_0)##. Define, in light-cone coordinate, ##k^+ = k_0 + k_3 = k_0(1+cos\theta)##, and ##p^+ = p_0 + p_3 = 2p_0##. And the longitudinal momentum...
  30. C

    Determine condition on invariants under transformation

    Homework Statement Consider a ##j=1, SU(2)## representation (or fundamental ##S0(3)## representation). Suppose that ##a_i, b_i## and ##c_i## (i=1,2,3) are vectors transforming under this representation i.e ##a_i' = [\rho_1 (x)]_{ij} a_j = \rho_{ij} a_j## and similarly for b and c. Consider...
  31. J

    Image under a mobius transformation

    Homework Statement Find the Mobius transformation which carries the points 0,1,-i to the points -1,0,\infty respectively. Find the image of the domain \{z:x<0,-x+y<t\} under this mobius transformation.Homework Equations The Attempt at a Solution Let T(z)=\frac{az+b}{cz+d}. Then...
  32. N

    Determining linear transformation

    Homework Statement T4 : R3 -> R4 is defined by T4(x1, x2, x3) = (0, x1, -3 + |x1|, x1 + x2) The Attempt at a Solution I know that T4(γ1x1 + γ2x2 + γ3x3) is a linear transformation IFF γ1.T4(x1) + γ2.T4(x2) + γ3.T4(x3) T4(λ10 + λ2x1 + λ3(-3+|x1|) = λ1.T4(0) + λ2.T4(x1) +...
  33. P

    Image of a Linear Transformation

    T2 projects orthogonally onto the xz-plane T3 rotates clockwise through an angle of 3π/4 radians about the x axis The point (-3, -4, -3) is first mapped by T2 and then T3. what are the coordinates of the resulting point? this question is on a program call Calmaeth. My answer for this...
  34. F

    A question about v appearing in the transformation equations in SR

    v=? delta what/which X(distance) over delta what/which T(time) http://en.wikipedia.org/wiki/Special_relativity
  35. N

    How can I use the given linear transformation to determine f(x,y)?

    Homework Statement Say if f is a linear transformation from R2 to R3 with f(1,0) = (1,2,3) and f(0,1) = (0,-1,2). Determine f(x,y). The Attempt at a Solution I understand the theorem on linear transformation and bases but unsure as to how I should apply it in practice. Should I be...
  36. N

    Linear Algebra: linear transformation

    Homework Statement We have seen that the linear transformation ##T(x_1,x_2)=(x_1,0)## on ##\mathcal{R}^2## has the matrix ##A = \left( \begin{smallmatrix} 1&0\\ 0&0 \end{smallmatrix} \right)## with respect to the standard basis. This operator satisfies ##T^2=T##. Prove that if...
  37. dwn

    Solve Source Transformation Homework: V=3.35V, R=228.19kΩ

    Homework Statement Image Attached Homework Equations Ohm's The Attempt at a Solution Combined the two resistors in series : 250 + 550 = 800 kΩ Source Transformation (Current Source): V = 140,000(2*10^-6)= 0.28 V Combine the voltage sources : 6 - 0.28 = 5.72 V But then I...
  38. brainpushups

    Lorentz Transformation for S''

    Homework Statement Frame S' travels at speed V1 along the x-axis of frame S. Frame S'' travels at speed V2 along the x' axis of frame S'. Apply the Lorentz transformation twice to find the coordinates x'', y'', etc of any event in terms of x, y, z, t. Show that this is the same as the...
  39. A

    Diagonalize matrix by unitary transformation

    In an exercise I am asked to find the eigenvalues of a matrix A by demanding that a unitary matrix (see the attached file) diagonalizes it. I know I could just solve the eigenvalue equation but I think I am supposed to do it this rather tedious way. Now I have introduced an arbitrary unitary...
  40. N

    Statistics: variable transformation proof?

    Homework Statement Ok this might be a stupid question, but: https://fbcdn-sphotos-h-a.akamaihd.net/hphotos-ak-frc3/t31/q77/s720x720/10001118_10202561443653973_1625797585_o.jpg Why is this the case? I think for all of this to be right, then the assumption of ##Y=u(X) \Leftrightarrow...
  41. E

    MATLAB Matlab Code for Time-Frequency Transformation

    Hello everyone. Sorry if the question is silly, but in really need to know something. We know that The Fourier transform of time is frequency and the inverse of frequency is time. In Matlab can anyone tell me how to write it ? Because in the book Non linear fiber optics by Agrawal we found that...
  42. W

    Given a linear transformation, determine matrix A

    Homework Statement Homework Equations The Attempt at a Solution What is M_2 supposed to be? Is A supposed to be the matrix that produces those above linear transformations?
  43. binbagsss

    Fourier Transformation - Convolution quick question

    Okay the question is to find the Fourier transform of: rect(\frac{x}{5})\otimes(\delta(x+3)-\delta(x-3)) =F^{\infty}_{\infty} \intrect(\frac{x'}{5})(\delta(x+3-x')-\delta(x-3-x')) dx' [1] - where F represents a Fourier transform. My Issue Okay I am fine doing this using the convolution...
  44. K

    MHB Solving Linear & Nonlinear System w/ Reparametrization Function

    I have a problem on which I am stuck and would like help on how to proceed. The problem and my work is fairly lengthy, so please bear with me. **Problem:** A model for transport of a solute (moles of salt) and solvent (volume of water) across a permeable membrane has the form...
  45. M

    General polynomial transformation (transformation matrices).

    Homework Statement A polynomial of degree two or less can be written on the form p(x) = a0 + a1x + a2x2. In standard basis {1, x, x2} the coordinates becomes p(x) = a0 + a1x + a2x2 equivalent to ##[p(x)]_s=\begin{pmatrix}a0\\ a1\\ a2 \end{pmatrix}##. Part a) If we replace x with...
  46. L

    How to Derive the Grasp Transformation Matrix for a Three-Finger Robot Hand?

    Hello everyone, i am now working on a problem with three fingers robot hand to grab a cube to undergo some motion however i face some difficulties on deriving the grasp transformation matrix which help to switching the local coordinate frame at first i was given three point vectors [0 1...
  47. G

    Can a Linear Transformation Satisfy One Property but Not the Other?

    The two properties every linear transformation T: V -> W has to satisfy is T(u + v) = T(u) + T(v), for u,v in V (i) T(cu) = cT(u) for u in V and scalar c (ii) I'm trying to find a transformation which satisfies (i) but doesn't satisfy (ii) [I've been able to find the opposite for what it's...
  48. C

    Transformation Properties of a tensor

    Homework Statement ##D_{ijk}## is an array with ##3^3## elements, which is not known to represent a tensor. If for every symmetric tensor represented by ##a_{jk}## $$b_i = D_{ijk}a_{jk},$$ represents a vector, what can be said about the transformation properties under rotations of the...
  49. A

    Modifying a transformation based on yaw-pitch-roll or phi-theta-psi

    [I've tried asking this question on math.stackexchange.com, but haven't got any responses, so I thought I'd try here] I’m building a model in a 3D simulation program (MSC Adams) and part of that model is a triangular platform which can translate and rotate in the virtual world, as shown in...
  50. S

    Space Time Diagrams? And lorentz Transformation?

    I am starting to learn Special and General realitivity by reading through Bernard F. Schutz's book "A First Course in General Realitivity". However I can't seem to grasp the relationship between two reference frames as compared with a Space-Time diagram. I understand the geometry of the diagrams...
Back
Top