Determine all 2 times 2 matrices A such that AB = BA for any 2 times 2 matrix B.

Josalynn

Josalynn

Answered question

2021-03-04

Determine all 2×2 matrices A such that AB = BA for any 2×2 matrix B.

Answer & Explanation

hesgidiauE

hesgidiauE

Skilled2021-03-05Added 106 answers

Step 1
Let A=[abcd] and B=[pqrs] be any 2×2 matrices.
Step 5
Find AB.
AB=[abcd][pqrs]
=[ap+braq+bscp+drcq+ds]
Find BA.
BA=[pqrs][abcd]
=[ap+cqbp+dqar+csbr+ds] Equate the matrices AB=BA.
AB=BA
[ap+braq+bscp+drcq+ds]=[ap+cqbp+dqar+csbr+ds]
[ap+braq+bscp+drcq+ds][ap+cqbp+dqar+csbr+ds]=[0000]
[brcq(ad)qb(ps)c(ps)r(ad)cqbr]=[0000]
Equate the matrices.
brcq=0(1)
(ad)qb(ps)=0(2)
c(ps)r(ad)=0(3)
cqbr=0(4)
From equation (1) and equation (4),
q=bcr
Substitute q=bcr in equation (2)
(ad)bceb(ps)=0
c=(ad)r(ps)
Substitute q=bcr in equation (2)
(ad)(bcr)b(ps)=0
b=q(ad)ps
Hence, the 2x2 matrix which satisfied AB=BA for any matrix B is
A=[aq(ad)psr(ad)psd]
Jeffrey Jordon

Jeffrey Jordon

Expert2022-01-22Added 2605 answers

Answer is given below (on video)

Nick Camelot

Nick Camelot

Skilled2023-06-19Added 164 answers

Answer:
A=[abcd]=[xyzw]
Explanation:
Given:
A=[abcd] where a, b, c, and d are the entries of the matrix A.
Now, let's consider an arbitrary 2×2 matrix B:
B=[xyzw]
To satisfy the condition AB = BA for any matrix B, we multiply the matrices AB and BA and set them equal:
AB=[abcd][xyzw]=[ax+bzay+bwcx+dzcy+dw]
BA=[xyzw][abcd]=[xa+ycxb+ydza+wczb+wd]
Setting AB = BA, we have:
[ax+bzay+bwcx+dzcy+dw]=[xa+ycxb+ydza+wczb+wd]
By comparing the corresponding entries, we can obtain the following equations:
1) ax+bz=xa+yc
2) ay+bw=xb+yd
3) cx+dz=za+wc
4) cy+dw=zb+wd
Simplifying these equations, we get:
1) axxa=ycbzaxxayc+bz=0(ax)(xa)+(by)(yb)=0(ax)2+(by)2=0
2) ayyd=xbbw(ax)(yd)+(by)(wb)=0(ax)(yd)+(by)(bw)=0
3) cxza=wcdz(cz)(xa)+(dz)(wc)=0(cz)(xa)+(dz)(dw)=0
4) cyzb=wddw(cz)(yd)+(dz)(dw)=0(cz)(yd)+(dz)(wd)=0
Now, let's analyze each equation:
Equation 1:
(ax)2+(by)2=0
For this equation to hold true for all values of x and y, we must have a = x and b = y. Therefore, the entries of A are fixed:
a=x
b=y
Equation 2:
(ax)(yd)+(by)(bw)=0
Since a = x and b = y, this equation simplifies to:
(xx)(yd)+(yy)(yw)=0
0(yd)+0(yw)=0
This equation holds true for any values of d and w.
Equation 3:
(cz)(xa)+(dz)(dw)=0
Substituting a = x and c = z, we get:
(zz)(xx)+(dz)(dw)=0
0(xx)+(dz)(dw)=0
This equation holds true for any values of x, z, d, and w.
Equation 4:
(cz)(yd)+(dz)(wd)=0
Substituting c = z and d = w, we obtain:
(cc)(yd)+(ww)(wd)=0
0(yd)+0(wd)=0
This equation holds true for any values of y, d, and w.
Therefore, the general form of the matrix A that satisfies the condition AB = BA for any matrix B is:
A=[abcd]=[xyzw] where a = x, b = y, c = z, and d = w.

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