Matrix algebra: Prove AB-BA cannot equal I2?

Fifa · 2011-02-22 13:44:45

The question for my matrix algebra class is: show that there is no 2x2 matrix A and B such that AB-BA= I2 (I sub 2, identity matrix, sorry can't write I sub2)

I2: |1 0|
|0 1|

We obviously can't prove it with a specific example, it has to work for all 2x2 matrices. anyone know how to prove this? Thanks for the help!

bobbym · 2011-02-22 14:04:58

Hi fifa;

Let us say it is true and fight our way to a contradiction.

Form two generic matrices A and B

If the statement is true then this is true for some a-h.

Do the multiplication and subtraction.

What this means is that

Then:

Also

Substituting 2) into 3) we get:

We have a contradiction therefore no such 2x2 matrices exist.

Fifa · 2011-02-22 14:15:12

I understand everything you did, but I am still confused on how bg-cf=1 can disprove this.

bobbym · 2011-02-22 14:16:22

Please check the post again for the explanation. Do you see it now?

Fifa · 2011-02-22 14:25:04

Oh haha the rest of it wasn't up yet, now it makes sense, thanks so much!

bobbym · 2011-02-22 14:27:26

Your welcome! Hope it is what you want.

Math Is Fun Forum

#1 2011-02-22 13:44:45

Matrix algebra: Prove AB-BA cannot equal I2?

#2 2011-02-22 14:04:58

Re: Matrix algebra: Prove AB-BA cannot equal I2?

#3 2011-02-22 14:15:12

Re: Matrix algebra: Prove AB-BA cannot equal I2?

#4 2011-02-22 14:16:22

Re: Matrix algebra: Prove AB-BA cannot equal I2?

#5 2011-02-22 14:25:04

Re: Matrix algebra: Prove AB-BA cannot equal I2?

#6 2011-02-22 14:27:26

Re: Matrix algebra: Prove AB-BA cannot equal I2?

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