Imaginary Matrix Division
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08-21-2021, 02:57 AM
Post: #1
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Imaginary Matrix Division
The Prime does this:
[[1 1][1 1]] / [[1 1][1 i]] [[1 1][0 0]] Most other calculators get [[1 0][1 0]] for an answer. Which is right? Tom L Cui bono? |
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08-21-2021, 06:17 AM
Post: #2
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RE: Imaginary Matrix Division
(08-21-2021 02:57 AM)toml_12953 Wrote: The Prime does this: The 50g also gets [[1 1][0 0]]. Wolfram Alpha returns [[1 1][1 -i]]. Hmmm. <0|ɸ|0> -Joe- |
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08-21-2021, 06:43 AM
Post: #3
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RE: Imaginary Matrix Division
Interesting, matrix multiplication is not commutative.
If a = [[1 1][1 1]] and b = [[1 1][1 i]] When ask Prime a/b gives a warning: inv(b)*a This gives [[1 1][0 0]] If you do a*inv(b) gives [[1 0][1 0]] For me exponents should be operate first so prime in this misleading expresión is correct. But I am not sure, could be the opposite. Toni |
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08-21-2021, 08:05 AM
Post: #4
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RE: Imaginary Matrix Division
(08-21-2021 06:17 AM)Joe Horn Wrote:(08-21-2021 02:57 AM)toml_12953 Wrote: The Prime does this:The 50g also gets [[1 1][0 0]]. Same result, as early as the 28S, and even the HP-71B w/ Math ROM (doing INV(B)*A ). (08-21-2021 06:43 AM)Tonig00 Wrote: When ask Prime a/b gives a warning: inv(b)*a RPL machines (since the 28S) were implementing the "matrix division" a/b as inv(b)*a. J-F |
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08-21-2021, 09:29 AM
(This post was last modified: 08-21-2021 09:30 AM by Werner.)
Post: #5
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RE: Imaginary Matrix Division
(08-21-2021 06:17 AM)Joe Horn Wrote: Wolfram Alpha returns [[1 1][1 -i]]. Hmmm. That is the result of an element-wise division.. Matrix division being implemented as premultiplying by the inverse was already present in the 42S. Since [[1 1][1 1] has 2 identical colums, so will the result. Cheers, Werner 41CV†,42S,48GX,49G,DM42,DM41X,17BII,15CE,DM15L,12C,16CE |
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08-21-2021, 11:21 AM
(This post was last modified: 08-21-2021 11:26 AM by Albert Chan.)
Post: #6
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RE: Imaginary Matrix Division
(08-21-2021 09:29 AM)Werner Wrote: Matrix division being implemented as premultiplying by the inverse was already present in the 42S. Matrix "division" B/A is really solving for A*X = B for X, without gettting inv(A) It is faster and likely more accurate. https://www.hpmuseum.org/forum/thread-14...#pid128492 https://www.hpmuseum.org/cgi-sys/cgiwrap...read=65551 |
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08-21-2021, 01:29 PM
Post: #7
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RE: Imaginary Matrix Division
(08-21-2021 11:21 AM)Albert Chan Wrote: Matrix "division" B/A is really solving for A*X = B for X, without gettting inv(A) Of course ;-) usually I’m the one telling others. I’m slipping.. Xheers, Werner 41CV†,42S,48GX,49G,DM42,DM41X,17BII,15CE,DM15L,12C,16CE |
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08-22-2021, 05:22 PM
Post: #8
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RE: Imaginary Matrix Division
Is there a reason to not support both left and right division of matrices?
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08-23-2021, 11:57 AM
Post: #9
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RE: Imaginary Matrix Division
You would need a new symbol, perhaps B/A for left and B\A for right; but that may be more confusing than not supporting both.
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08-23-2021, 05:30 PM
Post: #10
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RE: Imaginary Matrix Division
(08-23-2021 11:57 AM)roadrunner Wrote: You would need a new symbol, perhaps B/A for left and B\A for right; but that may be more confusing than not supporting both. In algebraic mode, there certainly could be a bit of confusion as to which is the dividend and which is the divisor in B\A (this wasn’t a problem in math classes I attended where left and right division were used on the blackboard due to relative vertical displacements). Issuing warnings when either are used could certainly be entirely reasonable. |
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08-23-2021, 06:41 PM
Post: #11
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RE: Imaginary Matrix Division
Can we get B*inv(A) without evaluating inverse and multiply ?
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08-24-2021, 05:19 AM
Post: #12
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RE: Imaginary Matrix Division
(08-23-2021 06:41 PM)Albert Chan Wrote: Can we get B*inv(A) without evaluating inverse and multiply ? Code: TRANS Cheers, Werner 41CV†,42S,48GX,49G,DM42,DM41X,17BII,15CE,DM15L,12C,16CE |
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