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I am attempting to solve this set of equations:

696x +  405y +  61z    = 1385699
618x +  463y +  81z    = 1401476
573x +  476y +  113z   = 1407438
508x +  537y +  117z   = 1418256
473x +  566y +  123z   = 1427224

x,y and z are removed in the worksheet.

Using the following formula: E2:E5 {=MMULT(MINVERSE("A1:C5"),"D1:D5")}

But I keep encountering value errors.

Can MINVERSE only be used with a 3x3 matrix?

share|improve this question
No, but it can only be used on square matrices: "MINVERSE also returns the #VALUE! error value if array does not have an equal number of rows and columns." – AakashM Jul 16 '12 at 12:48
You have five equations in three variables so your problem is overdetermined - you should decide what you want to do about that. – AakashM Jul 16 '12 at 12:51
+1 (+1!) In this kind of scenario how does one determine which 3 of 5 equations are best to use? I am about to test to see the differences. – Alistair Weir Jul 16 '12 at 13:07
What is the accuracy of say producing coefficients from each combination and then taking a mean of each result? – Alistair Weir Jul 16 '12 at 13:10
Sorry, I only know enough to know that there's a problem... these two qs on Mathematics look promising though:…… – AakashM Jul 16 '12 at 13:16
up vote 3 down vote accepted

Since your system of equations is overdetermined you may instead be looking to find the pseudoinverse or least squares estimate. To calculate this, select a 1 x 3 range such as F1:H1 then enter the array formula:


entered by holding down CTRL+SHIFT+ENTER. For the given example, this returns {z,y,x} = {1191.8,1345.3,1103.7}. Note that the results coincide with MINVERSE for square matrices.

share|improve this answer
Great! It's been too long since I've had to use matrices almost forgotten everything! – Alistair Weir Jul 16 '12 at 13:24

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