# Inverse of matrix and multiplication

I am new to world of matrix, sorry for this basic question I could not figure out:

I have four matrix (one unknown).

Matrix X

``````x <- c(44.412, 0.238, -0.027, 93.128, 0.238, 0.427, -0.193, 0.673, 0.027,
-0.193, 0.094, -0.428, 93.128, 0.673, -0.428, 224.099)

X <- matrix(x, ncol = 4 )
``````

Matrix B : need to be solved , 1 X 4 (column x nrows), with b1, b2, b3, b4 values

Matrix G

``````g <- c(33.575, 0.080, -0.006, 68.123, 0.080, 0.238, -0.033, 0.468, -0.006,
-0.033, 0.084, -0.764, 68.123, 0.468, -0.764, 205.144)

G <- matrix(g, ncol = 4)
``````

Matrix A

``````a <- c(1, 1, 1, 1) # one this case but can be any value
A <- matrix(a, ncol = 1)
``````

Solution:

``````B = inv(X) G A  # inv(X) is inverse of the X matrix multiplied by G and A
``````

I did not know how to solve this properly, particularly inverse of the matrix. Appreciate your help.

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You could check `?solve` – Nick Sabbe Nov 9 '11 at 12:49
The inverse of a matrix is `solve`. Matrix multiplication is `%*%`. – Ben Bolker Nov 9 '11 at 12:50
thanks Nick and Ben for solving the problem...I know the question was too basic but that is what my level of knowledge on matrix stuff... – jon Nov 9 '11 at 13:33

I'm guessing that Nick and Ben are both teachers and have even greater scruples than I do about doing other peoples' homework, but the path to a complete solution was really so glaringly obvious that it didn't make a lot of sense not to tae the next step:

``````B = solve(X) %*% G %*% A
> B
[,1]
[1,] -2.622000509
[2,]  7.566857261
[3,] 17.691911600
[4,]  2.318762273
``````

The QR method of inversion can be invoked by supplying an identity matrix as the second argument:

``````> qr.solve(G, diag(1,4))
[,1]             [,2]          [,3]             [,4]
[1,]  0.098084556856 -0.0087200426695 -0.3027373205 -0.0336789016478
[2,] -0.008720042669  4.4473233701790  1.7395207242 -0.0007717410073
[3,] -0.302737320546  1.7395207241703 13.9161591761  0.1483895429511
[4,] -0.033678901648 -0.0007717410073  0.1483895430  0.0166129089935
``````
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+1 One should caution the OP that taking the inverse of a matrix is generally not a great idea computationally. If you are fitting a model of some for, using an algorithm based on a decomposition instead of inverting a matrix would be preferred. – Gavin Simpson Nov 9 '11 at 13:33
thanks, DWin for the solution...I am really embrassed to ask such a basic question .. @Gavin, can you elaborate your suggestion as answer ...? – jon Nov 9 '11 at 13:34

A more computationally stable solution is to use `qr` rather than `solve`.

``````method1 <- solve(X) %*% G %*% A
method2 <- qr.coef(qr(X), G) %*% A
stopifnot(isTRUE(all.equal(method1, method2)))
``````

See the examples in `?qr`.

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`library(fortunes)`; `fortune("regression coefficients")` – Ben Bolker Nov 9 '11 at 15:29