Inverse Matrices

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2D Inverse Matrices
Doc Boff
Flashcards by Doc Boff, updated more than 1 year ago
Doc Boff
Created by Doc Boff about 6 years ago
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Question Answer
What the determinant of a singular matrix? |M| = 0
Can we invert a singular matrix? No
All reflections when inverted are.... The same as reflections are self-inverse
A 30 degree rotation CW has the inverse... 30 degree rotation AC
An enlargement of sf 3 centre (0,0) has the inverse.... Enlargement sf 1/3 centre (0,0)
To find an unknown value in a singular matrix, e.g. [-2 4][1 p] , we use.... The determinant (ad-bc=0 , so (-2)(p)-(4)(1)=0, -2p-4=0, 2p=-4, p=-2)
What is different when we find an unknown value in a non-singular matrix? We use ≠ instead of =
What is the formula for finding an inverse matrix? (Lets say M=[a b][c d]) M-1 = 1/ad-bc(d -b)(-c a) (for ad-bc≠0)
M x M-1 = .... and M-1 x M = .... Identity Matrix (I)
B-1A-1 = .... (AB)-1
|A-1| = .... 1/|A| (as |AB| = |A||B|)
For AX=B , if we have the matrices A and B, how would we find X? AX=B , A-1 x A = B x A-1 (A x A-1 = I) , IX = B x A-1 (I x X = X), so : X=B x A-1 This method works for all rearrangements of X
What matrices represents the simultaneous equation 2x+3y =16 // -4x+y=3 ? [2 3][-4 1] x [x][y] = [16][3] (x values on left , y values on right for first matrix)
If we know M[x][y] = [16][3] , how do we find the values of x and y? (if we know M) Do MM-1[x][y] = [16][3]M-1, which is the same as [x][y] = [16][3]M-1 , and multiply together to get [x][y].
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