Canonical Matrix
Canonical matrix: A non-zero matrix ‘A’ of rank r is row equivalent to a unique matrix C, called a canonical matrix of A, which is obtained from ‘A’ according to some definite rule. [Length of a matrix = total number of leading 1] ➢ Example: Find the canonical matrix that is row equivalent of the following matrix, A =[pic 2] We have, A =[pic 3] Performing R21 (-2), R31 (-3), R41 (-2), we get-[pic 4] Performing R[pic 5] , we get-[pic 6] Performing R12 (-2), R32 (-2), we get-[pic 7] Performing R [pic 8], we get-[pic 9] Performing R13 (-5), R23 (1), we get-[pic 10] = C Rank of A, ρ (A) = (maximum number of rows in A) – (number of zero rows in C) = 4 – 1 = 3, & length = total number of leading ‘1’ = 3. Find the canonical matrix that is row equivalent of the following matrix– A = [pic 11] We have, A = [pic 12] Performing R12, we get-[pic 13] Performing R21 (-2), R31 (-3), R41 (-4), we get-[pic 14] Performing R [pic 15], we get -[pic 16] Performing R12 (-2), R32 (-2), R42 (-5), we get-[pic 17] Performing R [pic 18], we get-[pic 19] Performing R13 (-5), R23 (1), R43 (6), we get -[pic 20] = C Rank of A, ρ (A) = (maximum number of rows in A) – (number of zero rows in C) = 4 – 1 = 3 & length = total number of leading ‘1’ = 3. Example: Find the canonical matrix that is row equivalent of the following matrix- A = [pic 21] We have, A = [pic 22] Performing R21 (-4), R31 (-6), we get-[pic 23] Performing R [pic 24], we get-[pic 25] Performing R12 (-2), R13 (5), we get -[pic 26] Performing R [pic 27], we get-[pic 28]
Essay About Rank R And Total Number
Essay, Pages 1 (255 words)
Latest Update: July 13, 2021
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