If `A=[{:(1,-1),(2,3):}]`, shown that `A^(2)-44+5I=o`. Hence Find `A^( – InterviewSolution

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1.	If `A=[{:(1,-1),(2,3):}]`, shown that `A^(2)-44+5I=o`. Hence Find `A^(-1)`.
Answer» `A=[{:(1,-1),(2,3):}]` `rArr" "A^(2)=A.A=[{:(1,-1),(2,3):}][{:(1,-1),(2,3):}]` `[{:(1-2,-1-3),(2+6,-2+9):}]=[{:(-1,-4),(8,7):}]` `"Now, L.H.S."=A^(2)-4A+5I` `[{:(-1,-4),(8,7):}]-4[{:(-1,-1),(2,3):}]+5[{:(1,0),(0,1):}]` `[{:(-1,-4),(8,7):}]-[{:(4,-4),(8,12):}]+[{:(5,0),(0,):}]` `[{:(0,0),(0,0):}]=o=R.H.S.` `"Now "\|A\|=\|{:(1,-1),(2,3):}\|=3-(-2)=5ne0` therefore, `A^(-1)` exists. `therefore" "A^(2)-4A+5I=0 ` `rArr A^(-1)(A^(2)-4A+5I)=A^(1).O` `rArr" "A-4I+5A^(-1)=4I-A` `=[{:(1,0),(0,1):}]-[{:(1,-1),(2,3):}]=[{:(3,1),(-2,1):}]` `rArr=A^(-1)=1/5[{:(3,1),(-2,1):}].`

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