1. Inverse Matrix method example ( Enter your problem )
  1. Example `2x+5y=21,x+2y=8`
  2. Example `2x+5y=16,3x+y=11`
  3. Example `2x+3y-z=5,3x+2y+z=10,x-5y+3z=0`
  4. Example `x+y+z=3,2x-y-z=3,x-y+z=9`
Other related methods
  1. Inverse Matrix method
  2. Cramer's Rule method
  3. Gauss-Jordan Elimination method
  4. Gauss Elimination Back Substitution method
  5. Gauss Seidel method
  6. Gauss Jacobi method
  7. Elimination method
  8. LU decomposition using Gauss Elimination method
  9. LU decomposition using Doolittle's method
  10. LU decomposition using Crout's method
  11. Cholesky decomposition method
  12. SOR (Successive over-relaxation) method
  13. Relaxation method

2. Example `2x+5y=16,3x+y=11`
(Next example)

1. Example `2x+5y=21,x+2y=8`





Solve Equations 2x+5y=21,x+2y=8 using Inverse Matrix method

Solution:
Here `2x+5y=21`
`x+2y=8`

Now converting given equations into matrix form
`[[2,5],[1,2]] [[x],[y]]=[[21],[8]]`

Now, A = `[[2,5],[1,2]]`, X = `[[x],[y]]` and B = `[[21],[8]]`

`:. AX = B`

`:. X = A^-1 B`

`|A|` = 
 `2`  `5` 
 `1`  `2` 


`=2 × 2 - 5 × 1`

`=4 -5`

`=-1`


`"Here, " |A| = -1 != 0`

`:. A^(-1) " is possible."`

`Adj(A)` = 
Adj
`2``5`
`1``2`


 = 
 + 
 `2` 
 - 
 `1` 
 - 
 `5` 
 + 
 `2` 
T


 = 
`+(2)``-(1)`
`-(5)``+(2)`
T


 = 
`2``-1`
`-5``2`
T


 = 
`2``-5`
`-1``2`



`"Now, "A^(-1)=1/|A| × Adj(A)`

`"Here, "X = A^(-1) × B`

`:. X = 1/|A| × Adj(A) × B`

 = `1/(-1)` ×
`2``-5`
`-1``2`
×
`21`
`8`


 = `1/(-1)` ×
`2×21-5×8`
`-1×21+2×8`


 = `1/(-1)` ×
`2`
`-5`


 = 
`-2`
`5`


`:.[[x],[y]]=[[-2],[5]]`

`:. x=-2, y=5`


This material is intended as a summary. Use your textbook for detail explanation.
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2. Example `2x+5y=16,3x+y=11`
(Next example)





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