Begin test
Now print a real number: 3.14159
Matrix type: Rect (1, 8)
0 0 0 0 0 0 0 1
+ UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Ident
UT UT Rect Rect Rect UT Rect UT Rect Rect UT
LT Rect LT Rect Rect LT Rect Rect LT Rect LT
Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Sym Rect Rect Rect Sym Sym Rect Rect Rect Sym Sym
Diag UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Diag
Band Rect Rect Rect Rect Band Band Band Band Band Band
UpBnd UT Rect Rect Rect UpBnd Band UpBnd Band Band UpBnd
LwBnd Rect LT Rect Rect LwBnd Band Band LwBnd Band LwBnd
SmBnd Rect Rect Rect Sym SmBnd Band Band Band SmBnd SmBnd
Ident UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Ident
* UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Ident
UT UT Rect Rect Rect UT Rect UT Rect Rect UT
LT Rect LT Rect Rect LT Rect Rect LT Rect LT
Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Sym Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Diag UT LT Rect Rect Diag Band UpBnd LwBnd Band Diag
Band Rect Rect Rect Rect Band Band Band Band Band Band
UpBnd UT Rect Rect Rect UpBnd Band UpBnd Band Band UpBnd
LwBnd Rect LT Rect Rect LwBnd Band Band LwBnd Band LwBnd
SmBnd Rect Rect Rect Rect Band Band Band Band Band Band
Ident UT LT Rect Rect Diag Band UpBnd LwBnd Band Ident
| UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Ident
UT Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
LT Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Sym Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Diag Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Band Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
UpBnd Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
LwBnd Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
SmBnd Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Ident Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
SP UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Ident
UT UT Diag UT UT Diag UpBnd UpBnd Diag UpBnd Diag
LT Diag LT LT LT Diag LwBnd Diag LwBnd LwBnd Diag
Rect UT LT Rect Rect Diag Band UpBnd LwBnd Band Diag
Sym UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Diag
Diag Diag Diag Diag Diag Diag Diag Diag Diag Diag Diag
Band UpBnd LwBnd Band Band Diag Band UpBnd LwBnd Band Diag
UpBnd UpBnd Diag UpBnd UpBnd Diag UpBnd UpBnd Diag UpBnd Diag
LwBnd Diag LwBnd LwBnd LwBnd Diag LwBnd Diag LwBnd LwBnd Diag
SmBnd UpBnd LwBnd Band SmBnd Diag Band UpBnd LwBnd SmBnd Diag
Ident Diag Diag Diag Diag Diag Diag Diag Diag Diag Ident
KP UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Ident
UT UT Rect Rect Rect UT Rect UT Rect Rect UT
LT Rect LT Rect Rect LT Rect Rect LT Rect LT
Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect Rect
Sym Rect Rect Rect Sym Sym Rect Rect Rect Sym Sym
Diag UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Diag
Band Rect Rect Rect Rect Band Band Band Band Band Band
UpBnd UT Rect Rect Rect UpBnd Band UpBnd Band Band UpBnd
LwBnd Rect LT Rect Rect LwBnd Band Band LwBnd Band LwBnd
SmBnd Rect Rect Rect Sym SmBnd Band Band Band SmBnd SmBnd
Ident UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Diag
>= UT LT Rect Sym Diag Band UpBnd LwBnd SmBnd Ident
UT Yes No Yes No No No No No No No
LT No Yes Yes No No No No No No No
Rect No No Yes No No No No No No No
Sym No No Yes Yes No No No No No No
Diag Yes Yes Yes Yes Yes Yes Yes Yes Yes No
Band No No Yes No No Yes No No No No
UpBnd Yes No Yes No No Yes Yes No No No
LwBnd No Yes Yes No No Yes No Yes No No
SmBnd No No Yes Yes No Yes No No Yes No
Ident Yes Yes Yes Yes Yes Yes Yes Yes Yes Yes
* First test of Matrix package
* Matrix test program
Matrix type: LT (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: UT (9, 9)
All elements are zero
Matrix type: Rect (9, 9)
All elements are zero
Matrix type: Rect (10, 3)
All elements are zero
Matrix type: Rect (10, 3)
All elements are zero
Matrix type: Rect (10, 3)
All elements are zero
Matrix type: Rect (10, 3)
All elements are zero
Matrix type: Rect (10, 3)
All elements are zero
Matrix type: Rect (10, 3)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (20, 8)
All elements are zero
Matrix type: Rect (20, 6)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (20, 20)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 10)
All elements are zero
Matrix type: Rect (10, 20)
All elements are zero
Matrix type: Rect (20, 10)
All elements are zero
Matrix type: Rect (20, 10)
All elements are zero
Matrix type: Rect (10, 20)
All elements are zero
Matrix type: Rect (3, 3)
All elements are zero
* Second test of Matrix package
* Matrix test program
Matrix type: Rect (8, 10)
All elements are zero
Matrix type: Rect (8, 10)
All elements are zero
Matrix type: Rect (8, 10)
All elements are zero
Matrix type: Rect (8, 10)
All elements are zero
Matrix type: Rect (8, 10)
All elements are zero
Matrix type: Rect (100, 1)
All elements are zero
Matrix type: Rect (10, 1)
All elements are zero
Matrix type: Rect (20, 1)
All elements are zero
Matrix type: Rect (4, 7)
All elements are zero
Matrix type: Rect (4, 7)
All elements are zero
Matrix type: Rect (8, 8)
All elements are zero
Matrix type: Rect (8, 8)
All elements are zero
Matrix type: Rect (8, 8)
All elements are zero
Matrix type: Rect (8, 8)
All elements are zero
Matrix type: Rect (8, 8)
All elements are zero
Matrix type: Rect (10, 20)
All elements are zero
Matrix type: Rect (0, 0)
All elements are zero
Matrix type: Rect (16, 1)
All elements are zero
Matrix type: Rect (0, 1)
All elements are zero
Matrix type: Rect (16, 1)
All elements are zero
Matrix type: Rect (1, 0)
All elements are zero
Matrix type: Rec
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