7.20000000000000E+0000
FALSE
FALSE
 0.00000000000000E+0000
 1.50000000000000E+0001
15

1
5
0
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
7
2
15
20
4
 0.00000000000000E+0000
0
 1.20000000000073E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
0
640
480
3
0
0
314
314
0
311
241
3
16711680
 0.00000000000000E+0000
1
255
 2.00000000000045E-0001
1
32768
 5.00000000000000E-0001
1
16777215
 1.00000000000000E+0000
1
1
255
FALSE
-155
-129
0
-9
0
0
 5.72222222222481E+0001
z
z
5
0
0
TRUE
FALSE
TRUE
16711680
65535
16711935
-6
0
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
1
10
10
0
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 2.00000000000000E+0000
 1.00000000000000E+0002
-2.00000000000000E+0001
 2.00000000000045E-0001
3
FALSE
1
FALSE
FALSE
FALSE
20
319
0
320
314
0
294
241
3
16711680
 0.00000000000000E+0000
1
255
 2.00000000000045E-0001
1
32768
 5.00000000000000E-0001
1
16777215
 1.00000000000000E+0000
1
1
255
FALSE
-147
-120
0
0
0
0
 3.00000000000000E+0001
Re(z^2)-i*Im(z^2)
function
5
1
1
TRUE
FALSE
TRUE
16711680
65535
16711935
-6
0
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
0
8
10
0
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 2.00000000000000E+0000
 1.00000000000000E+0002
-2.00000000000000E+0001
 2.00000000000045E-0001
3
FALSE
1
FALSE
FALSE
FALSE
20
271
27
320
314
0
294
241
3
16711680
 0.00000000000000E+0000
1
255
 2.00000000000045E-0001
1
32768
 5.00000000000000E-0001
1
16777215
 1.00000000000000E+0000
1
1
255
FALSE
-147
-117
0
3
0
0
 1.03882905463921E+0002
z
Polya field 
10
2
1
TRUE
FALSE
TRUE
16711680
65535
16711935
-6
0
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 0.00000000000000E+0000
 1.00000000000000E+0000
1
10
10
1
 3.00000000000182E-0001
 0.00000000000000E+0000
 0.00000000000000E+0000
 2.00000000000000E+0000
 1.00000000000000E+0002
-2.00000000000000E+0001
 2.00000000000045E-0001
3
FALSE
1
FALSE
FALSE
FALSE
20
3
3
530
278
1
4
Plots the Poly vector field for the function z^2. For other functions,
you'll need to modify the number of circles, the location of their radii,
and the number of circular subdivisions in order to get an uncluttered
picture.