peval.adb running

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 3
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
polynomial coefficients are:
c( 0)=-6.50000000000000E-01
c( 1)= 7.01000000000000E+00
c( 2)=-5.20000000000000E+00
c( 3)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 3,r( 0),c)= 1.11022302462516E-16
r( 1)= 2.50000000000000E+00, eval( 3,r( 1),c)= 1.66533453693774E-15
r( 2)= 2.60000000000000E+00, eval( 3,r( 2),c)= 0.00000000000000E+00

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 4
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
r( 3)= 5.10000000000000E+00
polynomial coefficients are:
c( 0)= 3.31500000000000E+00
c( 1)=-3.64010000000000E+01
c( 2)= 3.35300000000000E+01
c( 3)=-1.03000000000000E+01
c( 4)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 4,r( 0),c)= 0.00000000000000E+00
r( 1)= 2.50000000000000E+00, eval( 4,r( 1),c)= 1.64313007644523E-14
r( 2)= 2.60000000000000E+00, eval( 4,r( 2),c)= 3.55271367880050E-15
r( 3)= 5.10000000000000E+00, eval( 4,r( 3),c)=-2.88657986402541E-14

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 5
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
r( 3)= 5.10000000000000E+00
r( 4)= 7.70000000000000E+00
polynomial coefficients are:
c( 0)=-2.55255000000000E+01
c( 1)= 2.83602700000000E+02
c( 2)=-2.94582000000000E+02
c( 3)= 1.12840000000000E+02
c( 4)=-1.80000000000000E+01
c( 5)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 5,r( 0),c)= 0.00000000000000E+00
r( 1)= 2.50000000000000E+00, eval( 5,r( 1),c)= 1.10134124042816E-13
r( 2)= 2.60000000000000E+00, eval( 5,r( 2),c)= 1.38555833473220E-13
r( 3)= 5.10000000000000E+00, eval( 5,r( 3),c)= 1.13686837721616E-12
r( 4)= 7.70000000000000E+00, eval( 5,r( 4),c)=-4.54747350886464E-13

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 6
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
r( 3)= 5.10000000000000E+00
r( 4)= 7.70000000000000E+00
r( 5)= 1.28000000000000E+01
polynomial coefficients are:
c( 0)= 3.26726400000000E+02
c( 1)=-3.65564006000000E+03
c( 2)= 4.05425230000000E+03
c( 3)=-1.73893400000000E+03
c( 4)= 3.43240000000000E+02
c( 5)=-3.08000000000000E+01
c( 6)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 6,r( 0),c)=-5.68434188608080E-14
r( 1)= 2.50000000000000E+00, eval( 6,r( 1),c)= 1.08002495835535E-12
r( 2)= 2.60000000000000E+00, eval( 6,r( 2),c)= 1.76214598468505E-12
r( 3)= 5.10000000000000E+00, eval( 6,r( 3),c)= 6.79847289575264E-11
r( 4)= 7.70000000000000E+00, eval( 6,r( 4),c)= 1.94177118828520E-10
r( 5)= 1.28000000000000E+01, eval( 6,r( 5),c)= 1.17910303742974E-09

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 7
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
r( 3)= 5.10000000000000E+00
r( 4)= 7.70000000000000E+00
r( 5)= 1.28000000000000E+01
r( 6)= 2.05000000000000E+01
polynomial coefficients are:
c( 0)=-6.69789120000000E+03
c( 1)= 7.52673476300000E+04
c( 2)=-8.67678122100000E+04
c( 3)= 3.97023993000000E+04
c( 4)=-8.77535400000000E+03
c( 5)= 9.74640000000000E+02
c( 6)=-5.13000000000000E+01
c( 7)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 7,r( 0),c)=-9.09494701772928E-13
r( 1)= 2.50000000000000E+00, eval( 7,r( 1),c)=-9.54969436861575E-11
r( 2)= 2.60000000000000E+00, eval( 7,r( 2),c)=-5.27506927028298E-11
r( 3)= 5.10000000000000E+00, eval( 7,r( 3),c)=-3.43788997270167E-10
r( 4)= 7.70000000000000E+00, eval( 7,r( 4),c)= 1.79170456249267E-09
r( 5)= 1.28000000000000E+01, eval( 7,r( 5),c)= 1.40180418384261E-08
r( 6)= 2.05000000000000E+01, eval( 7,r( 6),c)= 1.25880433188286E-07

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 8
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
r( 3)= 5.10000000000000E+00
r( 4)= 7.70000000000000E+00
r( 5)= 1.28000000000000E+01
r( 6)= 2.05000000000000E+01
r( 7)= 3.33000000000000E+01
polynomial coefficients are:
c( 0)= 2.23039776960000E+05
c( 1)=-2.51310056727900E+06
c( 2)= 2.96463549422300E+06
c( 3)=-1.40885770890000E+06
c( 4)= 3.31921687500000E+05
c( 5)=-4.12308660000000E+04
c( 6)= 2.68293000000000E+03
c( 7)=-8.46000000000000E+01
c( 8)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 8,r( 0),c)= 2.91038304567337E-11
r( 1)= 2.50000000000000E+00, eval( 8,r( 1),c)= 9.60426405072212E-10
r( 2)= 2.60000000000000E+00, eval( 8,r( 2),c)=-5.82076609134674E-11
r( 3)= 5.10000000000000E+00, eval( 8,r( 3),c)=-1.30967237055302E-09
r( 4)= 7.70000000000000E+00, eval( 8,r( 4),c)=-4.26371116191149E-08
r( 5)= 1.28000000000000E+01, eval( 8,r( 5),c)= 2.56113708019257E-09
r( 6)= 2.05000000000000E+01, eval( 8,r( 6),c)=-3.79068660549820E-06
r( 7)= 3.33000000000000E+01, eval( 8,r( 7),c)= 1.24689424410462E-04

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 9
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
r( 3)= 5.10000000000000E+00
r( 4)= 7.70000000000000E+00
r( 5)= 1.28000000000000E+01
r( 6)= 2.05000000000000E+01
r( 7)= 3.33000000000000E+01
r( 8)= 5.38000000000000E+01
polynomial coefficients are:
c( 0)=-1.19995400004480E+07
c( 1)= 1.35427850296570E+08
c( 2)=-1.62010490156476E+08
c( 3)= 7.87611802330430E+07
c( 4)=-1.92662444964000E+07
c( 5)= 2.55014227830000E+06
c( 6)=-1.85572500000000E+05
c( 7)= 7.23441000000000E+03
c( 8)=-1.38400000000000E+02
c( 9)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 9,r( 0),c)=-1.86264514923096E-09
r( 1)= 2.50000000000000E+00, eval( 9,r( 1),c)=-1.43423676490784E-07
r( 2)= 2.60000000000000E+00, eval( 9,r( 2),c)=-1.19209289550781E-07
r( 3)= 5.10000000000000E+00, eval( 9,r( 3),c)=-2.12527811527252E-06
r( 4)= 7.70000000000000E+00, eval( 9,r( 4),c)=-9.16421413421631E-06
r( 5)= 1.28000000000000E+01, eval( 9,r( 5),c)=-1.35956332087517E-04
r( 6)= 2.05000000000000E+01, eval( 9,r( 6),c)=-4.07228246331215E-04
r( 7)= 3.33000000000000E+01, eval( 9,r( 7),c)= 1.12703628838062E-03
r( 8)= 5.38000000000000E+01, eval( 9,r( 8),c)= 1.05321277491748E+00

y := c(0) + c(1)*x + c(2)*x^2 +...+ c(n)*x^n, for n= 10
roots are:
r(0)= 1.00000000000000E-01
r(1)= 2.50000000000000E+00
r( 2)= 2.60000000000000E+00
r( 3)= 5.10000000000000E+00
r( 4)= 7.70000000000000E+00
r( 5)= 1.28000000000000E+01
r( 6)= 2.05000000000000E+01
r( 7)= 3.33000000000000E+01
r( 8)= 5.38000000000000E+01
r( 9)= 8.71000000000000E+01
polynomial coefficients are:
c( 0)= 1.04515993403902E+09
c( 1)=-1.18077653008317E+10
c( 2)= 1.42465415429257E+10
c( 3)=-7.02210928845452E+09
c( 4)= 1.75685107586948E+09
c( 5)=-2.41383636936330E+08
c( 6)= 1.87135070283000E+07
c( 7)=-8.15689611000000E+05
c( 8)= 1.92890500000000E+04
c( 9)=-2.25500000000000E+02
c( 10)= 1.00000000000000E+00
polynomial evaluated at each root:
r( 0)= 1.00000000000000E-01, eval( 10,r( 0),c)= 3.57627868652344E-07
r( 1)= 2.50000000000000E+00, eval( 10,r( 1),c)= 2.86102294921875E-05
r( 2)= 2.60000000000000E+00, eval( 10,r( 2),c)= 3.20672988891602E-05
r( 3)= 5.10000000000000E+00, eval( 10,r( 3),c)= 1.99556350708008E-04
r( 4)= 7.70000000000000E+00, eval( 10,r( 4),c)= 7.35402107238770E-04
r( 5)= 1.28000000000000E+01, eval( 10,r( 5),c)= 1.62911415100098E-02
r( 6)= 2.05000000000000E+01, eval( 10,r( 6),c)= 4.34665679931641E-02
r( 7)= 3.33000000000000E+01, eval( 10,r( 7),c)= 1.13158881664276E+00
r( 8)= 5.38000000000000E+01, eval( 10,r( 8),c)=-1.45245955228806E+02
r( 9)= 8.71000000000000E+01, eval( 10,r( 9),c)=-4.48967402243614E+03