Tchebyquad problem, n=2

 start vector: (3.333333e-01,6.666667e-01)
 scale vector: (1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 2

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     1.666667e-01  6.285394e-01  0.010000
    0  *  1.649917e-01  6.222225e-01  0.010000
    0  *  8.333333e-02  3.142697e-01  1.000000
    1     4.166667e-02  3.142697e-01  1.000000
    1  *  2.604167e-03  1.964186e-02  1.000000
    2     2.777778e-03  1.964186e-02     QNERR        
    3     2.126528e-04  1.396754e-03     QNERR        
    4     1.101042e-06  7.194654e-06     QNERR        
    5     4.076409e-10  2.662704e-09     QNERR        

 solution: (2.113249e-01,7.886751e-01)

 precision=4.076409e-10
 iter    = 6
 rcode   = 0
 subcode = 0
 nfun    = 8
 njac    = 2

 Tchebyquad problem, n=3

 start vector: (2.500000e-01,5.000000e-01,7.500000e-01)
 scale vector: (1.000000e+00,1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 3

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     1.020621e-01  5.773503e-01  0.010000
    0  *  1.010389e-01  5.715623e-01  0.010000
    0  *  2.551552e-02  1.443376e-01  1.000000
    1     2.041241e-02  1.443376e-01     QNERR        
    2     2.815505e-03  2.309401e-02     QNERR        
    3     8.625936e-05  6.865045e-04     QNERR        
    4     4.336040e-07  3.468319e-06     QNERR        

 solution: (1.464466e-01,5.000000e-01,8.535534e-01)

 precision=4.336040e-07
 iter    = 5
 rcode   = 0
 subcode = 0
 nfun    = 7
 njac    = 1

 Tchebyquad problem, n=4

 start vector: (2.000000e-01,4.000000e-01,6.000000e-01,8.000000e-01)
 scale vector: (1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 4

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     1.556547e-01  5.336063e-01  0.010000
    0  *  1.540803e-01  5.282302e-01  0.010000
    0  *  5.088727e-02  2.580422e-01  0.427777
    1     5.926894e-02  2.580422e-01  0.427777
    1  *  5.908689e-03  4.984952e-02  0.681283
    2     5.832538e-03  4.984952e-02  0.681283
    2  *  3.237660e-04  3.288824e-03  1.000000
    3     3.277427e-04  3.288824e-03     QNERR        
    4     3.692461e-05  3.621546e-04     QNERR        
    5     5.235992e-07  5.748014e-06     QNERR        

 solution: (1.026728e-01,4.062038e-01,5.937962e-01,8.973272e-01)

 precision=5.235992e-07
 iter    = 6
 rcode   = 0
 subcode = 0
 nfun    = 8
 njac    = 3

 Tchebyquad problem, n=5

 start vector: (1.666667e-01,3.333333e-01,5.000000e-01,6.666667e-01,8.333333e-01)
 scale vector: (1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 5

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     8.687497e-02  5.046952e-01  0.010000
    0  *  8.599778e-02  4.996215e-01  0.010000
    0  *  3.430706e-02  2.838438e-01  0.428697
    1     3.161615e-02  2.838438e-01  0.428697
    1  *  5.211596e-03  7.010160e-02  1.000000
    2     5.330372e-03  7.010160e-02     QNERR        
    3     5.330372e-03  3.407247e-02     QNERR  THETA!
    3     3.624315e-03  7.010160e-02  1.000000
    3  *  5.376737e-03  1.014051e-01  1.000000
    3  *  3.140520e-03  5.692424e-02  0.337037
    4     3.179433e-03  5.692424e-02  0.337037
    4  *  3.449840e-05  6.562574e-04  1.000000
    5     3.415392e-05  6.562574e-04     QNERR        
    6     7.908450e-07  1.486954e-05     QNERR        

 solution: (8.375126e-02,3.127293e-01,5.000000e-01,6.872707e-01,9.162487e-01)

 precision=7.908450e-07
 iter    = 7
 rcode   = 0
 subcode = 0
 nfun    = 11
 njac    = 4

 Tchebyquad problem, n=6

 start vector: (1.428571e-01,2.857143e-01,4.285714e-01,5.714286e-01,7.142857e-01,8.571429e-01)
 scale vector: (1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 6

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     2.613851e-01  5.277964e-01  0.010000
    0  *  2.587232e-01  5.225671e-01  0.010000
    0  *  1.712976e-01  4.006122e-01  0.256840
    1     5.045485e-01  4.006122e-01  0.256840
    1  *  5.460238e-01  3.740966e-01  0.034407
    1  *  5.032651e-01  3.982965e-01  0.005068
    2     2.392240e+01  3.982965e-01  0.005068

 Error - no convergence, damping factor became too small

 NLEQ_ERR failed - no solution found
 iter    = 2
 rcode   = 3
 subcode = 0
 nfun    = 5
 njac    = 3

 Tchebyquad problem, n=7

 start vector: (1.250000e-01,2.500000e-01,3.750000e-01,5.000000e-01,6.250000e-01,7.500000e-01,8.750000e-01)
 scale vector: (1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 7

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     1.200460e-01  4.862041e-01  0.010000
    0  *  1.188312e-01  4.812816e-01  0.010000
    0  *  3.824492e-02  2.265373e-01  0.408141
    1     1.093776e-01  2.265373e-01  0.408141
    1  *  8.184812e-02  1.867182e-01  0.125237
    2     3.027888e-02  1.867182e-01  0.125237
    2  *  4.723471e-03  7.188127e-02  0.686834
    3     4.702220e-03  7.188127e-02  0.686834
    3  *  8.569001e-05  1.688549e-03  1.000000
    4     8.552168e-05  1.688549e-03     QNERR        
    5     9.410084e-06  1.326700e-04     QNERR        
    6     1.616029e-06  2.621579e-05     QNERR        
    7     3.570202e-08  5.546427e-07     QNERR        

 solution: (5.806915e-02,2.351716e-01,3.380441e-01,5.000000e-01,6.619559e-01,7.648284e-01,9.419309e-01)

 precision=3.570202e-08
 iter    = 8
 rcode   = 0
 subcode = 0
 nfun    = 10
 njac    = 4

 Tchebyquad problem, n=8

 start vector: (1.111111e-01,2.222222e-01,3.333333e-01,4.444444e-01,5.555556e-01,6.666667e-01,7.777778e-01,8.888889e-01)
 scale vector: (1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 8

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     5.855886e-01  5.558251e-01  0.010000
    0  *  5.796504e-01  5.496968e-01  0.010000
    0  *  5.293472e-01  1.079471e+00  0.186407
    1     1.679232e-01  1.079471e+00  0.186407
    1  *  1.274713e-01  5.986045e-01  0.508108
    2     3.444702e-02  5.986045e-01  0.508108
    2  *  5.524981e-02  4.351665e-01  1.000000
    2  *  2.856324e-02  3.961416e-01  0.311739
    3     1.697386e-01  3.961416e-01  0.311739
    3  *  1.686434e-01  3.902771e-01  0.012375
    4     4.277338e+00  3.902771e-01  0.012375

 Error - no convergence, damping factor became too small

 NLEQ_ERR failed - no solution found
 iter    = 4
 rcode   = 3
 subcode = 0
 nfun    = 7
 njac    = 5

 Tchebyquad problem, n=9

 start vector: (1.000000e-01,2.000000e-01,3.000000e-01,4.000000e-01,5.000000e-01,6.000000e-01,7.000000e-01,8.000000e-01,9.000000e-01)
 scale vector: (1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00,1.000000e+00)

 NLEQ_ERR - Version 1.1

 Problem dimension: n = 9

 Prescribed relative precision: 1.000000e-06

 The Jacobian is supplied by a user routine

 The problem is specified as being highly nonlinear
 The standard monotonicity test will be applied
 The maximum permitted number of iteration steps is: 50

 iter     norm_scl(dx)      norm(fk)    lambda 

    0     2.374737e-01  5.098498e-01  0.010000
    0  *  2.350370e-01  5.051185e-01  0.010000
    0  *  1.816806e-01  5.827913e-01  0.175684
    1     6.097269e-01  5.827913e-01  0.175684
    1  *  6.595065e-01  6.136029e-01  0.026235
    1  *  6.087478e-01  5.815708e-01  0.003184
    2     8.016743e+01  5.815708e-01  0.003184

 Error - no convergence, damping factor became too small

 NLEQ_ERR failed - no solution found
 iter    = 2
 rcode   = 3
 subcode = 0
 nfun    = 5
 njac    = 3