o vetor eps(i) eh:
 eps(i)=  4.000000000000000E-001   6.000000000000000E-001
   9.000000000000000E-001   7.000000000000000E-001   8.000000000000000E-001
 o vetor temp(i) eh:
 temp(i)=     450.000000000000000      800.000000000000000
      650.000000000000000     1000.000000000000000      550.000000000000000
 a matriz a(i,j) eh
 linha           1
        1.000000000000000  -1.500000000000000E-001  -1.500000000000000E-001
  -1.500000000000000E-001  -1.500000000000000E-001
 linha           2
  -1.000000000000000E-001        1.000000000000000  -1.000000000000000E-001
  -1.000000000000000E-001  -1.000000000000000E-001
 linha           3
  -2.499999999999999E-002  -2.499999999999999E-002        1.000000000000000
  -2.499999999999999E-002  -2.499999999999999E-002
 linha           4
  -7.500000000000001E-002  -7.500000000000001E-002  -7.500000000000001E-002
        1.000000000000000  -7.500000000000001E-002
 linha           5
  -4.999999999999999E-002  -4.999999999999999E-002  -4.999999999999999E-002
  -4.999999999999999E-002        1.000000000000000
 o vetor b(i) eh
      930.021750000000000
    13934.592000000000000
     9109.173937500000000
    39690.000000000000000
     4150.723500000000000
 a matriz l(i,j) eh
 linha           1
        1.000000000000000   0.000000000000000E+000   0.000000000000000E+000
   0.000000000000000E+000   0.000000000000000E+000
 linha           2
  -1.000000000000000E-001        1.000000000000000   0.000000000000000E+000
   0.000000000000000E+000   0.000000000000000E+000
 linha           3
  -2.499999999999999E-002  -2.918781725888324E-002        1.000000000000000
   0.000000000000000E+000   0.000000000000000E+000
 linha           4
  -7.500000000000001E-002  -8.756345177664976E-002  -9.700920245398775E-002
        1.000000000000000   0.000000000000000E+000
 linha           5
  -4.999999999999999E-002  -5.837563451776649E-002  -6.467280163599182E-002
  -6.794993989774427E-002        1.000000000000000
 a matriz u(i,j) eh
 linha           1
        1.000000000000000  -1.500000000000000E-001  -1.500000000000000E-001
  -1.500000000000000E-001  -1.500000000000000E-001
 linha           2
   0.000000000000000E+000   9.850000000000000E-001  -1.150000000000000E-001
  -1.150000000000000E-001  -1.150000000000000E-001
 linha           3
   0.000000000000000E+000   0.000000000000000E+000   9.928934010152284E-001
  -3.210659898477157E-002  -3.210659898477157E-002
 linha           4
   0.000000000000000E+000   0.000000000000000E+000   0.000000000000000E+000
   9.755655674846626E-001  -9.943443251533744E-002
 linha           5
   0.000000000000000E+000   0.000000000000000E+000   0.000000000000000E+000
   0.000000000000000E+000   9.769538146099249E-001
 o produto de l por u eh a matriz p(i,j) abaixo
 linha           1
        1.000000000000000  -1.500000000000000E-001  -1.500000000000000E-001
  -1.500000000000000E-001  -1.500000000000000E-001
 linha           2
  -1.000000000000000E-001        1.000000000000000  -1.000000000000000E-001
  -1.000000000000000E-001  -1.000000000000000E-001
 linha           3
  -2.499999999999999E-002  -2.499999999999999E-002        1.000000000000000
  -2.500000000000000E-002  -2.500000000000000E-002
 linha           4
  -7.500000000000001E-002  -7.500000000000001E-002  -7.500000000000001E-002
        1.000000000000000  -7.500000000000001E-002
 linha           5
  -4.999999999999999E-002  -4.999999999999999E-002  -5.000000000000000E-002
  -4.999999999999999E-002        1.000000000000000
 a solucao eh
 x(          1)=   13759.946576239030000
 x(          2)=   21694.427159196900000
 x(          3)=   11308.774054906480000
 x(          4)=   43848.333401244130000
 x(          5)=    8681.297559579325000
 as taxas de trans cal Q_i sao:
 q(          1)=   22869.784402478050000
 q(          2)=   -6884.517783613960000
 q(          3)=   32061.681357475080000
 q(          4)=  -89961.666191291090000
 q(          5)=   41914.718214951920000
 Soma dos Qs =  0.000000000000000E+000