[scilab-Users] too large string
Calixte Denizet
calixte.denizet at scilab.org
Mon Oct 3 17:10:31 CEST 2011
Hi Séverine,
The string you can pass to scilab has a limited size.
A workaround:
i) put your big line in a file: expression.txt
ii) get your line with : l=mgetl('expression.txt');
iii) J(i,k)=evstr(l);
Best regards,
Calixte
On 03/10/2011 15:53, Séverine Paul wrote:
> Hi again,
>
> this is the answer of scilab:
>
> Command is too long (more than 512 characters long): could not send it
> to Scilab
>
> and below is the command. It is actually quite long, but I didn't know
> that this could be a problem. In Maple (from which this comes), there
> is no problem
>
> Thanks for your help.
> Séverine.
>
> J(i,k) =
> -exp(-b*(x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> (-0.144e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^
> 2)) * sqrt(b) + 0.144e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1)
> + x(i + 1) ^ 2)) * sqrt(b) - 0.56e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 *
> x(i + 1) * x(k) + x(i) ^ 2)) * x(k) ^ 2 * x(i) * x(i + 1) * b ^ (0.5e1
> / 0.2e1) - 0.66e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i
> + 1) ^ 2)) * x(i) ^ 2 * b ^ (0.3e1 / 0.2e1) - 0.420e3 * exp(b * (x(k)
> ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) -
> x(k + 1) * sqrt(b)) * x(i) ^ 4 * x(i + 1) * sqrt(%pi) * b ^ 3 -
> 0.168e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) *
> x(k + 1) + x(i) ^ 2)) * x(i) * x(k + 1) ^ 4 * x(k) + 0.32e2 * exp(b *
> (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) ^ 5 * x(k)
> * b ^ (0.7e1 / 0.2e1) + 0.32e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i)
> * x(k) + x(i + 1) ^ 2)) * x(i) ^ 4 * x(k) ^ 2 * b ^ (0.7e1 / 0.2e1) +
> 0.112e3 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2))
> * x(i) ^ 5 * x(i + 1) * b ^ (0.7e1 / 0.2e1) + 0.112e3 * exp(b * (x(k)
> ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i) * x(i + 1) ^ 5 *
> b ^ (0.7e1 / 0.2e1) + 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) *
> x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 5 * x(k + 1) * b ^ (0.7e1 / 0.2e1)
> - 0.126e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^
> 2)) * x(i + 1) * x(i) * b ^ (0.3e1 / 0.2e1) + 0.48e2 * exp(b * (x(k) ^
> 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) * x(i) ^ 3 * b
> ^ (0.5e1 / 0.2e1) + 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i + 1) ^ 5 * x(i) * sqrt(%pi) * x(k + 1) + 0.196e3 * b ^
> (0.5e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i +
> 1) ^ 2)) * x(i + 1) * x(i) ^ 2 * x(k) - 0.56e2 * b ^ (0.5e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i +
> 1) * x(k) ^ 2 * x(k + 1) + 0.56e2 * b ^ (0.5e1 / 0.2e1) * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) * x(k
> + 1) ^ 2 * x(k) + 0.280e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k
> + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) *
> x(i + 1) * sqrt(%pi) * x(i) * x(k + 1) ^ 4 * x(k) - 0.112e3 * b ^ 4 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) ^ 6 * sqrt(%pi) * x(k
> + 1) + 0.40e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1)
> ^ 2)) * x(k + 1) ^ 2 * x(i) ^ 2 * b ^ (0.5e1 / 0.2e1) - 0.14e2 * exp(b
> * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) *
> x(i + 1) * b ^ (0.3e1 / 0.2e1) - 0.105e3 * exp(b * (x(k) ^ 2 + x(i) ^
> 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i) * sqrt(%pi) * erf(x(i + 1) *
> sqrt(b) - x(k + 1) * sqrt(b)) * b + 0.212e3 * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(k) ^ 4 * b ^ (0.5e1 / 0.2e1)
> - 0.212e3 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^
> 2)) * x(k) ^ 4 * b ^ (0.5e1 / 0.2e1) - 0.48e2 * exp(b * (x(k + 1) ^ 2
> + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k) ^ 3 * x(i) * b ^ (0.5e1
> / 0.2e1) + 0.364e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) +
> x(i) ^ 2)) * x(i) * x(i + 1) ^ 3 * b ^ (0.5e1 / 0.2e1) - 0.140e3 * b ^
> 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(i) ^ 4 * x(k
> + 1) - 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 +
> x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) *
> sqrt(%pi) * x(k + 1) ^ 5 * x(k) + 0.140e3 * exp(b * (x(k) ^ 2 + x(i) ^
> 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k) ^ 4 * erf(x(i + 1) * sqrt(b)
> - x(k) * sqrt(b)) * x(i) * sqrt(%pi) * b ^ 3 + 0.56e2 * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k) * x(i + 1) * x(i)
> ^ 2 * b ^ (0.5e1 / 0.2e1) - 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i + 1) * x(i)
> * x(k + 1) ^ 3 * x(k) - 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2
> + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b))
> * x(i) ^ 5 * x(i + 1) * sqrt(%pi) * x(k + 1) - 0.168e3 * b ^ (0.5e1 /
> 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2))
> * x(i + 1) * x(i) * x(k) * x(k + 1) - 0.56e2 * b ^ (0.7e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) ^
> 3 * x(k) ^ 2 * x(k + 1) - 0.196e3 * b ^ (0.5e1 / 0.2e1) * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i) * x(k + 1)
> ^ 2 * x(k) - 0.210e3 * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1)
> ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * x(i) * sqrt(%pi) * erf(x(i) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(k) + 0.112e3 * b ^ (0.7e1 / 0.2e1) *
> exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i) *
> x(i + 1) ^ 3 * x(k + 1) * x(k) + 0.144e3 * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * sqrt(b) - 0.252e3 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k) ^ 5 *
> erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * sqrt(%pi) * b ^ 3 + 0.280e3
> * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) ^ 3 * x(i) *
> sqrt(%pi) * x(k) + 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) * x(i) * x(k + 1)
> ^ 3 * x(k) + 0.56e2 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) ^ 2 * x(k) * x(k + 1) -
> 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k
> + 1) + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 2 * x(k + 1) ^ 2 * x(k) +
> 0.210e3 * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * x(i + 1) * x(i) * sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k
> + 1) * sqrt(b)) * x(k) - 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k
> + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i) * x(i + 1) ^ 2
> * x(k) ^ 2 * x(k + 1) - 0.40e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1)
> * x(k + 1) + x(i) ^ 2)) * x(k + 1) ^ 2 * x(i + 1) ^ 2 * b ^ (0.5e1 /
> 0.2e1) - 0.364e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i +
> 1) ^ 2)) * x(i + 1) * x(i) ^ 3 * b ^ (0.5e1 / 0.2e1) - 0.140e3 * exp(b
> * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k) ^ 4 *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) * sqrt(%pi) * b ^ 3 +
> 0.140e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * x(k) ^ 4 * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) *
> sqrt(%pi) * b ^ 3 + 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) *
> x(k + 1) + x(i) ^ 2)) * x(k + 1) * x(i) * x(i + 1) ^ 2 * b ^ (0.5e1 /
> 0.2e1) - 0.56e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i +
> 1) ^ 2)) * x(i) ^ 4 * x(i + 1) * x(k) * b ^ (0.7e1 / 0.2e1) + 0.112e3
> * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) ^ 6 * x(i) *
> sqrt(%pi) * b ^ 4 - 0.112e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) *
> sqrt(%pi) * x(k) ^ 6 * x(k + 1) + 0.224e3 * b ^ (0.3e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i +
> 1) * x(k + 1) + 0.14e2 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) * x(k + 1) + 0.112e3 * b ^
> (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i +
> 1) ^ 2)) * x(k) ^ 5 * x(k + 1) + 0.56e2 * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 3 * x(i) * x(k) ^ 2
> * b ^ (0.7e1 / 0.2e1) + 0.66e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i)
> * x(k) + x(i + 1) ^ 2)) * x(i) ^ 2 * b ^ (0.3e1 / 0.2e1) - 0.56e2 *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i +
> 1) * x(i) * x(k) ^ 4 * b ^ (0.7e1 / 0.2e1) + 0.364e3 * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 3 *
> b ^ (0.5e1 / 0.2e1) - 0.92e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i +
> 1) * x(k) + x(i) ^ 2)) * x(k) * x(i + 1) * b ^ (0.3e1 / 0.2e1) +
> 0.126e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2))
> * x(i + 1) * x(i) * b ^ (0.3e1 / 0.2e1) - 0.56e2 * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i) * x(i + 1) ^ 3 * x(k +
> 1) ^ 2 * b ^ (0.7e1 / 0.2e1) + 0.14e2 * exp(b * (x(k) ^ 2 + 0.2e1 *
> x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(k + 1) * x(i) * b ^ (0.3e1 /
> 0.2e1) - 0.80e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) +
> x(i) ^ 2)) * x(i + 1) ^ 6 * b ^ (0.7e1 / 0.2e1) + 0.80e2 * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i) ^ 6 * b ^
> (0.7e1 / 0.2e1) + 0.105e3 * b * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k +
> 1) ^ 2 + x(i + 1) ^ 2)) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) *
> sqrt(b)) * x(k + 1) + 0.126e3 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k) ^
> 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) * x(k)+0.84e2
> * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k +
> 1) + x(i) ^ 2)) * x(i + 1) ^ 3 * x(k) + 0.112e3 * b ^ (0.7e1 / 0.2e1)
> * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i)
> ^ 5 * x(k + 1) - 0.126e3 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(k + 1) * x(k) - 0.364e3 *
> b ^ (0.5e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k)
> + x(i) ^ 2)) * x(k) ^ 3 * x(k + 1) + 0.364e3 * b ^ (0.5e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k) ^
> 3 * x(k + 1) + 0.84e2 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) ^ 3 * x(k + 1) - 0.364e3 *
> b ^ (0.5e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) +
> x(i + 1) ^ 2)) * x(k + 1) ^ 3 * x(k) + 0.224e3 * b ^ (0.3e1 / 0.2e1) *
> exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i) *
> x(k) - 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1)
> ^ 2)) * x(i) ^ 5 * x(k + 1) * b ^ (0.7e1 / 0.2e1) + 0.56e2 * exp(b *
> (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) * x(i)
> * x(k) ^ 4 * b ^ (0.7e1 / 0.2e1) - 0.420e3 * exp(b * (x(k) ^ 2 + x(i)
> ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i + 1) ^ 4 * x(i) * sqrt(%pi) * b ^ 3 - 0.80e2 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) *
> sqrt(b) - x(k) * sqrt(b)) * x(i) ^ 7 * sqrt(%pi) * b ^ 4 + 0.280e3 *
> x(k + 1) * x(k) * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2
> + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i)
> * sqrt(%pi) * x(i + 1) ^ 4 - 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) *
> sqrt(b)) * x(i) ^ 5 * x(i + 1) * sqrt(%pi) * x(k) - 0.168e3 * b ^
> (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i +
> 1) ^ 2)) * x(i + 1) * x(k) ^ 4 * x(k + 1) + 0.56e2 * b ^ (0.7e1 /
> 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2))
> * x(i) ^ 3 * x(k + 1) ^ 2 * x(k) + 0.105e3 * b * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * sqrt(%pi) * erf(x(i + 1) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(k) + 0.56e2 * b ^ (0.7e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i +
> 1) ^ 3 * x(k) ^ 2 * x(k + 1) + 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k +
> 1) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(i) ^ 3 * x(k + 1) + 0.140e3 *
> b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i) ^ 4 * sqrt(%pi) * x(k) +
> 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) *
> sqrt(%pi) * x(k + 1) ^ 5 * x(k) + 0.196e3 * b ^ (0.5e1 / 0.2e1) *
> exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i +
> 1) * x(k + 1) ^ 2 * x(k) - 0.56e2 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k
> + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) ^ 4 * x(k) *
> x(k + 1) + 0.196e3 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i) * x(k) ^ 2 * x(k + 1) +
> 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(i + 1) ^ 2 * x(k + 1) ^ 4 * b ^ (0.7e1 / 0.2e1) + 0.280e3 * b ^ 3
> * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i) * sqrt(%pi) * x(k) ^ 3 *
> x(k + 1) - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^
> 2 + x(i + 1) ^ 2)) * x(i + 1) ^ 3 * x(i) * sqrt(%pi) * erf(x(i + 1) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(k + 1) - 0.168e3 * b ^ 4 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) ^ 5 * x(i) * sqrt(%pi) * x(k)
> + 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1)
> * x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 2 * x(i) * x(k + 1) ^ 2 * x(k) -
> 0.280e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) *
> x(i) * sqrt(%pi) * x(k + 1) ^ 4 * x(k) - 0.112e3 * b ^ 4 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) *
> sqrt(b) - x(k) * sqrt(b)) * x(i + 1) ^ 6 * sqrt(%pi) * x(k + 1) +
> 0.105e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * x(i + 1) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * b
> - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * x(i) ^ 3 * x(i + 1) * sqrt(%pi) * erf(x(i) * sqrt(b) -
> x(k) * sqrt(b)) * x(k) + 0.56e2 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 4 * x(k) *
> x(k + 1) + 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^
> 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) ^
> 5 * x(i + 1) * sqrt(%pi) * x(k) + 0.210e3 * b ^ 2 * exp(b * (x(k) ^ 2
> + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * x(i) *
> sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(k + 1) + 0.168e3
> * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) +
> x(i + 1) ^ 2)) * x(i + 1) * x(k + 1) ^ 4 * x(k) - 0.84e2 * b ^ (0.5e1
> / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^
> 2)) * x(i + 1) ^ 3 * x(k + 1) - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) -
> x(k) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(k) ^ 3 * x(k + 1) + 0.420e3
> * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * sqrt(%pi) * x(k) ^ 4 *
> x(k + 1) - 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^
> 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i) *
> sqrt(%pi) * x(k) ^ 5 * x(k + 1) - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2
> + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k
> + 1) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(k + 1) ^ 3 * x(k) - 0.210e3
> * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * x(i + 1) * x(i) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k + 1) *
> sqrt(b)) * x(k + 1) + 0.168e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k +
> 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i +
> 1) * x(i) * sqrt(%pi) * x(k) ^ 5 * b ^ 4 - 0.252e3 * exp(b * (x(k) ^ 2
> + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k)
> * sqrt(b)) * x(i) ^ 5 * sqrt(%pi) * b ^ 3 - 0.140e3 * exp(b * (x(k) ^
> 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k + 1) ^ 4 * erf(x(i
> + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) * sqrt(%pi) * b ^ 3 -
> 0.80e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(k + 1) ^ 6 * b ^ (0.7e1 / 0.2e1) + 0.56e2 * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(k + 1) ^ 2 * x(i) * x(i +
> 1) * b ^ (0.5e1 / 0.2e1) + 0.56e2 * b ^ (0.5e1 / 0.2e1) * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 2 *
> x(k + 1) * x(k) - 0.210e3 * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k
> + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * x(i) * sqrt(%pi) * erf(x(i + 1)
> * sqrt(b) - x(k) * sqrt(b)) * x(k + 1) + 0.280e3 * b ^ 3 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(i) ^ 3 * x(k)
> - 0.420e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi)
> * x(k + 1) ^ 4 * x(k) - 0.80e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i)
> * x(k) + x(i + 1) ^ 2)) * x(i) ^ 6 * b ^ (0.7e1 / 0.2e1) + 0.56e2 * b
> ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i
> + 1) ^ 2)) * x(i) * x(k + 1) ^ 4 * x(k) + 0.140e3 * b ^ 3 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) ^ 4 * sqrt(%pi) * x(k + 1) +
> 0.168e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i +
> 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 4 * x(i) * x(k + 1) + 0.140e3 * b
> ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i) ^ 4 * sqrt(%pi) * x(k + 1)
> - 0.168e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1)
> * x(k + 1) + x(i) ^ 2)) * x(i) * x(i + 1) ^ 4 * x(k) + 0.112e3 * b ^ 4
> * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) ^ 6 *
> sqrt(%pi) * x(k) - 0.196e3 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k + 1) ^
> 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i + 1) * x(k) ^ 2 * x(k +
> 1) + 0.212e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1)
> ^ 2)) * x(k + 1) ^ 4 * b ^ (0.5e1 / 0.2e1) - 0.66e2 * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(k) ^ 2 * b ^ (0.3e1
> / 0.2e1) - 0.105e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * x(i + 1) * sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k + 1)
> * sqrt(b)) * b - 0.14e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) *
> x(k) + x(i) ^ 2)) * x(k) * x(i) * b ^ (0.3e1 / 0.2e1) - 0.40e2 * exp(b
> * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k) ^ 2 *
> x(i) ^ 2 * b ^ (0.5e1 / 0.2e1) + 0.56e2 * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 4 * x(i) * x(k) * b
> ^ (0.7e1 / 0.2e1) - 0.56e2 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 4 * x(k + 1) *
> x(k) - 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 +
> x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i +
> 1) ^ 5 * x(i) * sqrt(%pi) * x(k + 1) - 0.14e2 * b ^ (0.3e1 / 0.2e1) *
> exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i) *
> x(k) - 0.14e2 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 *
> x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) * x(k + 1) + 0.126e3 * b ^
> (0.3e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) +
> x(i) ^ 2)) * x(k) * x(k + 1) + 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 5 *
> x(k) + 0.364e3 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i
> + 1) * x(k + 1) + x(i) ^ 2)) * x(k + 1) ^ 3 * x(k) + 0.140e3 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k + 1) ^ 4 *
> erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) * sqrt(%pi) * b ^
> 3 + 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 +
> x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) *
> sqrt(%pi) * x(i + 1) * x(k + 1) ^ 5 * x(k) - 0.105e3 * b * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * sqrt(%pi) *
> erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(k) - 0.105e3 * b * exp(b
> * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * sqrt(%pi) *
> erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(k + 1) - 0.210e3 * x(k +
> 1) * x(k) * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * x(i) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) +
> 0.105e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * x(i) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * b +
> 0.92e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(k + 1) * x(i + 1) * b ^ (0.3e1 / 0.2e1) + 0.84e2 * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k) ^ 3 * x(i + 1) *
> b ^ (0.5e1 / 0.2e1) - 0.92e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k
> + 1) + x(i + 1) ^ 2)) * x(k + 1) * x(i) * b ^ (0.3e1 / 0.2e1) +
> 0.420e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) * sqrt(%pi) *
> x(i + 1) ^ 4 * b ^ 3 + 0.66e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) *
> x(k + 1) + x(i) ^ 2)) * x(k + 1) ^ 2 * b ^ (0.3e1 / 0.2e1) + 0.66e2 *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k) ^
> 2 * b ^ (0.3e1 / 0.2e1) + 0.252e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k
> + 1) ^ 2 + x(i + 1) ^ 2)) * x(k + 1) ^ 5 * erf(x(i + 1) * sqrt(b) -
> x(k + 1) * sqrt(b)) * sqrt(%pi) * b ^ 3 + 0.210e3 * b ^ 2 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * x(i)
> * sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(k + 1)
> + 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i)
> * x(k) + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 3 * x(k) * x(k + 1) -
> 0.56e2 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) *
> x(k) + x(i + 1) ^ 2)) * x(i) * x(k) ^ 4 * x(k + 1) + 0.168e3 * b ^
> (0.5e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i +
> 1) ^ 2)) * x(i + 1) * x(i) * x(k + 1) * x(k) + 0.112e3 * b ^ 4 * exp(b
> * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1)
> * sqrt(b) - x(k) * sqrt(b)) * sqrt(%pi) * x(k) ^ 6 * x(k + 1) -
> 0.420e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * sqrt(%pi) * x(k) ^ 4
> * x(k + 1) - 0.66e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) +
> x(i + 1) ^ 2)) * x(k + 1) ^ 2 * b ^ (0.3e1 / 0.2e1) + 0.66e2 * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 2 *
> b ^ (0.3e1 / 0.2e1) + 0.212e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k
> + 1) + x(i + 1) ^ 2)) * x(i) ^ 4 * b ^ (0.5e1 / 0.2e1) - 0.252e3 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k +
> 1) ^ 5 * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * b ^ 3
> - 0.105e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^
> 2)) * x(i) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * b +
> 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(i + 1) * x(k + 1) ^ 5 * b ^ (0.7e1 / 0.2e1) - 0.112e3 * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i + 1) * x(k
> + 1) ^ 5 * b ^ (0.7e1 / 0.2e1) - 0.32e2 * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 5 * x(k) * b ^
> (0.7e1 / 0.2e1) + 0.32e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k)
> + x(i + 1) ^ 2)) * x(i) * x(k) ^ 5 * b ^ (0.7e1 / 0.2e1) - 0.32e2 *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i +
> 1) * x(k) ^ 5 * b ^ (0.7e1 / 0.2e1) - 0.48e2 * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(k + 1) ^ 3 * x(i + 1) * b
> ^ (0.5e1 / 0.2e1) + 0.92e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) *
> x(k) + x(i + 1) ^ 2)) * x(k) * x(i) * b ^ (0.3e1 / 0.2e1) + 0.126e3 *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i +
> 1) * x(i) * b ^ (0.3e1 / 0.2e1) - 0.112e3 * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 5 * x(i) * b ^
> (0.7e1 / 0.2e1) - 0.32e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) *
> x(k) + x(i) ^ 2)) * x(i + 1) ^ 3 * x(k) ^ 3 * b ^ (0.7e1 / 0.2e1) +
> 0.112e3 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2))
> * x(i + 1) * x(k) ^ 5 * b ^ (0.7e1 / 0.2e1) + 0.80e2 * exp(b * (x(k) ^
> 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) ^ 6 * b ^
> (0.7e1 / 0.2e1) + 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1)
> + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 3 * x(k + 1) ^ 2 * b ^ (0.7e1 /
> 0.2e1) - 0.66e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) +
> x(i) ^ 2)) * x(i + 1) ^ 2 * b ^ (0.3e1 / 0.2e1) + 0.252e3 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) *
> sqrt(b) - x(k) * sqrt(b)) * x(i + 1) ^ 5 * sqrt(%pi) * b ^ 3 - 0.80e2
> * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k)
> ^ 6 * b ^ (0.7e1 / 0.2e1) - 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b *
> (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i) * x(i + 1)
> * x(k) ^ 3 * x(k + 1) + 0.112e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2
> + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b))
> * x(i) ^ 6 * sqrt(%pi) * x(k) + 0.112e3 * b ^ 4 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) *
> sqrt(b)) * x(i) ^ 6 * sqrt(%pi) * x(k + 1) - 0.56e2 * b ^ (0.5e1 /
> 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2))
> * x(i) ^ 2 * x(k + 1) * x(k) - 0.84e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1
> * x(i + 1) * x(k) + x(i) ^ 2)) * x(k) ^ 3 * x(i) * b ^ (0.5e1 / 0.2e1)
> - 0.126e3 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^
> 2)) * x(i + 1) * x(i) * b ^ (0.3e1 / 0.2e1) + 0.14e2 * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(k) * x(i + 1) * b ^
> (0.3e1 / 0.2e1) + 0.210e3 * x(k + 1) * x(k) * b ^ 2 * exp(b * (x(k) ^
> 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * sqrt(%pi) *
> erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) + 0.168e3 * x(k + 1) * x(k) *
> b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(i) ^ 5 +
> 0.168e3 * x(k + 1) * x(k) * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k
> + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) *
> x(i + 1) ^ 5 * sqrt(%pi) - 0.210e3 * x(k + 1) * x(k) * b ^ 2 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) *
> sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) + 0.210e3 * x(k + 1)
> * x(k) * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * x(i) * sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b))
> - 0.168e3 * x(k + 1) * x(k) * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) *
> sqrt(b)) * x(i + 1) ^ 5 * sqrt(%pi) + 0.280e3 * x(k + 1) * x(k) * b ^
> 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i) ^ 4 * x(i + 1) * sqrt(%pi)
> + 0.140e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^
> 2)) * x(k + 1) ^ 4 * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) *
> sqrt(%pi) * x(i) * b ^ 3 + 0.252e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k) ^ 5 * erf(x(i) * sqrt(b) - x(k) *
> sqrt(b)) * sqrt(%pi) * b ^ 3 - 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 *
> x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) * x(i + 1) * x(i) ^ 2 * b
> ^ (0.5e1 / 0.2e1) - 0.212e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) *
> x(k + 1) + x(i) ^ 2)) * x(k + 1) ^ 4 * b ^ (0.5e1 / 0.2e1) - 0.168e3 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(i)
> * x(k + 1) ^ 5 * b ^ 4 + 0.40e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i
> + 1) * x(k) + x(i) ^ 2)) * x(k) ^ 2 * x(i + 1) ^ 2 * b ^ (0.5e1 /
> 0.2e1) - 0.84e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i +
> 1) ^ 2)) * x(k + 1) ^ 3 * x(i + 1) * b ^ (0.5e1 / 0.2e1) + 0.48e2 *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(k) ^
> 3 * x(i + 1) * b ^ (0.5e1 / 0.2e1) + 0.112e3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) -
> x(k) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(k) ^ 6 * b ^ 4 - 0.112e3 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(k) ^ 6
> * b ^ 4 - 0.56e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) +
> x(i) ^ 2)) * x(k) * x(i) * x(i + 1) ^ 2 * b ^ (0.5e1 / 0.2e1) +
> 0.252e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(i) ^ 5 * b
> ^ 3 - 0.105e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1)
> ^ 2)) * x(i + 1) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) *
> b - 0.212e3 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^
> 2)) * x(i) ^ 4 * b ^ (0.5e1 / 0.2e1) + 0.212e3 * exp(b * (x(k + 1) ^ 2
> + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 4 * b ^ (0.5e1 /
> 0.2e1) + 0.14e2 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 *
> x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) * x(k) - 0.112e3 * b ^
> (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i +
> 1) ^ 2)) * x(i) ^ 5 * x(k) - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k +
> 1) * sqrt(b)) * sqrt(%pi) * x(i) * x(k + 1) ^ 3 * x(k) + 0.420e3 * b ^
> 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(k + 1) ^ 4 *
> x(k) - 0.112e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 +
> x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) ^ 6 *
> sqrt(%pi) * x(k) + 0.168e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i) ^ 4 * x(i + 1) * x(k)
> - 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) *
> sqrt(%pi) * x(k + 1) ^ 5 * x(k) - 0.144e3 * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * sqrt(b) + 0.80e2 * exp(b * (x(k
> + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(k) ^ 6 * b ^
> (0.7e1 / 0.2e1) - 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^
> 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i) * x(i + 1) ^ 3 * x(k)
> * x(k + 1) - 0.105e3 * b * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2
> + x(i + 1) ^ 2)) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k + 1) *
> sqrt(b)) * x(k) + 0.105e3 * b * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k +
> 1) ^ 2 + x(i + 1) ^ 2)) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) *
> sqrt(b)) * x(k) - 0.280e3 * x(k + 1) * x(k) * b ^ 4 * exp(b * (x(k) ^
> 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b)
> - x(k) * sqrt(b)) * x(i + 1) ^ 4 * x(i) * sqrt(%pi) + 0.210e3 * x(k +
> 1) * x(k) * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * x(i + 1) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k + 1) *
> sqrt(b)) + 0.56e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i
> + 1) ^ 2)) * x(k) ^ 2 * x(i + 1) * x(i) * b ^ (0.5e1 / 0.2e1) + 0.80e2
> * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(k + 1) ^
> 7 * b ^ 4 + 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1)
> ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i
> + 1) ^ 3 * x(i) * sqrt(%pi) * x(k + 1) - 0.210e3 * b ^ 2 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * x(i)
> * sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(k) -
> 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) *
> sqrt(%pi) * x(k) ^ 5 * x(k + 1) + 0.105e3 * b * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * sqrt(%pi) * erf(x(i + 1) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(k + 1) - 0.56e2 * b ^ (0.7e1 /
> 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(i + 1) ^ 3 * x(k + 1) ^ 2 * x(k) + 0.210e3 * b ^ 2 * exp(b * (x(k)
> ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * x(i) *
> sqrt(%pi) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(k) - 0.280e3 *
> x(k + 1) * x(k) * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2
> + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) ^ 4
> * x(i + 1) * sqrt(%pi) - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^
> 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i) * sqrt(%pi) * x(k) ^ 3 * x(k + 1) + 0.280e3 * b ^ 3 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(k) ^ 3
> * x(k + 1) + 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1)
> ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) *
> x(i + 1) * sqrt(%pi) * x(k + 1) ^ 3 * x(k) - 0.56e2 * b ^ (0.7e1 /
> 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(i + 1) * x(k + 1) ^ 4 * x(k) - 0.56e2 * b ^ (0.7e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) ^
> 2 * x(k) ^ 3 * x(k + 1) - 0.224e3 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k
> + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i) * x(k + 1) -
> 0.168e3 * x(k + 1) * x(k) * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k
> + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) *
> x(i) ^ 5 * sqrt(%pi) - 0.210e3 * x(k + 1) * x(k) * b ^ 2 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) *
> sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) + 0.210e3 *
> x(k + 1) * x(k) * b ^ 2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2
> + x(i + 1) ^ 2)) * x(i) * sqrt(%pi) * erf(x(i) * sqrt(b) - x(k + 1) *
> sqrt(b)) - 0.56e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i
> + 1) ^ 2)) * x(i + 1) * x(i) ^ 3 * x(k) ^ 2 * b ^ (0.7e1 / 0.2e1) -
> 0.212e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(i + 1) ^ 4 * b ^ (0.5e1 / 0.2e1) + 0.105e3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i + 1) * sqrt(%pi) *
> erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * b - 0.364e3 * exp(b * (x(k
> + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i) * x(i + 1) ^ 3
> * b ^ (0.5e1 / 0.2e1) + 0.48e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i +
> 1) * x(k) + x(i) ^ 2)) * x(k) * x(i + 1) ^ 3 * b ^ (0.5e1 / 0.2e1) -
> 0.48e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(k + 1) * x(i + 1) ^ 3 * b ^ (0.5e1 / 0.2e1) - 0.105e3 * b * exp(b
> * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * sqrt(%pi) *
> erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(k + 1) + 0.196e3 * b ^
> (0.5e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) +
> x(i) ^ 2)) * x(i + 1) ^ 2 * x(i) * x(k + 1) + 0.168e3 * b ^ 4 * exp(b
> * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(i) ^ 5 * x(i + 1) * sqrt(%pi) * x(k
> + 1) - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 +
> x(i + 1) ^ 2)) * x(i + 1) ^ 3 * x(i) * sqrt(%pi) * erf(x(i + 1) *
> sqrt(b) - x(k + 1) * sqrt(b)) * x(k) + 0.56e2 * b ^ (0.7e1 / 0.2e1) *
> exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i) ^
> 4 * x(k + 1) * x(k) - 0.56e2 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2
> + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 2 * x(k + 1) ^
> 3 * x(k) + 0.112e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i) *
> sqrt(%pi) * x(k) ^ 6 * b ^ 4 - 0.112e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2
> + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i + 1) ^ 6 * x(i) * sqrt(%pi) * b ^ 4 - 0.140e3 * exp(b *
> (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k) ^ 4 *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i) * sqrt(%pi) * b ^ 3 -
> 0.80e2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(k + 1) ^ 7
> * b ^ 4 - 0.252e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i
> + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) ^
> 5 * sqrt(%pi) * b ^ 3 + 0.420e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k +
> 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i)
> ^ 4 * x(i + 1) * sqrt(%pi) * b ^ 3 + 0.168e3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) -
> x(k + 1) * sqrt(b)) * x(i + 1) * x(i) * sqrt(%pi) * x(k + 1) ^ 5 * b ^
> 4 - 0.112e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^
> 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) * sqrt(%pi)
> * x(k + 1) ^ 6 * b ^ 4 - 0.80e2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k +
> 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b))
> * x(i + 1) ^ 7 * sqrt(%pi) * b ^ 4 - 0.140e3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(k + 1) ^ 4 * erf(x(i + 1)
> * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) * sqrt(%pi) * b ^ 3 - 0.112e3 *
> b ^ (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k)
> + x(i) ^ 2)) * x(i + 1) ^ 5 * x(k + 1) + 0.112e3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k +
> 1) * sqrt(b)) * x(i + 1) * sqrt(%pi) * x(k + 1) ^ 6 * b ^ 4 + 0.105e3
> * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i)
> * sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * b - 0.56e2 *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i +
> 1) * x(i) ^ 2 * x(k) ^ 3 * b ^ (0.7e1 / 0.2e1) - 0.84e2 * b ^ (0.5e1 /
> 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2))
> * x(i) ^ 3 * x(k) - 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2
> + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) ^ 5 * x(k) -
> 0.224e3 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k
> + 1) + x(i + 1) ^ 2)) * x(i + 1) * x(k) + 0.112e3 * b ^ (0.7e1 /
> 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(k + 1) ^ 5 * x(k) - 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(k) ^ 5 * x(k + 1) -
> 0.126e3 * b ^ (0.3e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) *
> x(k) + x(i + 1) ^ 2)) * x(k) * x(k + 1) - 0.112e3 * exp(b * (x(k) ^ 2
> + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k
> + 1) * sqrt(b)) * x(i) ^ 6 * x(i + 1) * sqrt(%pi) * b ^ 4 - 0.32e2 *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i +
> 1) ^ 4 * x(k) ^ 2 * b ^ (0.7e1 / 0.2e1) - 0.32e2 * exp(b * (x(k) ^ 2 +
> 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i) ^ 4 * x(k + 1) ^ 2 * b
> ^ (0.7e1 / 0.2e1) + 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) *
> x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 3 * x(k + 1) ^ 3 * b ^ (0.7e1 /
> 0.2e1) - 0.48e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i +
> 1) ^ 2)) * x(k) * x(i) ^ 3 * b ^ (0.5e1 / 0.2e1) + 0.84e2 * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(k + 1) ^ 3 *
> x(i) * b ^ (0.5e1 / 0.2e1) + 0.48e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i)
> * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) ^ 3 * x(i) * b ^ (0.5e1 /
> 0.2e1) + 0.80e2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) ^ 7 *
> sqrt(%pi) * b ^ 4 - 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) *
> x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 4 * x(i) * x(k + 1) * b ^ (0.7e1 /
> 0.2e1) + 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i +
> 1) ^ 2)) * x(i + 1) * x(i) * x(k + 1) ^ 4 * b ^ (0.7e1 / 0.2e1) -
> 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2))
> * x(i) * x(i + 1) ^ 2 * x(k + 1) ^ 3 * b ^ (0.7e1 / 0.2e1) - 0.112e3 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i
> + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(i + 1) * x(k + 1)
> ^ 6 * b ^ 4 + 0.56e2 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1
> * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i) ^ 2 * x(k + 1) ^ 3 * x(k) -
> 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k
> + 1) + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 3 * x(k + 1) * x(k) -
> 0.112e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) *
> x(k + 1) ^ 6 * x(k) - 0.140e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i + 1) ^ 4 * sqrt(%pi) * x(k + 1) + 0.56e2 * b ^ (0.7e1 /
> 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2))
> * x(i + 1) ^ 2 * x(k) ^ 3 * x(k + 1) + 0.56e2 * b ^ (0.5e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) *
> x(k) ^ 2 * x(k + 1) - 0.196e3 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 2 *
> x(k + 1) - 0.112e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^
> 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i +
> 1) ^ 6 * sqrt(%pi) * x(k) - 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i)
> * x(k + 1) + x(i + 1) ^ 2)) * x(k + 1) ^ 2 * x(i + 1) * x(i) * b ^
> (0.5e1 / 0.2e1) + 0.112e3 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k
> + 1) + x(i) ^ 2)) * x(i) * x(k + 1) ^ 5 * b ^ (0.7e1 / 0.2e1) +
> 0.112e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) * sqrt(%pi) * x(k
> + 1) ^ 6 * x(k) + 0.56e2 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2
> + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) * x(k) ^ 4 * x(k +
> 1) + 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 +
> x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) *
> sqrt(%pi) * x(k) ^ 5 * x(k + 1) + 0.112e3 * b ^ (0.7e1 / 0.2e1) *
> exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i +
> 1) * x(i) * x(k) ^ 3 * x(k + 1) - 0.210e3 * x(k + 1) * x(k) * b ^ 2 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * x(i) *
> sqrt(%pi) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) - 0.168e3 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i
> + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) * x(i) * sqrt(%pi) * x(k)
> ^ 5 * b ^ 4 + 0.32e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) +
> x(i + 1) ^ 2)) * x(i) ^ 3 * x(k) ^ 3 * b ^ (0.7e1 / 0.2e1) - 0.56e2 *
> b ^ (0.5e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) +
> x(i + 1) ^ 2)) * x(i) * x(k + 1) ^ 2 * x(k) - 0.280e3 * b ^ 4 * exp(b
> * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) *
> sqrt(b) - x(k) * sqrt(b)) * x(i + 1) * x(i) * sqrt(%pi) * x(k) ^ 4 *
> x(k + 1) - 0.168e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i) ^ 4 * x(i + 1) * x(k + 1)
> - 0.112e3 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^
> 2)) * x(i) * x(k) ^ 5 * b ^ (0.7e1 / 0.2e1) - 0.112e3 * exp(b * (x(k)
> ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 5 *
> b ^ (0.7e1 / 0.2e1) - 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k
> + 1) + x(i + 1) ^ 2)) * x(i) * x(k + 1) ^ 5 * b ^ (0.7e1 / 0.2e1) -
> 0.32e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2))
> * x(i + 1) ^ 2 * x(k) ^ 4 * b ^ (0.7e1 / 0.2e1) + 0.56e2 * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i + 1) * x(i)
> ^ 2 * x(k + 1) ^ 3 * b ^ (0.7e1 / 0.2e1) + 0.80e2 * exp(b * (x(k + 1)
> ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 6 * b ^ (0.7e1
> / 0.2e1) + 0.56e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) * x(k + 1) + x(i
> + 1) ^ 2)) * x(i + 1) * x(i) ^ 4 * x(k + 1) * b ^ (0.7e1 / 0.2e1) +
> 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i) *
> sqrt(%pi) * x(k + 1) ^ 3 * x(k) - 0.80e2 * exp(b * (x(k) ^ 2 + x(i) ^
> 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * sqrt(%pi) * x(k) ^ 7 * b ^ 4 + 0.168e3 * b ^ (0.5e1 /
> 0.2e1) * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2))
> * x(i + 1) * x(i) * x(k) * x(k + 1) - 0.168e3 * b ^ (0.5e1 / 0.2e1) *
> exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i +
> 1) * x(i) * x(k + 1) * x(k) + 0.168e3 * b ^ (0.7e1 / 0.2e1) * exp(b *
> (x(k + 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i) * x(k) ^ 4
> * x(k + 1) - 0.56e2 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k + 1) ^ 2 +
> 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 2 * x(k) * x(k + 1)
> - 0.112e3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^
> 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * sqrt(%pi) * x(i) * x(k) ^
> 6 * b ^ 4 - 0.196e3 * b ^ (0.5e1 / 0.2e1) * exp(b * (x(k) ^ 2 + 0.2e1
> * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) ^ 2 * x(i) * x(k) +
> 0.140e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i +
> 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) ^ 4
> * sqrt(%pi) * x(k) + 0.168e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i + 1) ^ 5 * x(i) * sqrt(%pi) * x(k) + 0.168e3 * b ^ 4 *
> exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i) * sqrt(b) - x(k) * sqrt(b)) * x(i) * sqrt(%pi) * x(k) ^ 5 *
> x(k + 1) - 0.140e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^
> 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k + 1) * sqrt(b)) *
> sqrt(%pi) * x(i) ^ 4 * x(k) + 0.80e2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) * sqrt(b)) *
> sqrt(%pi) * x(k) ^ 7 * b ^ 4 + 0.80e2 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i + 1) ^ 7 * sqrt(%pi) * b ^ 4 - 0.32e2 * exp(b * (x(k) ^
> 2 + 0.2e1 * x(i) * x(k + 1) + x(i + 1) ^ 2)) * x(i) ^ 2 * x(k + 1) ^ 4
> * b ^ (0.7e1 / 0.2e1) - 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i) *
> x(k + 1) + x(i + 1) ^ 2)) * x(i) ^ 3 * x(k + 1) ^ 3 * b ^ (0.7e1 /
> 0.2e1) + 0.32e2 * exp(b * (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) +
> x(i) ^ 2)) * x(i + 1) ^ 4 * x(k + 1) ^ 2 * b ^ (0.7e1 / 0.2e1) +
> 0.32e2 * exp(b * (x(k + 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2))
> * x(i) ^ 2 * x(k) ^ 4 * b ^ (0.7e1 / 0.2e1) + 0.56e2 * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i + 1) * x(k) + x(i) ^ 2)) * x(i + 1) ^ 2 * x(i) *
> x(k) ^ 3 * b ^ (0.7e1 / 0.2e1) + 0.112e3 * exp(b * (x(k) ^ 2 + x(i) ^
> 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k) *
> sqrt(b)) * x(i) ^ 6 * x(i + 1) * sqrt(%pi) * b ^ 4 - 0.56e2 * exp(b *
> (x(k) ^ 2 + 0.2e1 * x(i + 1) * x(k + 1) + x(i) ^ 2)) * x(i + 1) * x(i)
> * x(k + 1) ^ 4 * b ^ (0.7e1 / 0.2e1) + 0.112e3 * exp(b * (x(k) ^ 2 +
> x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i) * sqrt(b) - x(k +
> 1) * sqrt(b)) * sqrt(%pi) * x(i) * x(k + 1) ^ 6 * b ^ 4 + 0.112e3 * b
> ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2)) *
> erf(x(i + 1) * sqrt(b) - x(k + 1) * sqrt(b)) * x(i + 1) ^ 6 *
> sqrt(%pi) * x(k + 1) + 0.112e3 * b ^ (0.7e1 / 0.2e1) * exp(b * (x(k +
> 1) ^ 2 + 0.2e1 * x(i) * x(k) + x(i + 1) ^ 2)) * x(i + 1) * x(i) ^ 2 *
> x(k) ^ 2 * x(k + 1) + 0.280e3 * b ^ 4 * exp(b * (x(k) ^ 2 + x(i) ^ 2 +
> x(k + 1) ^ 2 + x(i + 1) ^ 2)) * erf(x(i + 1) * sqrt(b) - x(k) *
> sqrt(b)) * x(i + 1) * x(i) * sqrt(%pi) * x(k) ^ 4 * x(k + 1) - 0.140e3
> * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2 + x(i + 1) ^ 2))
> * erf(x(i + 1) * sqrt(b) - x(k) * sqrt(b)) * x(i + 1) ^ 4 * sqrt(%pi)
> * x(k) - 0.280e3 * b ^ 3 * exp(b * (x(k) ^ 2 + x(i) ^ 2 + x(k + 1) ^ 2
> + x(i + 1) ^ 2)) * x(i) ^ 3 * x(i + 1) * sqrt(%pi) * erf(x(i) *
> sqrt(b) - x(k) * sqrt(b)) * x(k + 1)) * b ^ (-0.9e1 / 0.2e1) / (x(i +
> 1) ^ 2 * x(k + 1) ^ 2 - 0.2e1 * x(i + 1) ^ 2 * x(k + 1) * x(k) + x(i +
> 1) ^ 2 * x(k) ^ 2 - 0.2e1 * x(i + 1) * x(k + 1) ^ 2 * x(i) + 0.4e1 *
> x(i + 1) * x(i) * x(k + 1) * x(k) - 0.2e1 * x(i + 1) * x(i) * x(k) ^ 2
> + x(i) ^ 2 * x(k + 1) ^ 2 - 0.2e1 * x(i) ^ 2 * x(k + 1) * x(k) + x(i)
> ^ 2 * x(k) ^ 2) / 0.6720e4;
>
> 2011/10/3 Mike Page <Mike at page-one.waitrose.com
> <mailto:Mike at page-one.waitrose.com>>
>
> Can you post some code that shows the problem?
> Sounds like maybe you are creating a string instead of a numeric
> matrix.
> Regards,
> Mike.
>
> -----Original Message-----
> *From:* severine.pl <http://severine.pl>
> [mailto:severine.pl at gmail.com <mailto:severine.pl at gmail.com>]
> *Sent:* 03 October 2011 14:10
> *To:* users at lists.scilab.org <mailto:users at lists.scilab.org>
> *Subject:* [scilab-Users] too large string
>
> Hi!
>
> I woulf like to find an answer to my problem.
>
> I'm doing very big calculus in scilab, and calculating very
> big matrix.
> And when i'm trying to executing the programm, Scilab says me:
>
> "Too large string"
>
> What must I do?
>
> Séverine Paul
>
> ------------------------------------------------------------------------
> View this message in context: too large string
> <http://mailinglists.scilab.org/too-large-string-tp3389713p3389713.html>
> Sent from the Scilab users - Mailing Lists Archives mailing
> list archive
> <http://mailinglists.scilab.org/Scilab-users-Mailing-Lists-Archives-f2602246.html>
> at Nabble.com.
>
>
-------------- next part --------------
An HTML attachment was scrubbed...
URL: <https://lists.scilab.org/pipermail/users/attachments/20111003/ebed2c5c/attachment.htm>
More information about the users
mailing list