\[x + \frac{y \cdot \left(\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b\right)}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\]

↓

\[\begin{array}{l} \mathbf{if}\;z \le -6950737723665705984 \lor \neg \left(z \le 6253852677484612051424772096\right):\\ \;\;\;\;x + y \cdot \left(\left(\frac{t}{{z}^{2}} + 3.130605476229999961645944495103321969509\right) - \frac{36.52704169880641416057187598198652267456}{z}\right)\\ \mathbf{else}:\\ \;\;\;\;x + y \cdot \frac{\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\\ \end{array}\]

x + \frac{y \cdot \left(\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b\right)}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}

↓

\begin{array}{l}
\mathbf{if}\;z \le -6950737723665705984 \lor \neg \left(z \le 6253852677484612051424772096\right):\\
\;\;\;\;x + y \cdot \left(\left(\frac{t}{{z}^{2}} + 3.130605476229999961645944495103321969509\right) - \frac{36.52704169880641416057187598198652267456}{z}\right)\\

\mathbf{else}:\\
\;\;\;\;x + y \cdot \frac{\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\\

\end{array}

double f(double x, double y, double z, double t, double a, double b) {
        double r273208 = x;
        double r273209 = y;
        double r273210 = z;
        double r273211 = 3.13060547623;
        double r273212 = r273210 * r273211;
        double r273213 = 11.1667541262;
        double r273214 = r273212 + r273213;
        double r273215 = r273214 * r273210;
        double r273216 = t;
        double r273217 = r273215 + r273216;
        double r273218 = r273217 * r273210;
        double r273219 = a;
        double r273220 = r273218 + r273219;
        double r273221 = r273220 * r273210;
        double r273222 = b;
        double r273223 = r273221 + r273222;
        double r273224 = r273209 * r273223;
        double r273225 = 15.234687407;
        double r273226 = r273210 + r273225;
        double r273227 = r273226 * r273210;
        double r273228 = 31.4690115749;
        double r273229 = r273227 + r273228;
        double r273230 = r273229 * r273210;
        double r273231 = 11.9400905721;
        double r273232 = r273230 + r273231;
        double r273233 = r273232 * r273210;
        double r273234 = 0.607771387771;
        double r273235 = r273233 + r273234;
        double r273236 = r273224 / r273235;
        double r273237 = r273208 + r273236;
        return r273237;
}

↓

double f(double x, double y, double z, double t, double a, double b) {
        double r273238 = z;
        double r273239 = -6.950737723665706e+18;
        bool r273240 = r273238 <= r273239;
        double r273241 = 6.253852677484612e+27;
        bool r273242 = r273238 <= r273241;
        double r273243 = !r273242;
        bool r273244 = r273240 || r273243;
        double r273245 = x;
        double r273246 = y;
        double r273247 = t;
        double r273248 = 2.0;
        double r273249 = pow(r273238, r273248);
        double r273250 = r273247 / r273249;
        double r273251 = 3.13060547623;
        double r273252 = r273250 + r273251;
        double r273253 = 36.527041698806414;
        double r273254 = r273253 / r273238;
        double r273255 = r273252 - r273254;
        double r273256 = r273246 * r273255;
        double r273257 = r273245 + r273256;
        double r273258 = r273238 * r273251;
        double r273259 = 11.1667541262;
        double r273260 = r273258 + r273259;
        double r273261 = r273260 * r273238;
        double r273262 = r273261 + r273247;
        double r273263 = r273262 * r273238;
        double r273264 = a;
        double r273265 = r273263 + r273264;
        double r273266 = r273265 * r273238;
        double r273267 = b;
        double r273268 = r273266 + r273267;
        double r273269 = 15.234687407;
        double r273270 = r273238 + r273269;
        double r273271 = r273270 * r273238;
        double r273272 = 31.4690115749;
        double r273273 = r273271 + r273272;
        double r273274 = r273273 * r273238;
        double r273275 = 11.9400905721;
        double r273276 = r273274 + r273275;
        double r273277 = r273276 * r273238;
        double r273278 = 0.607771387771;
        double r273279 = r273277 + r273278;
        double r273280 = r273268 / r273279;
        double r273281 = r273246 * r273280;
        double r273282 = r273245 + r273281;
        double r273283 = r273244 ? r273257 : r273282;
        return r273283;
}

Original	29.4
Target	1.0
Herbie	1.1

Derivation

Split input into 2 regimes
if z < -6.950737723665706e+18 or 6.253852677484612e+27 < z
1. Initial program 58.2
  \[x + \frac{y \cdot \left(\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b\right)}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\]
2. Using strategy rm
3. Applied *-un-lft-identity58.2
  \[\leadsto x + \frac{y \cdot \left(\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b\right)}{\color{blue}{1 \cdot \left(\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227\right)}}\]
4. Applied times-frac55.5
  \[\leadsto x + \color{blue}{\frac{y}{1} \cdot \frac{\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}}\]
5. Simplified55.5
  \[\leadsto x + \color{blue}{y} \cdot \frac{\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\]
6. Taylor expanded around inf 1.9
  \[\leadsto x + y \cdot \color{blue}{\left(\left(\frac{t}{{z}^{2}} + 3.130605476229999961645944495103321969509\right) - 36.52704169880641416057187598198652267456 \cdot \frac{1}{z}\right)}\]
7. Simplified1.9
  \[\leadsto x + y \cdot \color{blue}{\left(\left(\frac{t}{{z}^{2}} + 3.130605476229999961645944495103321969509\right) - \frac{36.52704169880641416057187598198652267456}{z}\right)}\]
if -6.950737723665706e+18 < z < 6.253852677484612e+27
1. Initial program 0.8
  \[x + \frac{y \cdot \left(\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b\right)}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\]
2. Using strategy rm
3. Applied *-un-lft-identity0.8
  \[\leadsto x + \frac{y \cdot \left(\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b\right)}{\color{blue}{1 \cdot \left(\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227\right)}}\]
4. Applied times-frac0.4
  \[\leadsto x + \color{blue}{\frac{y}{1} \cdot \frac{\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}}\]
5. Simplified0.4
  \[\leadsto x + \color{blue}{y} \cdot \frac{\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\]
Recombined 2 regimes into one program.
Final simplification1.1
\[\leadsto \begin{array}{l} \mathbf{if}\;z \le -6950737723665705984 \lor \neg \left(z \le 6253852677484612051424772096\right):\\ \;\;\;\;x + y \cdot \left(\left(\frac{t}{{z}^{2}} + 3.130605476229999961645944495103321969509\right) - \frac{36.52704169880641416057187598198652267456}{z}\right)\\ \mathbf{else}:\\ \;\;\;\;x + y \cdot \frac{\left(\left(\left(z \cdot 3.130605476229999961645944495103321969509 + 11.16675412620000074070958362426608800888\right) \cdot z + t\right) \cdot z + a\right) \cdot z + b}{\left(\left(\left(z + 15.2346874069999991263557603815570473671\right) \cdot z + 31.46901157490000144889563671313226222992\right) \cdot z + 11.94009057210000079862766142468899488449\right) \cdot z + 0.6077713877710000378584709324059076607227}\\ \end{array}\]

Error

Try it out

Target

Derivation

`if z < -6.950737723665706e+18 or 6.253852677484612e+27 < z`

`if -6.950737723665706e+18 < z < 6.253852677484612e+27`

Reproduce

In
Out