Average Error: 58.1 → 63.6
Time: 31.4s
Precision: 64
\[\left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) + 5.5 \cdot {33096}^{8}\right) + \frac{77617}{2 \cdot 33096}\]
\[\frac{77617}{66192} + \frac{{\left(e^{\sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)} \cdot \sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)}}\right)}^{\left(\sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)}\right)}}{\left(-7917111779274712207494296632228773890 + \left(\left(333.75 \cdot 1314174534371215466459037696\right)\right)\right) - 5.5 \cdot 1439474789212538429291115400277262336}\]
\left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) + 5.5 \cdot {33096}^{8}\right) + \frac{77617}{2 \cdot 33096}
\frac{77617}{66192} + \frac{{\left(e^{\sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)} \cdot \sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)}}\right)}^{\left(\sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)}\right)}}{\left(-7917111779274712207494296632228773890 + \left(\left(333.75 \cdot 1314174534371215466459037696\right)\right)\right) - 5.5 \cdot 1439474789212538429291115400277262336}
double f() {
        double r2509664 = 333.75;
        double r2509665 = 33096.0;
        double r2509666 = 6.0;
        double r2509667 = pow(r2509665, r2509666);
        double r2509668 = r2509664 * r2509667;
        double r2509669 = 77617.0;
        double r2509670 = r2509669 * r2509669;
        double r2509671 = 11.0;
        double r2509672 = r2509671 * r2509670;
        double r2509673 = r2509665 * r2509665;
        double r2509674 = r2509672 * r2509673;
        double r2509675 = -r2509667;
        double r2509676 = r2509674 + r2509675;
        double r2509677 = -121.0;
        double r2509678 = 4.0;
        double r2509679 = pow(r2509665, r2509678);
        double r2509680 = r2509677 * r2509679;
        double r2509681 = r2509676 + r2509680;
        double r2509682 = -2.0;
        double r2509683 = r2509681 + r2509682;
        double r2509684 = r2509670 * r2509683;
        double r2509685 = r2509668 + r2509684;
        double r2509686 = 5.5;
        double r2509687 = 8.0;
        double r2509688 = pow(r2509665, r2509687);
        double r2509689 = r2509686 * r2509688;
        double r2509690 = r2509685 + r2509689;
        double r2509691 = 2.0;
        double r2509692 = r2509691 * r2509665;
        double r2509693 = r2509669 / r2509692;
        double r2509694 = r2509690 + r2509693;
        return r2509694;
}


double f() {
        double r2509695 = 1.1726039400531787;
        double r2509696 = 333.75;
        double r2509697 = 1.3141745343712155e+27;
        double r2509698 = r2509696 * r2509697;
        double r2509699 = -7.917111779274712e+36;
        double r2509700 = r2509698 + r2509699;
        double r2509701 = r2509700 * r2509700;
        double r2509702 = 5.5;
        double r2509703 = 1.4394747892125385e+36;
        double r2509704 = r2509702 * r2509703;
        double r2509705 = r2509704 * r2509704;
        double r2509706 = r2509701 - r2509705;
        double r2509707 = log(r2509706);
        double r2509708 = cbrt(r2509707);
        double r2509709 = r2509708 * r2509708;
        double r2509710 = exp(r2509709);
        double r2509711 = pow(r2509710, r2509708);
        double r2509712 = /* ERROR: no posit support in C */;
        double r2509713 = /* ERROR: no posit support in C */;
        double r2509714 = r2509699 + r2509713;
        double r2509715 = r2509714 - r2509704;
        double r2509716 = r2509711 / r2509715;
        double r2509717 = r2509695 + r2509716;
        return r2509717;
}

Error

Derivation

  1. Initial program 58.1

    \[\left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) + 5.5 \cdot {33096}^{8}\right) + \frac{77617}{2 \cdot 33096}\]
  2. Using strategy rm

  3. Applied flip-+58.1

    \[\leadsto \color{blue}{\frac{\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)}{\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - 5.5 \cdot {33096}^{8}}} + \frac{77617}{2 \cdot 33096}\]
  4. Using strategy rm

  5. Applied add-exp-log58.1

    \[\leadsto \frac{\color{blue}{e^{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)}}}{\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - 5.5 \cdot {33096}^{8}} + \frac{77617}{2 \cdot 33096}\]
  6. Using strategy rm

  7. Applied insert-posit1658.1

    \[\leadsto \frac{e^{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)}}{\left(\color{blue}{\left(\left(333.75 \cdot {33096}^{6}\right)\right)} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - 5.5 \cdot {33096}^{8}} + \frac{77617}{2 \cdot 33096}\]
  8. Using strategy rm

  9. Applied add-cube-cbrt58.1

    \[\leadsto \frac{e^{\color{blue}{\left(\sqrt[3]{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)} \cdot \sqrt[3]{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)}\right) \cdot \sqrt[3]{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)}}}}{\left(\left(\left(333.75 \cdot {33096}^{6}\right)\right) + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - 5.5 \cdot {33096}^{8}} + \frac{77617}{2 \cdot 33096}\]

  10. Applied exp-prod58.1

    \[\leadsto \frac{\color{blue}{{\left(e^{\sqrt[3]{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)} \cdot \sqrt[3]{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)}}\right)}^{\left(\sqrt[3]{\log \left(\left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) \cdot \left(333.75 \cdot {33096}^{6} + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - \left(5.5 \cdot {33096}^{8}\right) \cdot \left(5.5 \cdot {33096}^{8}\right)\right)}\right)}}}{\left(\left(\left(333.75 \cdot {33096}^{6}\right)\right) + \left(77617 \cdot 77617\right) \cdot \left(\left(\left(\left(11 \cdot \left(77617 \cdot 77617\right)\right) \cdot \left(33096 \cdot 33096\right) + \left(-{33096}^{6}\right)\right) + -121 \cdot {33096}^{4}\right) + -2\right)\right) - 5.5 \cdot {33096}^{8}} + \frac{77617}{2 \cdot 33096}\]

  11. Final simplification63.6

    \[\leadsto \frac{77617}{66192} + \frac{{\left(e^{\sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)} \cdot \sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)}}\right)}^{\left(\sqrt[3]{\log \left(\left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) \cdot \left(333.75 \cdot 1314174534371215466459037696 + -7917111779274712207494296632228773890\right) - \left(5.5 \cdot 1439474789212538429291115400277262336\right) \cdot \left(5.5 \cdot 1439474789212538429291115400277262336\right)\right)}\right)}}{\left(-7917111779274712207494296632228773890 + \left(\left(333.75 \cdot 1314174534371215466459037696\right)\right)\right) - 5.5 \cdot 1439474789212538429291115400277262336}\]

Reproduce

herbie shell --seed 2019163 +o rules:numerics
(FPCore ()
  :name "From Warwick Tucker's Validated Numerics"
  (+ (+ (+ (* 333.75 (pow 33096 6)) (* (* 77617 77617) (+ (+ (+ (* (* 11 (* 77617 77617)) (* 33096 33096)) (- (pow 33096 6))) (* -121 (pow 33096 4))) -2))) (* 5.5 (pow 33096 8))) (/ 77617 (* 2 33096))))