\left(\left(\left(\left(\left(x \cdot y - z \cdot t\right) \cdot \left(a \cdot b - c \cdot i\right) - \left(x \cdot j - z \cdot k\right) \cdot \left(y0 \cdot b - y1 \cdot i\right)\right) + \left(x \cdot y2 - z \cdot y3\right) \cdot \left(y0 \cdot c - y1 \cdot a\right)\right) + \left(t \cdot j - y \cdot k\right) \cdot \left(y4 \cdot b - y5 \cdot i\right)\right) - \left(t \cdot y2 - y \cdot y3\right) \cdot \left(y4 \cdot c - y5 \cdot a\right)\right) + \left(k \cdot y2 - j \cdot y3\right) \cdot \left(y4 \cdot y1 - y5 \cdot y0\right)
\begin{array}{l}
\mathbf{if}\;y0 \le -45934632227187393514277965708495159296:\\
\;\;\;\;\left(\left(\left(\left(\left(x \cdot y - z \cdot t\right) \cdot \left(a \cdot b - c \cdot i\right) - \left(x \cdot j - z \cdot k\right) \cdot \left(y0 \cdot b - y1 \cdot i\right)\right) + \left(\sqrt[3]{\left(x \cdot y2 - z \cdot y3\right) \cdot \left(y0 \cdot c - y1 \cdot a\right)} \cdot \sqrt[3]{\left(x \cdot y2 - z \cdot y3\right) \cdot \left(y0 \cdot c - y1 \cdot a\right)}\right) \cdot \sqrt[3]{\left(x \cdot y2 - z \cdot y3\right) \cdot \left(y0 \cdot c - y1 \cdot a\right)}\right) + \left(t \cdot j - y \cdot k\right) \cdot \left(y4 \cdot b - y5 \cdot i\right)\right) - \left(t \cdot y2 - y \cdot y3\right) \cdot \left(y4 \cdot c - y5 \cdot a\right)\right) + \left(y0 \cdot \left(y3 \cdot \left(j \cdot y5\right) - y2 \cdot \left(k \cdot y5\right)\right) - y1 \cdot \left(y3 \cdot \left(j \cdot y4\right)\right)\right)\\
\mathbf{elif}\;y0 \le -5.002975753531874998386914109954505586025 \cdot 10^{-285}:\\
\;\;\;\;\left(\left(\left(\left(\left(x \cdot y - z \cdot t\right) \cdot \left(a \cdot b - c \cdot i\right) - \left(x \cdot j - z \cdot k\right) \cdot \left(y0 \cdot b - y1 \cdot i\right)\right) + \left(x \cdot y2 - z \cdot y3\right) \cdot \left(y0 \cdot c - y1 \cdot a\right)\right) + \left(k \cdot \left(i \cdot \left(y \cdot y5\right)\right) - \left(t \cdot \left(i \cdot \left(j \cdot y5\right)\right) + k \cdot \left(y4 \cdot \left(y \cdot b\right)\right)\right)\right)\right) - \left(t \cdot y2 - y \cdot y3\right) \cdot \left(y4 \cdot c - y5 \cdot a\right)\right) + \left(k \cdot y2 - j \cdot y3\right) \cdot \left(y4 \cdot y1 - y5 \cdot y0\right)\\
\mathbf{elif}\;y0 \le 2702305498117941905514113658454529550582000:\\
\;\;\;\;\left(\left(\left(\left(\left(x \cdot y - z \cdot t\right) \cdot \left(a \cdot b - c \cdot i\right) - \left(x \cdot j - z \cdot k\right) \cdot \left(y0 \cdot b - y1 \cdot i\right)\right) + \left(\left(x \cdot y2 - z \cdot y3\right) \cdot \left(\sqrt[3]{y0 \cdot c - y1 \cdot a} \cdot \sqrt[3]{y0 \cdot c - y1 \cdot a}\right)\right) \cdot \sqrt[3]{y0 \cdot c - y1 \cdot a}\right) + \left(t \cdot j - y \cdot k\right) \cdot \left(y4 \cdot b - y5 \cdot i\right)\right) - \left(t \cdot y2 - y \cdot y3\right) \cdot \left(y4 \cdot c - y5 \cdot a\right)\right) + \left(k \cdot y2 - j \cdot y3\right) \cdot \left(y4 \cdot y1 - y5 \cdot y0\right)\\
\mathbf{else}:\\
\;\;\;\;\left(\left(\left(\left(\left(x \cdot y - z \cdot t\right) \cdot \left(a \cdot b - c \cdot i\right) - \left(k \cdot \left(i \cdot \left(z \cdot y1\right)\right) - \left(i \cdot \left(j \cdot \left(y1 \cdot x\right)\right) + y0 \cdot \left(z \cdot \left(k \cdot b\right)\right)\right)\right)\right) + \left(x \cdot y2 - z \cdot y3\right) \cdot \left(y0 \cdot c - y1 \cdot a\right)\right) + \left(t \cdot j - y \cdot k\right) \cdot \left(y4 \cdot b - y5 \cdot i\right)\right) - \left(t \cdot y2 - y \cdot y3\right) \cdot \left(y4 \cdot c - y5 \cdot a\right)\right) + \left(k \cdot y2 - j \cdot y3\right) \cdot \left(y4 \cdot y1 - y5 \cdot y0\right)\\
\end{array}double f(double x, double y, double z, double t, double a, double b, double c, double i, double j, double k, double y0, double y1, double y2, double y3, double y4, double y5) {
double r353065 = x;
double r353066 = y;
double r353067 = r353065 * r353066;
double r353068 = z;
double r353069 = t;
double r353070 = r353068 * r353069;
double r353071 = r353067 - r353070;
double r353072 = a;
double r353073 = b;
double r353074 = r353072 * r353073;
double r353075 = c;
double r353076 = i;
double r353077 = r353075 * r353076;
double r353078 = r353074 - r353077;
double r353079 = r353071 * r353078;
double r353080 = j;
double r353081 = r353065 * r353080;
double r353082 = k;
double r353083 = r353068 * r353082;
double r353084 = r353081 - r353083;
double r353085 = y0;
double r353086 = r353085 * r353073;
double r353087 = y1;
double r353088 = r353087 * r353076;
double r353089 = r353086 - r353088;
double r353090 = r353084 * r353089;
double r353091 = r353079 - r353090;
double r353092 = y2;
double r353093 = r353065 * r353092;
double r353094 = y3;
double r353095 = r353068 * r353094;
double r353096 = r353093 - r353095;
double r353097 = r353085 * r353075;
double r353098 = r353087 * r353072;
double r353099 = r353097 - r353098;
double r353100 = r353096 * r353099;
double r353101 = r353091 + r353100;
double r353102 = r353069 * r353080;
double r353103 = r353066 * r353082;
double r353104 = r353102 - r353103;
double r353105 = y4;
double r353106 = r353105 * r353073;
double r353107 = y5;
double r353108 = r353107 * r353076;
double r353109 = r353106 - r353108;
double r353110 = r353104 * r353109;
double r353111 = r353101 + r353110;
double r353112 = r353069 * r353092;
double r353113 = r353066 * r353094;
double r353114 = r353112 - r353113;
double r353115 = r353105 * r353075;
double r353116 = r353107 * r353072;
double r353117 = r353115 - r353116;
double r353118 = r353114 * r353117;
double r353119 = r353111 - r353118;
double r353120 = r353082 * r353092;
double r353121 = r353080 * r353094;
double r353122 = r353120 - r353121;
double r353123 = r353105 * r353087;
double r353124 = r353107 * r353085;
double r353125 = r353123 - r353124;
double r353126 = r353122 * r353125;
double r353127 = r353119 + r353126;
return r353127;
}
double f(double x, double y, double z, double t, double a, double b, double c, double i, double j, double k, double y0, double y1, double y2, double y3, double y4, double y5) {
double r353128 = y0;
double r353129 = -4.593463222718739e+37;
bool r353130 = r353128 <= r353129;
double r353131 = x;
double r353132 = y;
double r353133 = r353131 * r353132;
double r353134 = z;
double r353135 = t;
double r353136 = r353134 * r353135;
double r353137 = r353133 - r353136;
double r353138 = a;
double r353139 = b;
double r353140 = r353138 * r353139;
double r353141 = c;
double r353142 = i;
double r353143 = r353141 * r353142;
double r353144 = r353140 - r353143;
double r353145 = r353137 * r353144;
double r353146 = j;
double r353147 = r353131 * r353146;
double r353148 = k;
double r353149 = r353134 * r353148;
double r353150 = r353147 - r353149;
double r353151 = r353128 * r353139;
double r353152 = y1;
double r353153 = r353152 * r353142;
double r353154 = r353151 - r353153;
double r353155 = r353150 * r353154;
double r353156 = r353145 - r353155;
double r353157 = y2;
double r353158 = r353131 * r353157;
double r353159 = y3;
double r353160 = r353134 * r353159;
double r353161 = r353158 - r353160;
double r353162 = r353128 * r353141;
double r353163 = r353152 * r353138;
double r353164 = r353162 - r353163;
double r353165 = r353161 * r353164;
double r353166 = cbrt(r353165);
double r353167 = r353166 * r353166;
double r353168 = r353167 * r353166;
double r353169 = r353156 + r353168;
double r353170 = r353135 * r353146;
double r353171 = r353132 * r353148;
double r353172 = r353170 - r353171;
double r353173 = y4;
double r353174 = r353173 * r353139;
double r353175 = y5;
double r353176 = r353175 * r353142;
double r353177 = r353174 - r353176;
double r353178 = r353172 * r353177;
double r353179 = r353169 + r353178;
double r353180 = r353135 * r353157;
double r353181 = r353132 * r353159;
double r353182 = r353180 - r353181;
double r353183 = r353173 * r353141;
double r353184 = r353175 * r353138;
double r353185 = r353183 - r353184;
double r353186 = r353182 * r353185;
double r353187 = r353179 - r353186;
double r353188 = r353146 * r353175;
double r353189 = r353159 * r353188;
double r353190 = r353148 * r353175;
double r353191 = r353157 * r353190;
double r353192 = r353189 - r353191;
double r353193 = r353128 * r353192;
double r353194 = r353146 * r353173;
double r353195 = r353159 * r353194;
double r353196 = r353152 * r353195;
double r353197 = r353193 - r353196;
double r353198 = r353187 + r353197;
double r353199 = -5.002975753531875e-285;
bool r353200 = r353128 <= r353199;
double r353201 = r353156 + r353165;
double r353202 = r353132 * r353175;
double r353203 = r353142 * r353202;
double r353204 = r353148 * r353203;
double r353205 = r353142 * r353188;
double r353206 = r353135 * r353205;
double r353207 = r353132 * r353139;
double r353208 = r353173 * r353207;
double r353209 = r353148 * r353208;
double r353210 = r353206 + r353209;
double r353211 = r353204 - r353210;
double r353212 = r353201 + r353211;
double r353213 = r353212 - r353186;
double r353214 = r353148 * r353157;
double r353215 = r353146 * r353159;
double r353216 = r353214 - r353215;
double r353217 = r353173 * r353152;
double r353218 = r353175 * r353128;
double r353219 = r353217 - r353218;
double r353220 = r353216 * r353219;
double r353221 = r353213 + r353220;
double r353222 = 2.702305498117942e+42;
bool r353223 = r353128 <= r353222;
double r353224 = cbrt(r353164);
double r353225 = r353224 * r353224;
double r353226 = r353161 * r353225;
double r353227 = r353226 * r353224;
double r353228 = r353156 + r353227;
double r353229 = r353228 + r353178;
double r353230 = r353229 - r353186;
double r353231 = r353230 + r353220;
double r353232 = r353134 * r353152;
double r353233 = r353142 * r353232;
double r353234 = r353148 * r353233;
double r353235 = r353152 * r353131;
double r353236 = r353146 * r353235;
double r353237 = r353142 * r353236;
double r353238 = r353148 * r353139;
double r353239 = r353134 * r353238;
double r353240 = r353128 * r353239;
double r353241 = r353237 + r353240;
double r353242 = r353234 - r353241;
double r353243 = r353145 - r353242;
double r353244 = r353243 + r353165;
double r353245 = r353244 + r353178;
double r353246 = r353245 - r353186;
double r353247 = r353246 + r353220;
double r353248 = r353223 ? r353231 : r353247;
double r353249 = r353200 ? r353221 : r353248;
double r353250 = r353130 ? r353198 : r353249;
return r353250;
}
Bits error versus x
Bits error versus y
Bits error versus z
Bits error versus t
Bits error versus a
Bits error versus b
Bits error versus c
Bits error versus i
Bits error versus j
Bits error versus k
Bits error versus y0
Bits error versus y1
Bits error versus y2
Bits error versus y3
Bits error versus y4
Bits error versus y5
Results
| Original | 27.2 |
|---|---|
| Target | 30.7 |
| Herbie | 28.4 |
if y0 < -4.593463222718739e+37Initial program 28.5
rmApplied add-cube-cbrt28.6
Taylor expanded around inf 27.6
Simplified27.6
if -4.593463222718739e+37 < y0 < -5.002975753531875e-285Initial program 26.7
Taylor expanded around inf 29.6
if -5.002975753531875e-285 < y0 < 2.702305498117942e+42Initial program 26.3
rmApplied add-cube-cbrt26.3
Applied associate-*r*26.3
if 2.702305498117942e+42 < y0 Initial program 29.9
Taylor expanded around inf 32.2
Final simplification28.4
herbie shell --seed 2019325
(FPCore (x y z t a b c i j k y0 y1 y2 y3 y4 y5)
:name "Linear.Matrix:det44 from linear-1.19.1.3"
:precision binary64
:herbie-target
(if (< y4 -7.206256231996481e+60) (- (- (* (- (* b a) (* i c)) (- (* y x) (* t z))) (- (* (- (* j x) (* k z)) (- (* y0 b) (* i y1))) (* (- (* j t) (* k y)) (- (* y4 b) (* y5 i))))) (- (/ (- (* y2 t) (* y3 y)) (/ 1 (- (* y4 c) (* y5 a)))) (* (- (* y2 k) (* y3 j)) (- (* y4 y1) (* y5 y0))))) (if (< y4 -3.364603505246317e-66) (+ (- (- (- (* (* t c) (* i z)) (* (* a t) (* b z))) (* (* y c) (* i x))) (* (- (* b y0) (* i y1)) (- (* j x) (* k z)))) (- (* (- (* y0 c) (* a y1)) (- (* x y2) (* z y3))) (- (* (- (* t y2) (* y y3)) (- (* y4 c) (* a y5))) (* (- (* y1 y4) (* y5 y0)) (- (* k y2) (* j y3)))))) (if (< y4 -1.2000065055686116e-105) (+ (+ (- (* (- (* j t) (* k y)) (- (* y4 b) (* y5 i))) (* (* y3 y) (- (* y5 a) (* y4 c)))) (+ (* (* y5 a) (* t y2)) (* (- (* k y2) (* j y3)) (- (* y4 y1) (* y5 y0))))) (- (* (- (* x y2) (* z y3)) (- (* c y0) (* a y1))) (- (* (- (* b y0) (* i y1)) (- (* j x) (* k z))) (* (- (* y x) (* z t)) (- (* b a) (* i c)))))) (if (< y4 6.718963124057495e-279) (+ (- (- (- (* (* k y) (* y5 i)) (* (* y b) (* y4 k))) (* (* y5 t) (* i j))) (- (* (- (* y2 t) (* y3 y)) (- (* y4 c) (* y5 a))) (* (- (* y2 k) (* y3 j)) (- (* y4 y1) (* y5 y0))))) (- (* (- (* b a) (* i c)) (- (* y x) (* t z))) (- (* (- (* j x) (* k z)) (- (* y0 b) (* i y1))) (* (- (* y2 x) (* y3 z)) (- (* c y0) (* y1 a)))))) (if (< y4 4.77962681403792e-222) (+ (+ (- (* (- (* j t) (* k y)) (- (* y4 b) (* y5 i))) (* (* y3 y) (- (* y5 a) (* y4 c)))) (+ (* (* y5 a) (* t y2)) (* (- (* k y2) (* j y3)) (- (* y4 y1) (* y5 y0))))) (- (* (- (* x y2) (* z y3)) (- (* c y0) (* a y1))) (- (* (- (* b y0) (* i y1)) (- (* j x) (* k z))) (* (- (* y x) (* z t)) (- (* b a) (* i c)))))) (if (< y4 2.2852241541266835e-175) (+ (- (- (- (* (* k y) (* y5 i)) (* (* y b) (* y4 k))) (* (* y5 t) (* i j))) (- (* (- (* y2 t) (* y3 y)) (- (* y4 c) (* y5 a))) (* (- (* y2 k) (* y3 j)) (- (* y4 y1) (* y5 y0))))) (- (* (- (* b a) (* i c)) (- (* y x) (* t z))) (- (* (- (* j x) (* k z)) (- (* y0 b) (* i y1))) (* (- (* y2 x) (* y3 z)) (- (* c y0) (* y1 a)))))) (+ (- (+ (+ (- (* (- (* x y) (* z t)) (- (* a b) (* c i))) (- (* k (* i (* z y1))) (+ (* j (* i (* x y1))) (* y0 (* k (* z b)))))) (- (* z (* y3 (* a y1))) (+ (* y2 (* x (* a y1))) (* y0 (* z (* c y3)))))) (* (- (* t j) (* y k)) (- (* y4 b) (* y5 i)))) (* (- (* t y2) (* y y3)) (- (* y4 c) (* y5 a)))) (* (- (* k y2) (* j y3)) (- (* y4 y1) (* y5 y0))))))))))
(+ (- (+ (+ (- (* (- (* x y) (* z t)) (- (* a b) (* c i))) (* (- (* x j) (* z k)) (- (* y0 b) (* y1 i)))) (* (- (* x y2) (* z y3)) (- (* y0 c) (* y1 a)))) (* (- (* t j) (* y k)) (- (* y4 b) (* y5 i)))) (* (- (* t y2) (* y y3)) (- (* y4 c) (* y5 a)))) (* (- (* k y2) (* j y3)) (- (* y4 y1) (* y5 y0)))))