Average Error: 0.1 → 0

Time: 3.3s

Precision: 64

\[\left(\left(d1 \cdot d1\right) \cdot d1\right) \cdot d1\]

↓

\[{d1}^{4}\]

\left(\left(d1 \cdot d1\right) \cdot d1\right) \cdot d1

↓

{d1}^{4}

double f(double d1) {
        double r200916 = d1;
        double r200917 = r200916 * r200916;
        double r200918 = r200917 * r200916;
        double r200919 = r200918 * r200916;
        return r200919;
}

↓

double f(double d1) {
        double r200920 = d1;
        double r200921 = 4.0;
        double r200922 = pow(r200920, r200921);
        return r200922;
}

Error

The X axis uses an exponential scale — Bits error versus `d1`

Try it out

In
Out

Enter valid numbers for all inputs

Target

Original	0.1
Target	0
Herbie	0

\[{d1}^{4}\]

Derivation

Initial program 0.1
\[\left(\left(d1 \cdot d1\right) \cdot d1\right) \cdot d1\]
Simplified0
\[\leadsto \color{blue}{{d1}^{4}}\]
Final simplification0
\[\leadsto {d1}^{4}\]

Reproduce

herbie shell --seed 2019326 
(FPCore (d1)
  :name "FastMath repmul"
  :precision binary64

  :herbie-target
  (pow d1 4)

  (* (* (* d1 d1) d1) d1))