A client insists that sin(Math.PI) and cos(Math.PI / 2) should return zero, not something around 10^-16. He's not happy with the explanation that Math.sin() and Math.cos() are the way they are, not only in Javascript but in all other languages.

One thing I found, is that Math.sin() is insensitive to parameter changes smaller than 2e-16:

```
Math.sin(Math.PI)
1.2246063538223773e-16
Math.sin(Math.PI + 1e-16)
1.2246063538223773e-16
Math.sin(Math.PI + 2e-16)
1.2246063538223773e-16
Math.sin(Math.PI + 3e-16)
-3.216285744678249e-16
```

Since sin(x)~=x when sin(x) is near zero, it ocurred to me to cast sin(x) to zero when x is smaller than 2e-16.

Math.cos() is more precise, it is insensitive to changes up to 1.1e16 *(EDIT: it happens because base value is smaller: Math.PI/2)* so I would cast cos(x) to zero when it is smaller than 1e-16:

```
Math.cos(Math.PI / 2)
6.123031769111886e-17
Math.cos(Math.PI / 2 + 1e-16)
6.123031769111886e-17
Math.cos(Math.PI / 2 + 1.1e-16)
6.123031769111886e-17
Math.cos(Math.PI / 2 + 1.5e-16)
-1.6081428723391245e-16
```

Of course, such a cast would ruin the original good precision of sin(x) when x->0:

```
Math.sin(1e-99)
1e-99
Math.sin(1e-50)
1e-50
Math.sin(1e-40)
1e-40
Math.sin(1e-20)
1e-20
Math.sin(1e-10)
1e-10
Math.sin(1e-5)
0.000009999999999833334
```

But if the application were using such small angles, it should be using x directly, not sin(x), correct? Since sin(x) tends totally to x in this range.

Considering that the application has 10 digit of UI precision, do you feel my strategy is right?

A client insists" get a better clients, preferably ones that have some understanding of floating point math. Does the client also demand that`.1 + .2 == .3`

? – p.s.w.g Feb 12 at 22:31`0.1 + 0.2 = 0.3`

- now a customer unfamiliar with intricacies of JS floating point operations would think so too. And he doesn't care about what make the app tick - JS or leprechaun magic – Yuriy Galanter Feb 12 at 22:35