5
0
mirror of https://github.com/cwinfo/matterbridge.git synced 2024-11-22 21:50:28 +00:00
matterbridge/vendor/github.com/av-elier/go-decimal-to-rational/README.md
Benau 53cafa9f3d
Convert .tgs with go libraries (and cgo) (telegram) (#1569)
This commit adds support for go/cgo tgs conversion when building with the -tags `cgo`
The default binaries are still "pure" go and uses the old way of converting.

* Move lottie_convert.py conversion code to its own file

* Add optional libtgsconverter

* Update vendor

* Apply suggestions from code review

* Update bridge/helper/libtgsconverter.go

Co-authored-by: Wim <wim@42.be>
2021-08-24 22:32:50 +02:00

55 lines
1.4 KiB
Markdown

# go-decimal-to-rational
[![Build Status](https://travis-ci.org/av-elier/go-decimal-to-rational.svg?branch=master)](https://travis-ci.org/av-elier/go-decimal-to-rational)
Go library to convert decimal (float64) to rational fraction with required precision
Relies on [Continued Fraction](http://mathworld.wolfram.com/ContinuedFraction.html) algorythm.
It's sometimes more appropriate than default big.Rat SetString, because
you can get `2/3` from `0.6666` by specifiing required precision. In big.Rat SetString
you can only get `3333/50000`, and have no way to manipulate than (as of go 1.11).
# Example
```go
func ExampleNewRatP() {
fmt.Println(NewRatP(0.6666, 0.01).String())
fmt.Println(NewRatP(0.981, 0.001).String())
fmt.Println(NewRatP(0.75, 0.01).String())
// Output:
// 2/3
// 981/1000
// 3/4
}
```
```go
func ExampleNewRatI() {
fmt.Println(NewRatI(0.6667, 3).String())
fmt.Println(NewRatI(0.6667, 4).String())
// Output:
// 2/3
// 6667/10000
}
```
# Docs
```
import dectofrac "github.com/av-elier/go-decimal-to-rational"
```
#### func NewRatI
```go
func NewRatI(val float64, iterations int64) *big.Rat
```
NewRatI returns rational from decimal using `iterations` number of
iterations in Continued Fraction algorythm
#### func NewRatP
```go
func NewRatP(val float64, stepPrecision float64) *big.Rat
```
NewRatP returns rational from decimal by going as mush iterations, until
next fraction is less than `stepPrecision`