This is a forked version of RinRuby. The advantage of this forked version is mainly addition of functionality.
- sudo gem install specific_install # Only required first time
- sudo gem specific_install https://github.com/fenrir-naru/rinruby.git dev-fenrir
GPL-3. See LICENSE.txt for more information.
RinRuby is a Ruby library that integrates the R interpreter in Ruby, making R's statistical routines and graphics available within Ruby. The library consists of a single Ruby script that is simple to install and does not require any special compilation or installation of R. Since the library is 100% pure Ruby, it works on a variety of operating systems, Ruby implementations, and versions of R. RinRuby's methods are simple, making for readable code. The website rinruby.ddahl.org describes RinRuby usage, provides comprehensive documentation, gives several examples, and discusses RinRuby's implementation.
Copyright 2005-2008 David B. Dahl
Developed by David B. Dahl. Documented by David B. Dahl and Scott Crawford
Homepage: http://rinruby.ddahl.org
Maintainer: Claudio Bustos
Contributors:
- Pure Ruby. Works on Ruby 2.1, 2.2, 2.4 and JRuby-head (2018/03/29). There isn't any specific code that impides to use Ruby < 2.0, but is deprecated.
- Slower than RSRuby, but more robust
Below is a simple example of RinRuby usage for simple linear regression. The simulation parameters are defined in Ruby, computations are performed in R, and Ruby reports the results. In a more elaborate application, the simulation parameter might come from input from a graphical user interface, the statistical analysis might be more involved, and the results might be an HTML page or PDF report.
require "rinruby"
n = 10
beta_0 = 1
beta_1 = 0.25
alpha = 0.05
seed = 23423
R.x = (1..n).entries
R.eval <<EOF
set.seed(#{seed})
y <- #{beta_0} + #{beta_1}*x + rnorm(#{n})
fit <- lm( y ~ x )
est <- round(coef(fit),3)
pvalue <- summary(fit)$coefficients[2,4]
EOF
puts "E(y|x) ~= #{R.est[0]} + #{R.est[1]} * x"
if R.pvalue < alpha
puts "Reject the null hypothesis and conclude that x and y are related."
else
puts "There is insufficient evidence to conclude that x and y are related."
end
E(y|x) ~= 1.264 + 0.273 * x
Reject the null hypothesis and conclude that x and y are related.
- R