{"name":"mcint","title":"Monte Carlo Integration","pagetitle":"Monte Carlo Integration — mcint","aliases":["mcint","mcint2"],"author":[],"keywords":[],"description":"

Simple Monte Carlo Integraton

","usage":"mcint(f, a, b, m = 1000)\n\nmcint2(f, xdom, ydom, m = 1000)","arguments":[{"name":"f","description":"

function to integrate

"},{"name":"a","description":"

the lower-bound of integration

"},{"name":"b","description":"

the upper-bound of integration

"},{"name":"m","description":"

the number of subintervals to calculate

"},{"name":"xdom","description":"

the domain on x of integration in two dimensions

"},{"name":"ydom","description":"

the domain on y of integration in two dimensions

"}],"has_args":true,"examples":"# NOT RUN {\nf <- function(x) { sin(x)^2 + log(x)}\nmcint(f, 0, 1)\nmcint(f, 0, 1, m = 10e6)\n\n# }\n","sections":[],"value":"

the value of the integral

","details":"

The mcint function uses a simple Monte Carlo algorithm to\nestimate the value of an integral. The parameter n sets the\ntotal number of evaluation points. The parameter max.y is the\nmaximum expected value of the range of function f. The\nmcint2 provides Monte Carlo integration in two dimensions.

","seealso":"

Other integration: \nadaptint(),\ngaussint(),\nginiquintile(),\nmidpt(),\nrevolution-solid,\nromberg(),\nsimp38(),\nsimp(),\ntrap()

","package":{"package":"cmna","version":"1.0.3"}}

Description

Usage

Arguments

Value

Details

See Also

Examples