#' The simple pendulum model
#'
#' The derivative function of the simple pendulum model, an example of a
#' two-dimensional autonomous ODE system.
#'
#' \code{simplePendulum} evaluates the derivative of the following ODE at the
#' point \ifelse{html}{\out{(<i>t</i>, <i>x</i>, <i>y</i>)}}{\eqn{(t, x, y)}}:
#'
#' \ifelse{html}{\out{<i>dx</i>/<i>dt</i> = <i>y</i>,
#' <i>dy</i>/<i>dt</i> = -<i>g</i> sin(<i>x</i>)/<i>l</i>.}}{
#' \deqn{\frac{dx}{dt} = y, \frac{dy}{dt} = \frac{-g\sin(x)}{l}.}}
#'
#' Its format is designed to be compatible with \code{\link[deSolve]{ode}} from
#' the \code{\link[deSolve]{deSolve}} package.
#'
#' @param t The value of \ifelse{html}{\out{<i>t</i>}}{\eqn{t}}, the independent
#' variable, to evaluate the derivative at. Should be a
#' \code{\link[base]{numeric}} \code{\link[base]{vector}} of
#' \code{\link[base]{length}} one.
#' @param y The values of \ifelse{html}{\out{<i>x</i>}}{\eqn{x}} and
#' \ifelse{html}{\out{<i>y</i>}}{\eqn{y}}, the dependent variables, to evaluate
#' the derivative at. Should be a \code{\link[base]{numeric}}
#' \code{\link[base]{vector}} of \code{\link[base]{length}} two.
#' @param parameters The values of the parameters of the system. Should be a
#' \code{\link[base]{numeric}} \code{\link[base]{vector}} prescribing the value
#' of \ifelse{html}{\out{<i>l</i>}}{\eqn{l}}.
#' @return Returns a \code{\link[base]{list}} containing the values of the two
#' derivatives at
#' \ifelse{html}{\out{(<i>t</i>, <i>x</i>, <i>y</i>)}}{\eqn{(t, x, y)}}.
#' @author Michael J Grayling
#' @seealso \code{\link[deSolve]{ode}}
#' @examples
#' # Plot the velocity field, nullclines and several trajectories
#' simplePendulum_flowField <- flowField(simplePendulum,
#' xlim = c(-7, 7),
#' ylim = c(-7, 7),
#' parameters = 5,
#' points = 19,
#' add = FALSE)
#' y0 <- matrix(c(0, 1, 0, 4, -6,
#' 1, 5, 0.5, 0, -3), 5, 2,
#' byrow = TRUE)
#' \donttest{
#' simplePendulum_nullclines <- nullclines(simplePendulum,
#' xlim = c(-7, 7),
#' ylim = c(-7, 7),
#' parameters = 5,
#' points = 500)
#' }
#' simplePendulum_trajectory <- trajectory(simplePendulum,
#' y0 = y0,
#' tlim = c(0, 10),
#' parameters = 5)
#' # Determine the stability of two equilibrium points
#' simplePendulum_stability_1 <- stability(simplePendulum,
#' ystar = c(0, 0),
#' parameters = 5)
#' simplePendulum_stability_2 <- stability(simplePendulum,
#' ystar = c(pi, 0),
#' parameters = 5)
#' @export
simplePendulum <- function(t, y, parameters){
list(c(y[2], -9.81*sin(y[1])/parameters))
}
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