# how to calculate the intersection area of two circles in shiny or R code

Anyone has shiny code or R code about how to calculate the intersection area of two circles?

library(shiny)

# Define UI for application that draws a histogram

shinyUI(fluidPage(

# Application title titlePanel("Choose your probability"),

# Sidebar with a slider input for number of bins sidebarLayout( sidebarPanel(

``````  sliderInput("radius",
"Probability of A",
min = 0,
max = 0.4,
value = 0.2),
"Probability of B",
min = 0,
max = 0.4,
value = 0.2)
),
mainPanel(
plotOutput("distPlot")
)
``````

) ))

# server

library(shiny) library(plotrix) library(grid)

# Define server logic required to draw a histogram

shinyServer(function(input, output) {

output\$distPlot <- renderPlot({

``````isolate({
plot(c(-1,1),c(-1,1), type = 'n')

})

``````

})

})

you can use this:

``````circle_intersection <- function(x1, y1, r1, x2, y2, r2){
rr1 <- r1 * r1
rr2 <- r2 * r2
d <- sqrt((x2 - x1) * (x2 - x1) + (y2 - y1) * (y2 - y1))

if (d > r2 + r1) # Circles do not overlap
{
return(0)
} else if (d <= abs(r1 - r2) && r1 >= r2){ # Circle2 is completely inside circle1
return(pi*rr2)
} else if (d <= abs(r1 - r2) && r1 < r2){ # Circle1 is completely inside circle2
return(pi*rr1)
} else { # Circles partially overlap
phi <- (acos((rr1 + (d * d) - rr2) / (2 * r1 * d))) * 2
theta <- (acos((rr2 + (d * d) - rr1) / (2 * r2 * d))) * 2
area2 <- 0.5 * theta * rr2 - 0.5 * rr2 * sin(theta)
area1 <- 0.5 * phi * rr1 - 0.5 * rr1 * sin(phi)
return(area1 + area1)
}
}

circle_intersection(-0.25,0,0.2,0.25,0,0.2)  # 0 (Circles do not overlap)
circle_intersection(-0.25,0,0.2,-0.25,0,0.1) # 0.031 (Circle2 is completely inside circle1)
circle_intersection(-0.25,0,0.1,-0.25,0,0.2) # 0.031 (Circle1 is completely inside circle2)
circle_intersection(-0.25,0,0.3,0.25,0,0.4)  # 0.08051314 (Circles partially overlap)
``````