Nothing
.repole <- function(lo,la,lop,lap) {
## painfully plodding function to get new lo, la relative to pole at
## lap,lop...
## x,y,z location of pole...
yp <- sin(lap)
xp <- cos(lap)*sin(lop)
zp <- cos(lap)*cos(lop)
## x,y,z location of meridian point for pole - i.e. point lat pi/2
## from pole on pole's lon.
ym <- sin(lap-pi/2)
xm <- cos(lap-pi/2)*sin(lop)
zm <- cos(lap-pi/2)*cos(lop)
## x,y,z locations of points in la, lo
y <- sin(la)
x <- cos(la)*sin(lo)
z <- cos(la)*cos(lo)
## get angle between points and new equatorial plane (i.e. plane orthogonal to pole)
d <- sqrt((x-xp)^2+(y-yp)^2+(z-zp)^2) ## distance from points to to pole
phi <- pi/2-2*asin(d/2)
## location of images of la,lo on (new) equatorial plane
## sin(phi) gives distance to plane, -(xp, yp, zp) is
## direction...
x <- x - xp*sin(phi)
y <- y - yp*sin(phi)
z <- z - zp*sin(phi)
## get distances to meridian point
d <- sqrt((x-xm)^2+(y-ym)^2+(z-zm)^2)
## angles to meridian plane (i.e. plane containing origin, meridian point and pole)...
theta <- (1+cos(phi)^2-d^2)/(2*cos(phi))
theta[theta < -1] <- -1; theta[theta > 1] <- 1
theta <- acos(theta)
## now decide which side of meridian plane...
## get points at extremes of hemispheres on either side
## of meridian plane....
y1 <- 0
x1 <- sin(lop+pi/2)
z1 <- cos(lop+pi/2)
y0 <- 0
x0 <- sin(lop-pi/2)
z0 <- cos(lop-pi/2)
d1 <- sqrt((x-x1)^2+(y-y1)^2+(z-z1)^2)
d0 <- sqrt((x-x0)^2+(y-y0)^2+(z-z0)^2)
ii <- d0 < d1 ## index -ve lon hemisphere
theta[ii] <- -theta[ii]
list(lo=theta,la=phi)
} ## end of repole
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