# determine if a point is to the left or right of a line, on a globe

I have three points that are on the surface of a globe. I want to determine if one of the points lays to the left or right of a line that joins the other two points, when travelling in a certain direction down that line.

So, parameters are:

journey_start (x,y,z)

journey_end (x,y,z)

point (x,y,z)

My reasoning so far has got me this:

globe origin, journey start and end are three points on a great circle and describe a plane. I want to know if the other point is above or below this plane.

but I haven't managed to extend that to an equation.

How can I solve this?

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Isn't the leftness/rightness dependent on the point-of-observation and the orientation of the observer relative to the globe? Does the line segment, when extended in the direction of its starting point, always pass through the observer's head like William Tell's arrow through the apple? What if someone gives you a good spin and you start rotating around the axis that passes between your eyes, like a pinwheel? When you're upside down a point that what was to the left of the line becomes to the right. –  Tim Mar 10 '11 at 14:15
right, why I described it as a journey to give indication of the direction - the vector - of the traveller, and as a globe so as to give a concept of 'up' from the view of the traveller. –  Will Mar 10 '11 at 14:22
You think of the North Pole as "up"? I know a few kangaroos who might disagree. –  Tim Mar 11 '11 at 0:58
en.wikipedia.org/wiki/Reversed_map –  Tim Mar 11 '11 at 11:50
A fun link Tim, but I can't see how you jumped to the north-is-up thing. From the perspective of the traveller, 'up' is away from the centre. –  Will Mar 12 '11 at 9:22