After nearly 11 years, I’ve finally decided to pull the plug on Usenet archive: Groupsrv.com.

The page you have requested no longer exists!

But don’t panic just yet!

I’ve coded this page in a way, that it’s monitoring each redirect & capturing data about the thread you’ve requested. Page you’ve requested is still available in Google’s Usenet Archive. You should be able to access it using following URL:

Calculate third point of a triangle, given two points

Note: I can’t guarantee that all Groupsrv.com pages can be found in Google Groups, but over 90% of the content should be there. If not, try the resources below!

Wikipedia:
Triangle! – vertices A, B, and C is denoted . In Euclidean geometry any three points, when non-collinear, determine a unique triangle and a unique plane (i.e. a two-dimensional
Pascal’s triangle! – In mathematics, Pascal’s triangle is a triangular array of the binomial coefficients. In much of the Western world it is named after French mathematician
Problem of Apollonius! – intersection points between the three given lines; hence, the center lies at the intersection point of two such angle bisectors. Since there are two such bisectors
Circumscribed circle! – three points are on the minimum bounding circle) or by the two points of the longest side of the triangle (where the two points define a diameter of the
Triangle center! – about a geometry concept. For a place in Lexington, Kentucky, see Triangle Center. In geometry, a triangle center (or triangle centre) is a point in the

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