The Journal of the Indian Mathematical Society

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On the Collinearity of Three Points on a Non-Singular Cubic


     

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Every non-singular cubic can be reduced to the canonical form

x3 + y3 + z3 + 6mxyz = 0;

and if three points (xi, yi, zi) (i = 1,2,3) on this cubic be collinear, we have the well-known condition due to Cayley, viz.

x1x2x3 + y1y2y3 + z1z2z3 = 0.

We have shown here that this condition is necessary but not sufficient.


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  • On the Collinearity of Three Points on a Non-Singular Cubic

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Abstract


Every non-singular cubic can be reduced to the canonical form

x3 + y3 + z3 + 6mxyz = 0;

and if three points (xi, yi, zi) (i = 1,2,3) on this cubic be collinear, we have the well-known condition due to Cayley, viz.

x1x2x3 + y1y2y3 + z1z2z3 = 0.

We have shown here that this condition is necessary but not sufficient.