Osculating curve differential geometry , an osculating curve plane curve from a given family that has the highest possible order of contact with another curve.F is a family of smooth curves, C is a smooth curve , and p is a point on C , then an osculating curve from F at p is a curve from F that passes through p and has as many of its derivatives at p equal to the derivatives of C as possible.derives from the Latinate root "osculate", to kiss , because the two curves contact one another in a more intimate way than simple tangency .Examples Examples of osculating curves of different orders include:The tangent line to a curve C at a point p , the osculating curve from the family of straight lines . The tangent line shares its first derivative with C and therefore has first-order contact with C . The osculating circle to C at p , the osculating curve from the family of circles. The osculating circle shares both its first and second derivatives with C . The osculating parabola to C at p , the osculating curve from the family of parabolas , has third order contact with C . The osculating conic to C at p , the osculating curve from the family of conic sections , has fourth order contact with C .Generalizations generalized to higher-dimensional spaces, and to objects that are not curves within those spaces. For instance an osculating plane to a space curve is a plane that has second-order contact with the curve . This is as high an order as is possible in the general case. one dimension , analytic curves are said to osculate at a point if they share the first three terms of their Taylor expansion about that point. This concept can be generalized to superosculation , in which two curves share more than the first three terms of their Taylor expansion.
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