Tangent developable

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The tangent developable of a space curve ${\displaystyle \gamma (t)}$ is a ruled surface of the form ${\displaystyle \gamma (t)+s\gamma ^{\prime }(t)}$. Intuitively it is the union of the tangent lines to the space curve. A result of Euler^{[citation needed]} states that most developable surfaces can be obtained as a tangent developable. The exceptions are generalised cones and cylinders and the plane.

• Pressley, Andrew (2010). Elementary Differential Geometry. Springer. p. 129. ISBN 184882890X.

• Weisstein, Eric W. "Tangent Developable". MathWorld.

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