Diameters Of The Large Intestine

In geometry, a diameter of a circle is any straight line segment that passes through the center of the circle and whose endpoints lie on the circle. It can also be defined as the longest chord of the circle. Both definitions are also valid for the diameter of a sphere.

In more modern usage, the length $d$ of a diameter is also called the diameter. In this sense one speaks of diameter rather than diameter (which refers to the line segment itself), because all diameters of a circle or sphere have the same length, this being twice the radius $r.$

:$d = 2r \qquad\text\qquad r = \frac.$

For a convex shape in the plane, the diameter is defined to be the largest distance that can be formed between two opposite parallel lines tangent to its boundary, and the is often defined to be the smallest such distance. Both quantities can be calculated efficiently using rotating calipers. For a curve of constant width such as the Reuleaux triangle, the width and diameter are the same because all such pairs of parallel tangent lines have the same distance.

For an ellipse, the standard terminology is different. A diameter of an ellipse is any chord passing through the centre of the ellipse. For example, conjugate diameters have the property that a tangent line to the ellipse at the endpoint of one diameter is parallel to the conjugate diameter. The longest diameter is called the major axis.

The word "diameter" is derived from grc, διάμετρος (), "diameter of a circle", from (), "across, through" and (), "measure". It is often abbreviated $\text, \text, d,$ or $\varnothing.$

Generalizations

The definitions given above are only valid for circles, spheres and convex shapes. However, they are special cases of a more general definition that is valid for any kind of $n$-dimensional (convex or non-convex) object, such as a hypercube or a set of scattered points. The or of a subset of a metric space is the least upper bound of the set of all distances between pairs of points in the subset. Explicitly, if $S$ is the subset and if $\rho$ is the metric, the diameter is
$\operatorname(S) = \sup_ \rho(x, y).$

If the metric $\rho$ is viewed here as having codomain $\R$ (the set of all real numbers), this implies that the diameter of the empty set (the case $S = \varnothing$) equals $- \infty$ (negative infinity). Some authors prefer to treat the empty set as a special case, assigning it a diameter of $0,$ which corresponds to taking the codomain of $d$ to be the set of nonnegative reals.

For any solid object or set of scattered points in $n$-dimensional Euclidean space, the diameter of the object or set is the same as the diameter of its convex hull. In medical parlance