Mist, Oregon

Mist is an unincorporated community in Columbia County, Oregon, United States. Formerly called Riverside, the place was renamed in 1888 for the atmospheric conditions of the Nehalem Valley. The first land claims in the area had been made circa 1870. The original Riverside post office was closed in 1975.

On July 6, 2001, the Mist store, which was built in 1874, caught fire and was destroyed. Until then, it was the oldest continuously operating business in Oregon, offering food and hardware and displaying historic newspaper clippings and antique logging equipment on the walls.

Mist is a crossroads community where Oregon Route 47 turns north to Clatskanie, and a pioneer trail (Burn Road) crossed the Nehalem River and went south to Vernonia. It is the eastern terminus of Oregon Route 202. The Nehalem River valley widens between Mist and Jewell and was favored by the Native American tribes of the area for hunting; it was later favored by early European American settlers for agriculture. Although the area is now sparsely settled, it is notable for having the largest operating sawmill in Columbia County and also geological conditions lending themselves to natural gas storage. Mist contains one of the very few, and therefore very valuable, natural gas storage areas in the Pacific Northwest. It operates unobtrusively on a hill near Mist. It is controlled by NW Natural (formerly Northwest Natural Gas) and is connected by several pipelines, including a 16-inch (410 mm) and a 24-inch (610 mm) pipeline along the Nehalem Highway.

Mist (valkyrie)

In Norse mythology, Mist (Old Norse "cloud" or mist) is a valkyrie. Mist appears in valkyrie list in the Poetic Edda poem Grímnismál and both of the Nafnaþulur valkyrie lists. No further information is provided about her. Rudolf Simek says that her name, Mist, is likely related to Old Norse mistr, meaning "cloud, mist," and that this "reminds us of the way in which valkyries can ride through the air and over water," such as in the Poetic Edda poems Helgakviða Hjörvarðssonar and Helgakviða Hundingsbana II.

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References

Andrew McIntosh (professor)

Andrew McIntosh is professor of thermodynamics and combustion theory at the University of Leeds. His group has received recognition for research on the physics behind the gaseous "cannon" of the bombardier beetle and his biomimetic application of this to the design of spray mechanisms, which has resulted in several patents. McIntosh is a young earth creationist.

Research

McIntosh's research group has developed a new technology known as µMist which is based on the gaseous "cannon" of the bombardier beetle. In December 2010, this work received the outstanding contribution to innovation and technology title at the Times Higher Education awards in London.

Views

In a discussion with Richard Dawkins on BBC Radio Ulster and in an article, McIntosh argued that the principles of thermodynamics are not consistent with Darwinian evolution.

McIntosh is director of the organisation Truth in Science which promotes creationism and intelligent design. In November 2006, the University of Leeds issued a statement distancing itself from creationism, and noted that McIntosh's directorship of Truth in Science is unconnected with his teaching or research.

Area

Area is the quantity that expresses the extent of a two-dimensional figure or shape, or planar lamina, in the plane. Surface area is its analog on the two-dimensional surface of a three-dimensional object. Area can be understood as the amount of material with a given thickness that would be necessary to fashion a model of the shape, or the amount of paint necessary to cover the surface with a single coat. It is the two-dimensional analog of the length of a curve (a one-dimensional concept) or the volume of a solid (a three-dimensional concept).

The area of a shape can be measured by comparing the shape to squares of a fixed size. In the International System of Units (SI), the standard unit of area is the square metre (written as m²), which is the area of a square whose sides are one metre long. A shape with an area of three square metres would have the same area as three such squares. In mathematics, the unit square is defined to have area one, and the area of any other shape or surface is a dimensionless real number.

Area (LDS Church)

An area is an administrative unit of The Church of Jesus Christ of Latter-day Saints (LDS Church), which typically is composed of multiple stakes and missions. Areas are the primary church administrative unit between individual stakes and the church as a whole.

History

The areas as they now exist were formed in January 1984. Prior to that time, general authorities served as "area supervisors" and at times resided outside of Salt Lake City. In 1984, 13 initial areas were created; by 1992 there were 22, and by early 2007 there were 31. As of August 2012 there are 25 areas.

Administration

Until 2003, each area had a president and two counselors, all of whom were typically general authorities (area seventies were sometimes asked to be counselors). This three-man body was known as the area presidency. In that year, the church eliminated area presidencies for all areas located in the United States and Canada. Each of these areas were placed under the direct supervision of one of the seven members of the Presidency of the Seventy, thus freeing more general authorities from specific area assignments. Since these areas were previously administered by area presidencies located at church headquarters in Salt Lake City, the administrative change was not as drastic as it might seem.

Area (graph drawing)

In graph drawing, the area used by a drawing is a commonly used way of measuring its quality.

Definition

For a drawing style in which the vertices are placed on the integer lattice, the area of the drawing may be defined as the area of the smallest axis-aligned bounding box of the drawing: that is, it the product of the largest difference in x-coordinates of two vertices with the largest difference in y-coordinates. For other drawing styles, in which vertices are placed more freely, the drawing may be scaled so that the closest pair of vertices have distance one from each other, after which the area can again be defined as the area of a smallest bounding box of a drawing. Alternatively, the area can be defined as the area of the convex hull of the drawing, again after appropriate scaling.

Polynomial bounds

For straight-line drawings of planar graphs with n vertices, the optimal worst-case bound on the area of a drawing is Θ(n²). The nested triangles graph requires this much area no matter how it is embedded, and several methods are known that can draw planar graphs with at most quadratic area.Binary trees, and trees of bounded degree more generally, have drawings with linear or near-linear area, depending on the drawing style. Every outerplanar graph has a straight-line outerplanar drawing with area subquadratic in its number of vertices, If bends or crossings are allowed, then outerplanar graphs have drawings with near-linear area. However, drawing series-parallel graphs requires an area larger than n by a superpolylogarithmic factor, even if edges can be drawn as polylines.