Transverse Mercator projection - AbsoluteAstronomy.com

The transverse Mercator map projection is an adaptation of the standard Mercator projection

Mercator projection

The Mercator projection is a cylindrical map projection presented by the Belgian geographer and cartographer Gerardus Mercator, in 1569. It became the standard map projection for nautical purposes because of its ability to represent lines of constant course, known as rhumb lines or loxodromes, as...

. The transverse version is widely used in national and international mapping systems around the world, including the UTM

Universal Transverse Mercator coordinate system

The Universal Transverse Mercator geographic coordinate system uses a 2-dimensional Cartesian coordinate system to give locations on the surface of the Earth. It is a horizontal position representation, i.e...

. When paired with a suitable geodetic datum, the transverse Mercator delivers high accuracy in zones less than a few degrees in east-west extent.

The standard (or Normal) Mercator and the transverse Mercator are two different aspects of the same mathematical construction. Because of the common foundation, the transverse Mercator inherits many traits from the normal Mercator.

Both projections
Map projection
A map projection is any method of representing the surface of a sphere or other three-dimensional body on a plane. Map projections are necessary for creating maps. All map projections distort the surface in some fashion...

are cylindrical: for the Normal Mercator, the axis of the cylinder coincides with the polar axis and the line of tangency with the equator. For the transverse Mercator, the axis of the cylinder lies in the equatorial plane, and the line of tangency is any chosen meridian, thereby designated the central meridian
Meridian (geography)
A meridian is an imaginary line on the Earth's surface from the North Pole to the South Pole that connects all locations along it with a given longitude. The position of a point along the meridian is given by its latitude. Each meridian is perpendicular to all circles of latitude...

.
Both projections may be modified to secant forms, which means the scale has been reduced so that the cylinder slices through the model globe.
Both exist in spherical and ellipsoidal
Figure of the Earth
The expression figure of the Earth has various meanings in geodesy according to the way it is used and the precision with which the Earth's size and shape is to be defined. The actual topographic surface is most apparent with its variety of land forms and water areas. This is, in fact, the surface...

versions.
Both projections are conformal
Conformal map
In mathematics, a conformal map is a function which preserves angles. In the most common case the function is between domains in the complex plane.More formally, a map,...

, so that the point scale
Scale (map)
The scale of a map is defined as the ratio of a distance on the map to the corresponding distance on the ground.If the region of the map is small enough for the curvature of the Earth to be neglected, then the scale may be taken as a constant ratio over the whole map....

is independent of direction and local shapes are well preserved;
Both projections have constant scale the line of tangency (the equator for the normal Mercator and the central meridian for the transverse).

Since the central meridian of the transverse Mercator can be chosen at will, it may be used to construct highly accurate maps (of narrow width) anywhere on the globe. The secant, ellipsoidal form of the transverse Mercator is the most widely applied of all projections for accurate large scale maps.

General features of the spherical transverse Mercator

In constructing a map on any projection, a sphere

Spherical Earth

The concept of a spherical Earth dates back to ancient Greek philosophy from around the 6th century BC, but remained a matter of philosophical speculation until the 3rd century BC when Hellenistic astronomy established the spherical shape of the earth as a physical given...

is normally chosen to model the earth when the extent of the mapped region exceeds a few hundred kilometers in length in both dimensions. For maps of smaller regions, an ellipsoidal model

Figure of the Earth

The expression figure of the Earth has various meanings in geodesy according to the way it is used and the precision with which the Earth's size and shape is to be defined. The actual topographic surface is most apparent with its variety of land forms and water areas. This is, in fact, the surface...

must be chosen if greater accuracy is required; see next section. The spherical form of the transverse Mercator projection was one of the seven 'new' projections presented, in 1772, by Johann Heinrich Lambert

Johann Heinrich Lambert

Johann Heinrich Lambert was a Swiss mathematician, physicist, philosopher and astronomer.Asteroid 187 Lamberta was named in his honour.-Biography:...

(also available in a modern English translation). Lambert did not name his projections; the name transverse Mercator dates from the second half of the nineteenth century. The principal properties of the transverse projection are here presented in comparison with the properties of the normal projection.

A comparison of normal and transverse projections on the sphere

	Normal Mercator		Transverse Mercator

•	The central meridian projects to the straight line x = 0. Other meridians project to straight lines with x constant.	•	The central meridian projects to the straight line x = 0. Meridians 90 degrees east and west of the central meridian project to lines of constant y through the projected poles. All other meridians project to complicated curves.
•	The equator projects to the straight line y = 0 and parallel circles project to straight lines of constant y.	•	The equator projects to the straight line y = 0 but all other parallels are complicated closed curves.
•	Projected meridians and parallels intersect at right angles.	•	Projected meridians and parallels intersect at right angles.
•	The projection is unbounded in the y direction. The poles lie at infinity.	•	The projection is unbounded in the x direction. The points on the equator at ninety degrees from the central meridian are projected to infinity.
•	The projection is conformal. The shapes of small elements are well preserved.	•	The projection is conformal. The shapes of small elements are well preserved.
•	Distortion increases with y. The projection is not suited for world maps. Distortion is small near the equator and the projection (particularly in its ellipsoidal form) is suitable for accurate mapping of equatorial regions.	•	Distortion increases with x. The projection is not suited for world maps. Distortion is small near the central meridian and the projection (particularly in its ellipsoidal form) is suitable for accurate mapping of narrow regions.
•	Greenland is almost as large as Africa; the actual area is about one thirteenth that of Africa.	•	Greenland and Africa are both near to the central meridian; their shapes are good and the ratio of the areas is a good approximation to actual values.
•	The point scale factor Scale (map) The scale of a map is defined as the ratio of a distance on the map to the corresponding distance on the ground.If the region of the map is small enough for the curvature of the Earth to be neglected, then the scale may be taken as a constant ratio over the whole map.... is independent of direction. It is a function of y on the projection. (On the sphere it depends on latitude only.) The scale is true on the equator.	•	The point scale factor is independent of direction. It is a function of x on the projection. (On the sphere it depends on both latitude and longitude.) The scale is true on the central meridian.
•	The projection is reasonably accurate near the equator. Scale at an angular distance of 5° (in latitude) away from the equator is less than 0.4% greater than scale at the equator, and is about 1.54% greater at an angular distance of 10°.	•	The projection is reasonably accurate near the central meridian. Scale at an angular distance of 5° (in longitude) away from the central meridian is less than 0.4% greater than scale at the central meridian, and is about 1.54% at an angular distance of 10°.
•	In the secant version the scale is reduced on the equator and it is true on two lines parallel to the projected equator (and corresponding to two parallel circles on the sphere).	•	In the secant version the scale is reduced on the central meridian and it is true on two lines parallel to the projected central meridian.
•	Convergence (the angle between projected meridians and grid lines with x constant) is identically zero. Grid north and true north coincide.	•	Convergence is zero on the equator and non-zero everywhere else. It increases as the poles are approached. Grid north and true north do not coincide.
•	Rhumb lines (of constant compass bearing on the sphere) project to straight lines.	•	Rhumb lines project to complex curves.

General features of the ellipsoidal transverse Mercator

The ellipsoidal form of the transverse Mercator projection was developed by Carl Friedrich Gauss

Carl Friedrich Gauss

Johann Carl Friedrich Gauss was a German mathematician and scientist who contributed significantly to many fields, including number theory, statistics, analysis, differential geometry, geodesy, geophysics, electrostatics, astronomy and optics.Sometimes referred to as the Princeps mathematicorum...

in 1825 and further analysed by Johann Heinrich Louis Krüger in 1912. The projection is known by several names: Gauss Conformal or Gauss-Krüger in Europe; the transverse Mercator in the US; or Gauss-Krüger transverse Mercator generally. The projection is conformal with a constant scale on the central meridian. (There are other conformal generalisations of the transverse Mercator from the sphere to the ellipsoid but only Gauss-Krüger has a constant scale on the central meridian.) Throughout the twentieth century the Gauss-Krüger transverse Mercator was adopted, in one form or another, by many nations (and international bodies); in addition it provides the basis for the Universal Transverse Mercator series of projections. The Gauss-Krüger projection is now the most widely used projection in accurate large scale mapping.

The projection, as developed by Gauss and Krüger, was expressed in terms of low order power series which were assumed to diverge in the east-west direction, exactly as in the spherical version. This was proved to be untrue by British cartographer E.H. Thompson, whose unpublished exact (closed form) version of the projection, reported by L.P. Lee in 1976, showed that the ellipsoidal projection is finite (below). This is the most striking difference between the spherical and ellipsoidal versions of the transverse Mercator projection: Gauss-Krüger gives a reasonable projection of the whole ellipsoid to the plane, although its principal application is to accurate large scale mapping "close" to the central meridian.
Features of the projection are as follows:

Near the central meridian (Greenwich in the above example) the projection has low distortion and the shapes of Africa, western Europe, Britain, Greenland, Antarctica compare favourably with a globe.
The central regions of the transverse projections on sphere and ellipsoid are indistinguishable on the small scale projections shown here.
The meridians at 90° east and west of the chosen central meridian project to horizontal lines through the poles. The more distant hemisphere is projected above the north pole and below the south pole.
The equator bisects Africa, crosses South America and then continues onto the complete outer boundary of the projection; the top and bottom edges and the right and left edges must be identified (i.e. they represent the same lines on the globe). (Indonesia is bisected).
Distortion increases towards the right and left boundaries of the projection but it does not increase to infinity. Note the Galapagos Islands where the 90° west meridian meets the equator at bottom left.
The map is conformal. Lines intersecting at any specified angle on the ellipsoid project into lines intersecting at the same angle on the projection. In particular parallels and meridians intersect at 90°.
The point scale factor is independent of direction at any point so that the shape of a small region is reasonably well preserved. The necessary condition is that the magnitude of scale factor must not vary too much over the region concerned. Note that while South America is distorted greatly the island of Ceylon is small enough to be reasonably shaped although it is far from the central meridian.
The choice of central meridian greatly affects the appearance of the projection. If 90°W is chosen then the whole of the Americas is reasonable. If 145°E is chosen the Far East is good and Australia is oriented with north up.

In most applications the Gauss–Krüger is applied to a narrow strip near the central meridians where the differences between the spherical and ellipsoidal versions are small, but nevertheless important in accurate mapping. Direct series for scale, convergence and distortion are functions of eccentricity and both latitude and longitude on the ellipsoid: inverse series are functions of eccentricity and both x and y on the projection. In the secant version the lines of true scale on the projection are no longer parallel to central meridian; they curve slightly. The convergence angle between projected meridians and the x constant grid lines is no longer zero (except on the equator) so that a grid bearing must be corrected to obtain a true compass bearing. The difference is small, but not negligible, particularly at high latitudes.

Implementations of the Gauss–Krüger projection

In his 1912 paper Krüger presented two distinct solutions, distinguished here by the expansion parameter:

Krüger–n (paragraphs 5 to 8). Formulae for the direct projection, giving the coordinates x and y, are fourth order expansions in terms of the third flattening, n (the ratio of the difference and sum of the major and minor axes of the ellipsoid). The coefficients are expressed in terms of latitude (φ), longitude (λ), major axis (a) and eccentricity (e). The inverse formulae for φ and λ are also fourth order expansions in n but with coefficients expressed in terms of x, y, a and e. (See Transverse Mercator: flattening series)
Krüger–λ (paragraphs 13 and 14). Formulae giving the projection coordinates x and y are expansions (of orders 5 and 4 respectively) in terms of the longitude λ, expressed in radians: the coefficients are expressed in terms of φ, a and e. The inverse projection for φ and λ are sixth order expansions in terms of the ratio x/a, with coefficients expressed in terms of y, a and e. (See Transverse Mercator: Redfearn series
Transverse Mercator: Redfearn series
The article Transverse Mercator projection restricts itself to general features of the projection. This article describes in detail one of the implementations developed by Louis Krüger in 1912; that expressed as a power series in the longitude difference from the central meridian. These series...

)

The Krüger–λ series were the first to be implemented, possibly because they were much easier to evaluate on the hand calculators of the mid twentieth century.

Lee–Redfearn–OSGB. In 1946 L.P.Lee confirmed the λ expansions of Krüger and proposed their adoption by the OSGB but Redfearn (1948) pointed out that they were not accurate because of (a) the relatively high latitudes of Great Britain and (b) the great width of the area mapped, over 10 degrees of longitude. Redfearn extended the series to eighth order and examined which terms were necessary to attain an accuracy of 1mm (ground measurement). The Redfearn series are still the basis of the OSGB map projections.

Thomas–UTM The λ expansions of Krüger were also confirmed by Paul Thomas in 1952: they are readily available in Snyder. His projection formulae, completely equivalent to those presented by Redfearn, were adopted by the United States Defence Mapping Agency as the basis for the UTM
UTM
UTM is a three-letter abbreviation with multiple meanings, as described below* Ultrasonic Thickness Measurement, using propagation of ultrasound waves to determine the thickness of metals...

. They are also incorporated into the Geotrans coordinate converter made available by the United States National Geospatial-Intelligence Agency http://earth-info.nga.mil/GandG/geotrans/#zzzb1|NGA.

Other countries. The Redfearn series are the basis for geodetic mapping in many countries: Australia, Germany, Canada, South Africa to name but a few. (A list is given in Appendix A.1 of Stuifbergen 2009.)

Many variants of the Redfearn series have been proposed but only those adopted by national cartographic agencies are of importance. For an example of modifications which do not have this status see Transverse Mercator: Bowring series
Transverse Mercator: Bowring series
In 1989 Bernard Russel Bowring gave formulas for the Transverse Mercator that are simpler to program but retain millimeter accuracy. Bowring rewrote the fourth order Redfearn series in a more compact notation by replacing the spherical terms, i.e. those independent of ellipticity, by the exact...

). All such modifications have been eclipsed by the power of modern computers and the development of high order n-series outlined below. The precise Redfearn series, although of low order, cannot be disregarded as they are still enshrined in the quasi-legal definitions of OSGB and UTM etc.

The Krüger–n series are described on the page Transverse Mercator: series in n (third flattening). They have been implemented (to fourth order in n) by the following nations.

France
Finland
Sweden

Higher order versions of the Krüger–n series have been implemented to seventh order by Ensager and Poder and to tenth order by Kawase. Apart from a series expansion for the transformation between latitude and conformal latitude, Karney has implemented the series to thirtieth order.

Exact Gauss-Krüger and accuracy of the truncated series

The exact solution of E. H. Thompson, described by L.P. Lee, is summarized on the page Transverse Mercator: exact solution. It is constructed in terms of elliptic functions (defined in chapters 19 and 22 of the NIST handbook) which can be calculated to arbitrary accuracy using algebraic computing systems such as Maxima. Such an implementation of the exact solution is described by Karney (2011).

The exact solution is a valuable tool in assessing the accuracy of the truncated n and λ series. For example, the original 1912 Krüger–n series compares very favourably with the exact values: they differ by less than 0.31 μm within 1000 km of the central meridian and by less than 1 mm out to 6000 km. On the other hand the difference of the Redfearn series used by Geotrans and the exact solution is less than 1 mm out to a longitude difference of 3 degrees, corresponding to a distance of 334 km from the central meridian at the equator but a mere 35 km at the northern limit of an UTM zone. Thus the Krüger–n series are very much better than the Redfearn λ series.

The Redfearn series become much worse as the zone widens. Karney discusses Greenland as an instructive example. The long thin landmass is centred on 42W and, at its broadest point, is no more than 750 km from that meridian while the span in longitude reaches almost 50 degrees. Krüger–n is accurate to within 1mm but the Redfearn version of the Krüger–λ series has a maximum error of 1 kilometre.

Karney's own 8th order (in n) series is accurate to 5 nm within 3900 km of the central meridian.

Spherical normal Mercator revisited

The normal cylindrical projections are described in relation to a cylinder tangential at the equator with axis along the polar axis of the sphere. The cylindrical projections are constructed so that all points on a meridian are projected to points with

and

a prescribed function of

. For a tangent Normal Mercator projection the (unique) formulae which guarantee conformality are:

Conformality implies that the point scale

Scale (map)

The scale of a map is defined as the ratio of a distance on the map to the corresponding distance on the ground.If the region of the map is small enough for the curvature of the Earth to be neglected, then the scale may be taken as a constant ratio over the whole map....

, is independent of direction: it is a function of latitude only:

For the secant version of the projection there is a factor of

on the right hand side of all these equations: this ensures that the scale is equal to

on the equator.

Normal and transverse graticules

The figure on the left shows how a transverse cylinder is related to the conventional graticule on the sphere. It is tangential to some arbitrarily chosen meridian and its axis is perpendicular to that of the sphere. The

and

axes defined on the figure are related to the equator and central meridian exactly as they are for the normal projection. In the figure on the right a rotated graticule is related to the transverse cylinder in the same way that the normal cylinder is related to the standard graticule. The 'equator', 'poles' (E and W) and 'meridians' of the rotated graticule are identified with the chosen central meridian, points on the equator 90 degrees east and west of the central meridian, and great circles through those points.
The position of an arbitrary point

on the standard graticule can also be identified in terms of angles on the rotated graticule:

(angle M'CP) is an effective latitude and

(angle M'CO) becomes an effective longitude. (The minus sign is necessary so that

are related to the rotated graticule in the same way that

are related to the standard graticule). The Cartesian

axes are related to the rotated graticule in the same way that the axes

axes are related to the standard graticule.

The tangent transverse Mercator projection defines the coordinates

in terms of

and

by the transformation formulae of the tangent Normal Mercator projection:

This transformation projects the central meridian to a straight line of finite length and at the same time projects the great circles through E and W (which include the equator) to infinite straight lines perpendicular to the central meridian. The true parallels and meridians (other than equator and central meridian) have no simple relation to the rotated graticule and they project to complicated curves.

The relation between the graticules

The angles of the two graticules are related by using spherical trigonometry on the spherical triangle NM'P defined by the true meridian through the origin, OM'N, the true meridian through an arbitrary point, MPN, and the great circle WM'PE. The results are:

Direct transformation formulae

The direct formulae giving the Cartesian coordinates

follow immediately from the above. Setting

and

(and restoring factors of

to accommodate secant versions)

The above expressions are given in Lambert and also (without derivations) in Snyder, Maling and online (with full details).

Inverse transformation formulae

Inverting the above equations gives

Point scale

In terms of the coordinates with respect to the rotated graticule the point scale

Scale (map)

factor is given by

: this may be expressed either in terms of the geographical coordinates or in terms of the projection coordinates:

The second expression shows that the scale factor is simply a function of the distance from the central meridian of the projection. A typical value of the scale factor is

so that

when

is approximately 180 km. When

is approximately 255 km and

: the scale factor is within 0.04% of unity over a strip of about 510 km wide.

Convergence

The convergence angle

at a point on the projection is defined by the angle measured from the projected meridian, which defines true north, to a grid line of constant x, defining grid north. Therefore

is positive in the quadrant north of the equator and east of the central meridian and also in the quadrant south of the equator and west of the central meridian. The convergence must be added to a grid bearing to obtain a compass bearing from true north. For the secant transverse Mercator the convergence may be expressed either in terms of the geographical coordinates or in terms of the projection coordinates:

Formulae for the ellipsoidal transverse Mercator

The details of actual implementations of the Gauss-Kruger series in longitude may be found at:

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