Editing Nomogram (section)

{{Short description|Analog graphical calculator}}
{{about|the type of graphical calculator|the type of puzzle|Nonogram|the type of motif|Monogram}}

[[Image:Parallel Scale Nomogram.svg|right|400px|thumb|A typical parallel-scale nomogram. This example calculates the value of T when S = 7.30 and R = 1.17 are substituted into the equation. The isopleth crosses the scale for T at just under 4.65.]]

A '''nomogram''' ({{ety|el|''νόμος'' (nomos)|law||''γράμμα'' ([[wikt:-gram#English|gramma]])|that which is drawn}}), also called a '''nomograph''', '''alignment chart''', or '''abac''', is a graphical [[Analog computer|calculating device]], a two-dimensional diagram designed to allow the approximate graphical computation of a [[Function (mathematics)|mathematical function]]. The field of nomography was invented in 1884 by the French engineer [[Philbert Maurice d'Ocagne]] (1862–1938) and used extensively for many years to provide engineers with fast graphical calculations of complicated formulas to a practical precision. Nomograms use a parallel [[coordinate system]] invented by d'Ocagne rather than standard [[Cartesian coordinates]].

A nomogram consists of a set of n scales, one for each variable in an equation. Knowing the values of n-1 variables, the value of the unknown variable can be found, or by fixing the values of some variables, the relationship between the unfixed ones can be studied. The result is obtained by laying a straightedge across the known values on the scales and reading the unknown value from where it crosses the scale for that variable. The virtual or drawn line created by the straightedge is called an ''index line'' or ''isopleth''.

Nomograms flourished in many different contexts for roughly 75 years because they allowed quick and accurate computations before the age of pocket calculators. Results from a nomogram are obtained very quickly and reliably by simply drawing one or more lines. The user does not have to know how to solve algebraic equations, look up data in tables, use a [[slide rule]], or substitute numbers into equations to obtain results. The user does not even need to know the underlying equation the nomogram represents. In addition, nomograms naturally incorporate implicit or explicit [[domain knowledge]] into their design. For example, to create larger nomograms for greater accuracy the nomographer usually includes only scale ranges that are reasonable and of interest to the problem. Many nomograms include other useful markings such as reference labels and colored regions. All of these provide useful guideposts to the user.

[[Image:Smith chart gen.svg|right|thumbnail|250px|A [[Smith chart]] to calculate [[electrical impedance]] with no values plotted; although not a nomogram, it is based on similar principles]]
Like a slide rule, a nomogram is a graphical analog computation device. Also like a slide rule, its accuracy is limited by the precision with which physical markings can be drawn, reproduced, viewed, and aligned. Unlike the slide rule, which is a general-purpose computation device, a nomogram is designed to perform a specific calculation with tables of values built into the device's  [[Scale (ratio)|scales]]. Nomograms are typically used in applications for which the level of accuracy they provide is sufficient and useful. Alternatively, a nomogram can be used to check an answer obtained by a more exact but error-prone calculation.

Other types of graphical calculators—such as '''intercept charts''', '''trilinear diagrams''', and '''hexagonal charts'''—are sometimes called nomograms. These devices do not meet the definition of a nomogram as a graphical calculator whose solution is found by the use of one or more linear isopleths.