The word "isoperimetrical" is spelled with the prefix "iso-" meaning equal, the root word "perimetre" meaning circumference or boundary, and the suffix "-ical" meaning pertaining to or relating to. The phonetic transcription of this word is /ˌaɪsəʊpərɪˈmɛtrɪkəl/. The stress falls on the third syllable "-per-", and each syllable is pronounced clearly. This word is often used in mathematical contexts to describe a shape with an equal perimeter. Though difficult to spell, it is an important term for professionals in this field to know.
Isoperimetrical is an adjective used to describe a geometric property whereby two or more different figures or shapes have an equal perimeter or circumference. The term is derived from the combination of two words: "iso," meaning equal, and "perimetrical," referring to the perimeter or the boundary of a figure.
In the field of mathematics and geometry, isoperimetrical problems often involve finding a shape or figure with the maximum area or volume while maintaining a fixed perimeter or circumference. In other words, the objective is to determine the shape that can enclose the largest possible area given a specific boundary length.
Isoperimetrical problems have been a subject of study and fascination for mathematicians since ancient times. The most famous isoperimetrical problem is the isoperimetric inequality, which states that among all closed curves with the same length, the circle has the largest enclosed area. This principle, known as the isoperimetric theorem, was proven by the Greek mathematician, Isoperimetrical Definition: Measuring or comparing the areas of geometrical figures having equal perimeters (Source: Google).
Of equal perimeter or circumference.
Etymological and pronouncing dictionary of the English language. By Stormonth, James, Phelp, P. H. Published 1874.
The word "isoperimetrical" is derived from two Greek roots: "iso-" meaning "equal" and "perimetros" meaning "perimeter". In Greek, "isos" means "equal" and "perimetron" means "that which is measured around". When combined, these roots form the word "isoperimetrical", which is used to describe a geometric figure with an equal perimeter.