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The exponential factorial is a positive integer n raised to the power of n − 1, ... 262144 is an exponential factorial since ... notation and conventions
The acronym's procedural application does not match experts' intuitive understanding of mathematical notation: mathematical notation indicates groupings in ways other than parentheses or brackets and a mathematical expression is a tree-like hierarchy rather than a linearly "ordered" structure; furthermore, there is no single order by which ...
In scientific notation, it is written as 10 5. Terms for 100,000. ... 262,144 = 2 18; exponential factorial of 4; [40] a superperfect number [41] 262,468 = Leyland ...
Nicolas Chuquet used a form of exponential notation in the 15th century, for example 12 2 to represent 12x 2. [11] This was later used by Henricus Grammateus and Michael Stifel in the 16th century. In the late 16th century, Jost Bürgi would use Roman numerals for exponents in a way similar to that of Chuquet, for example iii 4 for 4 x 3 .
262,144 bits (32 kibibytes) - RAM capacity of Matra Alice 90: 393,216 bits (48 kibibytes) - RAM capacity of 48K ZX Spectrum: 506 kilobits – approximate size of this article as of 20 May 2019 2 19: 524,288 bits (64 kibibytes) – RAM capacity of popular 8-bit computers like the C-64, Amstrad CPC etc. 10 6: megabit (Mbit) 1,000,000 bits 2 20 ...
In scientific notation, this is written 9.109 383 56 × 10 −31 kg. The Earth's mass is about 5 972 400 000 000 000 000 000 000 kg. [21] In scientific notation, this is written 5.9724 × 10 24 kg. The Earth's circumference is approximately 40 000 000 m. [22] In scientific notation, this is 4 × 10 7 m. In engineering notation, this is written ...
Two to the power of n, written as 2 n, is the number of values in which the bits in a binary word of length n can be set, where each bit is either of two values. A word, interpreted as representing an integer in a range starting at zero, referred to as an "unsigned integer", can represent values from 0 (000...000 2) to 2 n − 1 (111...111 2) inclusively.
An example of a probable prime of this form is 200 262144 + 119 262144 (found by Kellen Shenton). [16] By analogy with the ordinary Fermat numbers, it is common to write generalized Fermat numbers of the form + as F n (a). In this notation, for instance, the number 100,000,001 would be written as F 3 (10).