The number 1 is the first natural number after
0. Each
natural number, including 1, is constructed by
succession, that is, by adding 1 to the previous natural number. The number 1 is the
multiplicative identity of the
integers,
real numbers, and
complex numbers, that is, any number n multiplied by 1 remains unchanged 1\times n = n\times 1 = n. As a result, the
square 1^2=1,
square root \sqrt{1} = 1, and any other power of 1 is always equal to 1 itself. 1 is its own
factorial 1!=1, and 0! is also 1. These are a special case of the
empty product. Although 1 meets the naïve definition of a
prime number, being evenly divisible only by 1 and itself (also 1), by modern convention it is regarded as neither a
prime nor a
composite number. Different mathematical constructions of the natural numbers represent 1 in various ways. In
Giuseppe Peano's original formulation of the
Peano axioms, a set of postulates to define the natural numbers in a precise and logical way, 1 was treated as the starting point of the sequence of natural numbers. Peano later revised his axioms to begin the sequence with 0. In the
Von Neumann cardinal assignment of natural numbers, where each number is defined as a
set that contains all numbers before it, 1 is represented as the
singleton \{0\}, a set containing only the element 0. The
unary numeral system, as used in
tallying, is an example of a "base-1" number system, since only one mark – the tally itself – is needed. While this is the simplest way to represent the natural numbers, base-1 is rarely used as a practical base for
counting due to its difficult readability. In many mathematical and engineering problems, numeric values are typically
normalized to fall within the
unit interval [0,1], where 1 represents the maximum possible value. For example, by definition 1 is the
probability of an event that is absolutely or
almost certain to occur. Likewise,
vectors are often normalized into
unit vectors (i.e., vectors of magnitude one), because these often have more desirable properties. Functions are often normalized by the condition that they have
integral one, maximum value one, or
square integral one, depending on the application. 1 is the value of
Legendre's constant, introduced in 1808 by
Adrien-Marie Legendre to express the
asymptotic behavior of the
prime-counting function. The
Weil's conjecture on Tamagawa numbers states that the
Tamagawa number \tau(G), a geometrical measure of a connected linear
algebraic group over a global
number field, is 1 for all simply connected groups (those that are
path-connected with no '
holes'). 1 is the most common leading digit in many sets of real-world numerical data. This is a consequence of
Benford’s law, which states that the probability for a specific leading digit d is \log_{10} \left(\frac{d+1}{d} \right) . The tendency for real-world numbers to grow exponentially or logarithmically biases the distribution towards smaller leading digits, with 1 occurring approximately 30% of the time. == As a word ==