In mathematics, a square root of a number is a number such that
y2=x
y ⋅ y
42=(-4)2=16
Every nonnegative real number has a unique nonnegative square root, called the principal square root or simply the square root (with a definite article, see below), which is denoted by
\sqrt{x},
\sqrt{~~}
\sqrt{9}=3
x1/2
Every positive number has two square roots:
\sqrt{x}
-\sqrt{x}
\pm\sqrt{x}
Square roots of negative numbers can be discussed within the framework of complex numbers. More generally, square roots can be considered in any context in which a notion of the "square" of a mathematical object is defined. These include function spaces and square matrices, among other mathematical structures.
The Yale Babylonian Collection clay tablet YBC 7289 was created between 1800 BC and 1600 BC, showing
\sqrt{2}
The Rhind Mathematical Papyrus is a copy from 1650 BC of an earlier Berlin Papyrus and other textspossibly the Kahun Papyrusthat shows how the Egyptians extracted square roots by an inverse proportion method.[6]
In Ancient India, the knowledge of theoretical and applied aspects of square and square root was at least as old as the Sulba Sutras, dated around 800–500 BC (possibly much earlier).[7] A method for finding very good approximations to the square roots of 2 and 3 are given in the Baudhayana Sulba Sutra.[8] Apastamba who was dated around 600 BCE has given a strikingly accurate value for
\sqrt{2}
It was known to the ancient Greeks that square roots of positive integers that are not perfect squares are always irrational numbers: numbers not expressible as a ratio of two integers (that is, they cannot be written exactly as
| m | |
| n |
In the Chinese mathematical work Writings on Reckoning, written between 202 BC and 186 BC during the early Han dynasty, the square root is approximated by using an "excess and deficiency" method, which says to "...combine the excess and deficiency as the divisor; (taking) the deficiency numerator multiplied by the excess denominator and the excess numerator times the deficiency denominator, combine them as the dividend."[17]
A symbol for square roots, written as an elaborate R, was invented by Regiomontanus (1436–1476). An R was also used for radix to indicate square roots in Gerolamo Cardano's Ars Magna.[18]
According to historian of mathematics D.E. Smith, Aryabhata's method for finding the square root was first introduced in Europe by Cataneo—in 1546.
According to Jeffrey A. Oaks, Arabs used the letter jīm/ĝīm (Arabic: ج), the first letter of the word "Arabic: جذر" (variously transliterated as jaḏr, jiḏr, ǧaḏr or ǧiḏr, "root"), placed in its initial form (Arabic: ﺟ) over a number to indicate its square root. The letter jīm resembles the present square root shape. Its usage goes as far as the end of the twelfth century in the works of the Moroccan mathematician Ibn al-Yasamin.[19]
The symbol "√" for the square root was first used in print in 1525, in Christoph Rudolff's Coss.[20]
The principal square root function
f(x)=\sqrt{x}
The square root of is rational if and only if is a rational number that can be represented as a ratio of two perfect squares. (See square root of 2 for proofs that this is an irrational number, and quadratic irrational for a proof for all non-square natural numbers.) The square root function maps rational numbers into algebraic numbers, the latter being a superset of the rational numbers).
For all real numbers, (see absolute value).
For all nonnegative real numbers and,and
The square root function is continuous for all nonnegative, and differentiable for all positive . If denotes the square root function, whose derivative is given by:
The Taylor series of
\sqrt{1+x}
The square root of a nonnegative number is used in the definition of Euclidean norm (and distance), as well as in generalizations such as Hilbert spaces. It defines an important concept of standard deviation used in probability theory and statistics. It has a major use in the formula for roots of a quadratic equation; quadratic fields and rings of quadratic integers, which are based on square roots, are important in algebra and have uses in geometry. Square roots frequently appear in mathematical formulas elsewhere, as well as in many physical laws.
A positive number has two square roots, one positive, and one negative, which are opposite to each other. When talking of the square root of a positive integer, it is usually the positive square root that is meant.
The square roots of an integer are algebraic integers—more specifically quadratic integers.
The square root of a positive integer is the product of the roots of its prime factors, because the square root of a product is the product of the square roots of the factors. Since only roots of those primes having an odd power in the factorization are necessary. More precisely, the square root of a prime factorization is
The square roots of the perfect squares (e.g., 0, 1, 4, 9, 16) are integers. In all other cases, the square roots of positive integers are irrational numbers, and hence have non-repeating decimals in their decimal representations. Decimal approximations of the square roots of the first few natural numbers are given in the following table.
\sqrt{n}, | ||
|---|---|---|
| 0 | 0 | |
| 1 | 1 | |
| 2 | ||
| 3 | ||
| 4 | 2 | |
| 5 | ||
| 6 | ||
| 7 | ||
| 8 | ||
| 9 | 3 | |
| 10 |
As with before, the square roots of the perfect squares (e.g., 0, 1, 4, 9, 16) are integers. In all other cases, the square roots of positive integers are irrational numbers, and therefore have non-repeating digits in any standard positional notation system.
The square roots of small integers are used in both the SHA-1 and SHA-2 hash function designs to provide nothing up my sleeve numbers.
One of the most intriguing results from the study of irrational numbers as continued fractions was obtained by Joseph Louis Lagrange . Lagrange found that the representation of the square root of any non-square positive integer as a continued fraction is periodic. That is, a certain pattern of partial denominators repeats indefinitely in the continued fraction. In a sense these square roots are the very simplest irrational numbers, because they can be represented with a simple repeating pattern of integers.
\sqrt{2} | = [1; 2, 2, ...] | |
\sqrt{3} | = [1; 1, 2, 1, 2, ...] | |
\sqrt{4} | = [2] | |
\sqrt{5} | = [2; 4, 4, ...] | |
\sqrt{6} | = [2; 2, 4, 2, 4, ...] | |
\sqrt{7} | = [2; 1, 1, 1, 4, 1, 1, 1, 4, ...] | |
\sqrt{8} | = [2; 1, 4, 1, 4, ...] | |
\sqrt{9} | = [3] | |
\sqrt{10} | = [3; 6, 6, ...] | |
\sqrt{11} | = [3; 3, 6, 3, 6, ...] | |
\sqrt{12} | = [3; 2, 6, 2, 6, ...] | |
\sqrt{13} | = [3; 1, 1, 1, 1, 6, 1, 1, 1, 1, 6, ...] | |
\sqrt{14} | = [3; 1, 2, 1, 6, 1, 2, 1, 6, ...] | |
\sqrt{15} | = [3; 1, 6, 1, 6, ...] | |
\sqrt{16} | = [4] | |
\sqrt{17} | = [4; 8, 8, ...] | |
\sqrt{18} | = [4; 4, 8, 4, 8, ...] | |
\sqrt{19} | = [4; 2, 1, 3, 1, 2, 8, 2, 1, 3, 1, 2, 8, ...] | |
\sqrt{20} | = [4; 2, 8, 2, 8, ...] |
The square bracket notation used above is a short form for a continued fraction. Written in the more suggestive algebraic form, the simple continued fraction for the square root of 11, [3; 3, 6, 3, 6, ...], looks like this:
where the two-digit pattern repeats over and over again in the partial denominators. Since, the above is also identical to the following generalized continued fractions:
See main article: article and Methods of computing square roots. Square roots of positive numbers are not in general rational numbers, and so cannot be written as a terminating or recurring decimal expression. Therefore in general any attempt to compute a square root expressed in decimal form can only yield an approximation, though a sequence of increasingly accurate approximations can be obtained.
Most pocket calculators have a square root key. Computer spreadsheets and other software are also frequently used to calculate square roots. Pocket calculators typically implement efficient routines, such as the Newton's method (frequently with an initial guess of 1), to compute the square root of a positive real number.[21] [22] When computing square roots with logarithm tables or slide rules, one can exploit the identitieswhere and are the natural and base-10 logarithms.
By trial-and-error,[23] one can square an estimate for
\sqrt{a}
The most common iterative method of square root calculation by hand is known as the "Babylonian method" or "Heron's method" after the first-century Greek philosopher Heron of Alexandria, who first described it.[24] The method uses the same iterative scheme as the Newton–Raphson method yields when applied to the function, using the fact that its slope at any point is, but predates it by many centuries.[25] The algorithm is to repeat a simple calculation that results in a number closer to the actual square root each time it is repeated with its result as the new input. The motivation is that if is an overestimate to the square root of a nonnegative real number then will be an underestimate and so the average of these two numbers is a better approximation than either of them. However, the inequality of arithmetic and geometric means shows this average is always an overestimate of the square root (as noted below), and so it can serve as a new overestimate with which to repeat the process, which converges as a consequence of the successive overestimates and underestimates being closer to each other after each iteration. To find :
That is, if an arbitrary guess for
\sqrt{a}
\sqrt{a}
\sqrt{0}=0
Using the identitythe computation of the square root of a positive number can be reduced to that of a number in the range . This simplifies finding a start value for the iterative method that is close to the square root, for which a polynomial or piecewise-linear approximation can be used.
The time complexity for computing a square root with digits of precision is equivalent to that of multiplying two -digit numbers.
Another useful method for calculating the square root is the shifting nth root algorithm, applied for .
The name of the square root function varies from programming language to programming language, with sqrt[26] (often pronounced "squirt" [27]) being common, used in C and derived languages like C++, JavaScript, PHP, and Python.
The right side (as well as its negative) is indeed a square root of, since
For every non-zero complex number there exist precisely two numbers such that : the principal square root of (defined below), and its negative.
To find a definition for the square root that allows us to consistently choose a single value, called the principal value, we start by observing that any complex number
x+iy
(x,y),
(r,\varphi),
r\geq0
\varphi
x
rei\varphi.
z
z
\varphi=0
z
\sqrt{r}ei=\sqrt{r};
-\pi<\varphi\leq\pi
z=-2i
\varphi=-\pi/2
\tilde{\varphi}:=\varphi+2\pi=3\pi/2
\sqrt{2}ei\tilde{\varphi/2}=\sqrt{2}ei(3\pi/4)=-1+i=-\sqrt{-2i}.
The principal square root function is holomorphic everywhere except on the set of non-positive real numbers (on strictly negative reals it is not even continuous). The above Taylor series for
\sqrt{1+x}
x
|x|<1.
The above can also be expressed in terms of trigonometric functions:
When the number is expressed using its real and imaginary parts, the following formula can be used for the principal square root:[28] [29]
where if and otherwise.[30] In particular, the imaginary parts of the original number and the principal value of its square root have the same sign. The real part of the principal value of the square root is always nonnegative.
For example, the principal square roots of are given by:
In the following, the complex and may be expressed as:
z=|z|
| i\thetaz | |
| e |
w=|w|
| i\thetaw | |
| e |
where
-\pi<\thetaz\le\pi
-\pi<\thetaw\le\pi
Because of the discontinuous nature of the square root function in the complex plane, the following laws are not true in general.
\sqrt{zw}=\sqrt{z}\sqrt{w}
-\pi<\thetaz+\thetaw\le\pi
| \sqrt{w | |
-\pi<\thetaw-\thetaz\le\pi
\sqrt{z*}=\left(\sqrtz\right)*
\thetaz\ne\pi
A similar problem appears with other complex functions with branch cuts, e.g., the complex logarithm and the relations or which are not true in general.
Wrongly assuming one of these laws underlies several faulty "proofs", for instance the following one showing that :
The third equality cannot be justified (see invalid proof).[31] It can be made to hold by changing the meaning of √ so that this no longer represents the principal square root (see above) but selects a branch for the square root that contains
\sqrt{1} ⋅ \sqrt{-1}.
\sqrt{1}=-1,
The definition of a square root of
x
y
y2=x
A cube root of
x
y
y3=x
\sqrt[3]x.
If is an integer greater than two, a -th root of
x
y
yn=x
\sqrt[n]x.
Given any polynomial, a root of is a number such that . For example, the th roots of are the roots of the polynomial (in)
yn-x.
Abel–Ruffini theorem states that, in general, the roots of a polynomial of degree five or higher cannot be expressed in terms of th roots.
See main article: article and Square root of a matrix.
See also: Square root of a 2 by 2 matrix.
If A is a positive-definite matrix or operator, then there exists precisely one positive definite matrix or operator B with ; we then define . In general matrices may have multiple square roots or even an infinitude of them. For example, the identity matrix has an infinity of square roots,[32] though only one of them is positive definite.
Each element of an integral domain has no more than 2 square roots. The difference of two squares identity is proved using the commutativity of multiplication. If and are square roots of the same element, then . Because there are no zero divisors this implies or, where the latter means that two roots are additive inverses of each other. In other words if an element a square root of an element exists, then the only square roots of are and . The only square root of 0 in an integral domain is 0 itself.
In a field of characteristic 2, an element either has one square root or does not have any at all, because each element is its own additive inverse, so that . If the field is finite of characteristic 2 then every element has a unique square root. In a field of any other characteristic, any non-zero element either has two square roots, as explained above, or does not have any.
Given an odd prime number, let for some positive integer . A non-zero element of the field with elements is a quadratic residue if it has a square root in . Otherwise, it is a quadratic non-residue. There are quadratic residues and quadratic non-residues; zero is not counted in either class. The quadratic residues form a group under multiplication. The properties of quadratic residues are widely used in number theory.
Unlike in an integral domain, a square root in an arbitrary (unital) ring need not be unique up to sign. For example, in the ring
Z/8Z
Another example is provided by the ring of quaternions
H,
A square root of 0 is either 0 or a zero divisor. Thus in rings where zero divisors do not exist, it is uniquely 0. However, rings with zero divisors may have multiple square roots of 0. For example, in
Z/n2Z,
The square root of a positive number is usually defined as the side length of a square with the area equal to the given number. But the square shape is not necessary for it: if one of two similar planar Euclidean objects has the area a times greater than another, then the ratio of their linear sizes is
\sqrt{a}
A square root can be constructed with a compass and straightedge. In his Elements, Euclid (fl. 300 BC) gave the construction of the geometric mean of two quantities in two different places: Proposition II.14 and Proposition VI.13. Since the geometric mean of a and b is
\sqrt{ab}
\sqrt{a}
The construction is also given by Descartes in his La Géométrie, see figure 2 on page 2. However, Descartes made no claim to originality and his audience would have been quite familiar with Euclid.
Euclid's second proof in Book VI depends on the theory of similar triangles. Let AHB be a line segment of length with and . Construct the circle with AB as diameter and let C be one of the two intersections of the perpendicular chord at H with the circle and denote the length CH as h. Then, using Thales' theorem and, as in the proof of Pythagoras' theorem by similar triangles, triangle AHC is similar to triangle CHB (as indeed both are to triangle ACB, though we don't need that, but it is the essence of the proof of Pythagoras' theorem) so that AH:CH is as HC:HB, i.e., from which we conclude by cross-multiplication that, and finally that
h=\sqrt{ab}
Another method of geometric construction uses right triangles and induction:
\sqrt{1}
\sqrt{x}
\sqrt{x}
\sqrt{x+1}