Cube (algebra)


In arithmetic and algebra, the cube of a number is its third power, that is, the result of multiplying three instances of together.
The cube of a number or any other mathematical expression is denoted by a superscript 3, for example or.
The cube is also the number multiplied by its square:
The cube function is the function that maps a number to its cube. It is an odd function, as
The volume of a geometric cube is the cube of its side length, giving rise to the name. The inverse operation that consists of finding a number whose cube is is called extracting the cube root of. It determines the side of the cube of a given volume. It is also raised to the one-third power.
The graph of the cube function is known as the cubic parabola. Because cube is an odd function, this curve has a center of symmetry at the origin, but no axis of symmetry.

In integers

A cube number, or a perfect cube, or sometimes just a cube, is a number which is the cube of an integer.
The perfect cubes up to 603 are :
Geometrically speaking, a positive integer is a perfect cube if and only if one can arrange solid unit cubes into a larger, solid cube. For example, 27 small cubes can be arranged into one larger one with the appearance of a Rubik's Cube, since.
The difference between the cubes of consecutive integers can be expressed as follows:
or
There is no minimum perfect cube, since the cube of a negative integer is negative. For example,.

Base ten

Unlike perfect squares, perfect cubes do not have a small number of possibilities for the last two digits. Except for cubes divisible by 5, where only 25, 75 and 00 can be the last two digits, any pair of digits with the last digit odd can be a perfect cube. With even cubes, there is considerable restriction, for only 00, 2, 4, 6 and 8 can be the last two digits of a perfect cube. Some cube numbers are also square numbers; for example, 64 is a square number and a cube number. This happens if and only if the number is a perfect sixth power.
The last digits of each 3rd power are:
It is, however, easy to show that most numbers are not perfect cubes because all perfect cubes must have digital root 1, 8 or 9. That is their values modulo 9 may be only −1, 1 and 0. Moreover, the digital root of any number's cube can be determined by the remainder the number gives when divided by 3:
Every positive integer can be written as the sum of nine positive cubes. This upper limit of nine cubes cannot be reduced because, for example, 23 cannot be written as the sum of fewer than nine positive cubes:

Sums of three cubes

It is conjectured that every integer not congruent to modulo can be written as a sum of three cubes with infinitely many ways. For example,. Integers congruent to modulo are excluded because they cannot be written as the sum of three cubes.
The smallest such integer for which such a sum is not known is 114. In September 2019, the previous smallest such integer with no known 3-cube sum, 42, was found to satisfy this equation:
One solution to is given in the table below for, and not congruent to or modulo. The selected solution is the one that is primitive, is not of the form, satisfies, and has minimal values for and .
Only primitive solutions are selected since the non-primitive ones can be trivially deduced from solutions for a smaller value of. For example, for, the solution results from the solution by multiplying everything by Therefore, this is another solution that is selected. Similarly, for, the solution is excluded, and this is the solution that is selected.
nxyznxyz
1910−1239117367134476−159380
2011421260212329733563180435758145817515−80538738812075974
311143223
6−1−1244−5−78
70−12452−34
8915−1646−233
90124767−8
1011248−23−2631
11−2−2351602659−796
12710−11522396129245460702901317−61922712865
15−12253−133
16−511−1609162654−7−1112
1712255133
18−1−2356−11−2122
190−23571−24
201−2360−1−45
21−11−1416610−45
24−2901096694−155505555551558413982762233
25−1−13630−14
260−1364−3−56
27−4−5665014
2801366114
29113692−45
30−283059965−22188885172220422932701120−21
33−2736111468807040−8778405442862239886612897528752871−124
34−1237279−10
3502373124
361237466229832190556283450105697727−284650292555885
370−34754381159435203083−435203231
381−34782653−55

Fermat's last theorem for cubes

The equation has no non-trivial solutions in integers. In fact, it has none in Eisenstein integers.
Both of these statements are also true for the equation.

Sum of first ''n'' cubes

The sum of the first cubes is the th triangle number squared:
Proofs.
gives a particularly simple derivation, by expanding each cube in the sum into a set of consecutive odd numbers. He begins by giving the identity
That identity is related to triangular numbers in the following way:
and thus the summands forming start off just after those forming all previous values up to.
Applying this property, along with another well-known identity:
we obtain the following derivation:
In the more recent mathematical literature, uses the rectangle-counting interpretation of these numbers to form a geometric proof of the identity ; he observes that it may also be proved easily by induction, and states that provides "an interesting old Arabic proof". provides a purely visual proof, provide two additional proofs, and gives seven geometric proofs.
For example, the sum of the first 5 cubes is the square of the 5th triangular number,
A similar result can be given for the sum of the first odd cubes,
but, must satisfy the negative Pell equation. For example, for and, then,
and so on. Also, every even perfect number, except the lowest, is the sum of the first power of two| odd cubes :

Sum of cubes of numbers in arithmetic progression

There are examples of cubes of numbers in arithmetic progression whose sum is a cube:
with the first one sometimes identified as the mysterious Plato's number. The formula for finding the sum of
cubes of numbers in arithmetic progression with common difference and initial cube,
is given by
A parametric solution to
is known for the special case of, or consecutive cubes, but only sporadic solutions are known for integer, such as = 2, 3, 5, 7, 11, 13, 37, 39, etc.

Cubes as sums of successive odd integers

In the sequence of odd integers 1, 3, 5, 7, 9, 11, 13, 15, 17, 19,..., the first one is a cube ; the sum of the next two is the next cube ; the sum of the next three is the next cube ; and so forth.

In rational numbers

Every positive rational number is the sum of three positive rational cubes, and there are rationals that are not the sum of two rational cubes.

In real numbers, other fields, and rings

In real numbers, the cube function preserves the order: larger numbers have larger cubes. In other words, cubes monotonically increase. Also, its codomain is the entire real line: the function is a surjection. Only three numbers are equal to their own cubes:,, and. If or, then. If or, then. All aforementioned properties pertain also to any higher odd power of real numbers. Equalities and inequalities are also true in any ordered ring.
Volumes of similar Euclidean solids are related as cubes of their linear sizes.
In complex numbers, the cube of a purely imaginary number is also purely imaginary. For example,.
The derivative of equals.
Cubes occasionally have the surjective property in other fields, such as in finite field| for such prime that, but not necessarily: see the counterexample with rationals [|above]. Also in only three elements 0, ±1 are perfect cubes, of seven total. −1, 0, and 1 are perfect cubes anywhere and the only elements of a field equal to the own cubes:.

History

Determination of the cubes of large numbers was very common in many ancient civilizations. Mesopotamian mathematicians created cuneiform tablets with tables for calculating cubes and cube roots by the Old Babylonian period. Cubic equations were known to the ancient Greek mathematician Diophantus. Hero of Alexandria devised a method for calculating cube roots in the 1st century CE. Methods for solving cubic equations and extracting cube roots appear in The Nine Chapters on the Mathematical Art, a Chinese mathematical text compiled around the 2nd century BCE and commented on by Liu Hui in the 3rd century CE.