Seven, the fourth prime number, is not only a
Mersenne prime (since 2^3 - 1 = 7) but also a
double Mersenne prime since the exponent, 3, is itself a Mersenne prime. It is also a
Newman–Shanks–Williams prime, a
Woodall prime, a
factorial prime, a
Harshad number, a
lucky prime, a
happy number (happy prime), a
safe prime (the only ), a
sexy prime, a
Leyland number of the second kind and
Leyland prime of the second kind and the fourth
Heegner number. Seven is the lowest natural number that cannot be represented as the sum of the squares of three integers. A seven-sided shape is a
heptagon. The
regular n-gons for
n ⩽ 6 can be constructed by
compass and straightedge alone, which makes the heptagon the first regular polygon that cannot be directly constructed with these simple tools. 7 is the only number
D for which the equation has more than two solutions for
n and
x natural. In particular, the equation is known as the
Ramanujan–Nagell equation. 7 is one of seven numbers in the positive
definite quadratic integer matrix representative of all
odd numbers: {1, 3, 5, 7, 11, 15, 33}. There are 7
frieze groups in two dimensions, consisting of
symmetries of the
plane whose group of
translations is
isomorphic to the group of
integers. These are related to the
17 wallpaper groups whose transformations and
isometries repeat two-dimensional patterns in the plane. A heptagon in
Euclidean space is unable to generate
uniform tilings alongside other polygons, like the regular
pentagon. However, it is one of fourteen polygons that can fill a
plane-vertex tiling, in its case only alongside a regular
triangle and a 42-sided polygon (
3.7.42). Otherwise, for any regular
n-sided polygon, the maximum number of intersecting diagonals (other than through its center) is at most 7. In two dimensions, there are precisely seven
7-uniform Krotenheerdt tilings, with no other such
k-uniform tilings for
k > 7, and it is also the only
k for which the count of
Krotenheerdt tilings agrees with
k. The
Fano plane, the smallest possible
finite projective plane, has 7 points and 7 lines arranged such that every line contains 3 points and 3 lines cross every point. This is related to other appearances of the number seven in relation to
exceptional objects, like the fact that the
octonions contain seven distinct square roots of −1,
seven-dimensional vectors have a
cross product, and the number of
equiangular lines possible in seven-dimensional space is anomalously large. The lowest known dimension for an
exotic sphere is the seventh dimension. In
hyperbolic space, 7 is the highest dimension for non-simplex
hypercompact Vinberg polytopes of rank
n + 4 mirrors, where there is one unique figure with eleven
facets. On the other hand, such figures with rank
n + 3 mirrors exist in dimensions 4, 5, 6 and 8;
not in 7. There are seven fundamental types of
catastrophes. When rolling two standard six-sided
dice, seven has a 1 in 6 probability of being rolled, the greatest of any number. The opposite sides of a standard six-sided die always add to 7. The
Millennium Prize Problems are seven problems in
mathematics that were stated by the
Clay Mathematics Institute in 2000. Currently, six of the problems remain
unsolved.
Basic calculations Decimal calculations divided by 7 is exactly . Therefore, when a
vulgar fraction with 7 in the
denominator is converted to a
decimal expansion, the result has the same six-
digit repeating sequence after the decimal point, but the sequence can start with any of those six digits. In
decimal representation, the
reciprocal of 7 repeats six
digits (as 0.), whose sum when
cycling back to
1 is equal to 28. == In science ==