Random article ( of 1127 ) Latest updates

User Tools

Site Tools


content / mathematics / brocards_conjecture

Wikenigma - an Encyclopedia of Unknowns Wikenigma - an Encyclopedia of the Unknown

Brocard's conjecture

Brocard's conjecture asserts that there are at least four prime numbers between (pn)2 and (pn+1)2, where pn is the nth prime number, for every n ≥ 2.

It was first suggested by French mathematician Henri Brocard in the late 19th century.

As yet, it has neither been proved or disproved.

For technical details see : Wolfram Mathworld


Also see : Brocard's problemplugin-autotooltip__plain plugin-autotooltip_bigBrocard's problem

Brocard's problem asks to find integer values of n and m for which n! + 1 = m2, where n is the factorial.

Put another way:

Does the equation n!+1 = m2 have integer solutions other than 4, 5, 7?

It was first proposed by French mathematician Henri Brocard 1876.

THIS WEBSITE DOES NOT USE TRACKING, ADVERTISING, OR ANALYTICAL COOKIES OF ANY KIND.
All essential cookies (for login status etc) are automatically deleted at the end of the session.
(full details here)

Show another (random) article

Suggestions for corrections and ideas for articles are welcomed : Get in touch!


Further resources :