28583199
Frage 1
Frage
Chen Jingrun ([blank_start]May 22, 1933[blank_end] – [blank_start]March 19, 1996[blank_end]) was a [blank_start]Chinese[blank_end] [blank_start]mathematician[blank_end] who made significant contributions to [blank_start]number theory[blank_end].
Antworten
-
May 22, 1933
-
March 19, 1934
-
May 28, 1996
-
January 9, 1929
-
July 5, 1935
-
March 19, 1996
-
May 22, 1996
-
February 27, 1998
-
September 10, 2003
-
October 7, 1940
-
December 2, 1934
-
November 30, 1999
-
April 11, 1996
-
June 4, 2020
-
Chinese
-
Japanese
-
Korean
-
Canadian
-
American
-
Mexican
-
Norweigan
-
mathematician
-
accountant
-
math teacher
-
engineer
-
university professor
-
philosopher
-
wizard
-
number theory
-
calculus
-
geometry
-
recreational methematics
-
computer programming
-
algebra
-
theoretical physics
Frage 2
Frage
His work on the [blank_start]twin prime conjecture[blank_end], [blank_start]Waring's problem[blank_end], [blank_start]Goldbach's conjecture[blank_end] and [blank_start]Legendre's conjecture[blank_end] led to progress in [blank_start]analytic[blank_end] number theory.
Antworten
-
twin prime conjecture
-
triplet prime conjecture
-
twin semiprime conjecture
-
triplet semiprime conjecture
-
twin integer conjecture
-
triplet integer conjecture
-
double prime problem
-
Waring's problem
-
Villefort's problem
-
Familienbaum's problem
-
Morrel's problem
-
Medstor's problem
-
Brahmagupta's problem
-
Leibnitz's problem
-
Goldbach's conjecture
-
Goldberg's congecture
-
Goldsmith's conjecture
-
Goldman's conjecture
-
Goldson's conjecture
-
Golder's conjecture
-
Golding's conjecture
-
Legendre's conjecture
-
Morcerf's conjecture
-
Noirtier's conjecture
-
Bertuccio's conjecture
-
Danglars' conjecture
-
Faria's conjecture
-
Hatcher's conjecture
-
analytic
-
basic
-
thoeretical
-
simple
-
extended
-
all
-
algebraic
Frage 3
Frage
In a [blank_start]1966[blank_end] [blank_start]paper[blank_end] he [blank_start]proved[blank_end] what is now called [blank_start]Chen's theorem[blank_end]: every [blank_start]sufficiently large even number[blank_end] can be written as the [blank_start]sum[blank_end] of [blank_start]a prime[blank_end] and [blank_start]a semiprime[blank_end] (the [blank_start]product[blank_end] of [blank_start]two[blank_end] primes) – e.g., 100 = 23 + 7*11.
Antworten
-
1966
-
1967
-
1968
-
unique
-
1965
-
1964
-
well-known
-
paper
-
article
-
letter
-
experiment
-
interview
-
pubication
-
class
-
proved
-
disproved
-
discovered
-
observed
-
invented
-
documented
-
created
-
Chen's theorem
-
Jingrun's theorem
-
the prime/semiprime theorem
-
the sum theorem
-
Euclid's theorem
-
the 4th law of motion
-
Conway's theorem
-
sufficiently large even number
-
sufficiently small even number
-
sufficiently large odd number
-
sufficiently small odd number
-
sufficeintly large number
-
sufficiently small number
-
number greater than 0
-
sum
-
quotient
-
difference
-
product
-
mean
-
sine
-
intergral
-
a prime
-
an integer
-
an even number
-
an odd number
-
a real number
-
a semiprime
-
0
-
a semiprime
-
a prime
-
an integer
-
an odd number
-
an even number
-
0
-
a real number
-
product
-
sum
-
difference
-
quotient
-
mean
-
median
-
mode
-
two
-
three
-
four
-
five
-
a finite number of
-
an infinite number of
Möchten Sie mit GoConqr kostenlos Ihre eigenen Quiz erstellen? eigenen Mehr erfahren.