Goldbach's conjecture

To test Goldbach's conjecture, you could program the device to start with 4.

For example, Goldbach's conjecture, proposed in 1742 has never been disproven.

No reasonable mathematician seriously doubts the validity of Goldbach's conjecture.

This result may be compared with Goldbach's conjecture, which states that every even number except 2 is the sum of two primes.

What he's interested in, however, is Goldbach's conjecture, and for that he's been using a computer."

Goldbach's conjecture states that every even integer greater than 2 can be represented as a sum of two prime numbers.

Whoever manages to prove Goldbach's conjecture within two years will have earned the glory and the cash to pay for it, too.

The Goldbach function is studied in relation to Goldbach's conjecture.

He is remembered today for Goldbach's conjecture.

Goldbach's Conjecture might be among them.

You see there's something called, if I've got it right, 'Goldbach's conjecture'."

Finding answers to some questions about this model could serve as a proof to many important mathematical conjectures, like Goldbach's conjecture.

One weak counterexample begins by taking some unsolved problem of mathematics, such as Goldbach's conjecture.

Using computers and clever algorithms, mathematicians have verified Goldbach's conjecture to about 400 trillion.

Anyway, can you explain Goldbach's conjecture?

To appease her wrath, however, he then tells Pandarve about Goldbach's conjecture.

The twin prime conjecture and Goldbach's conjecture are two unsolved problems in number theory.

Another favorite diversion is Goldbach's Conjecture, which holds that all even numbers are the sum of two primes.

For example, the counterexample just shown shows that the quoted statement is "at least as hard to prove" as Goldbach's conjecture.

It is a key ingredient in proofs of Chen's theorem on Goldbach's conjecture.

Goldbach's conjecture is one of the oldest unsolved problems in number theory and in all of mathematics.

"I may just teach algebra to junior high school students, but yes, I know about Goldbach's conjecture.

The hypothesis doesn't cover Goldbach's conjecture, but a closely related version (hypothesis H) does.

Schnirelmann's constant is at least 3; Goldbach's conjecture implies that this is the constant's actual value.

Therefore, another statement of Goldbach's conjecture is that all even integers greater than or equal to 4 are Goldbach numbers.