Find the largest number that cannot be written
as a sum of distinct primes of the form 6*n+1.

(In reply to

Some thoughts by broll)

If you prove that ** all **numbers over** **332** can be **** written** as a sum of distinct primes of the form 6*n+1 then there is a largest number **like 332(?) or lower** that is the last one , i.e. the largest one in the series 1,2,3,4,5,6,8,9,10,11,12,14,...21, .....35 , ...75...etc-

numbers that cannot be presented as sucjh a sum.