1062347

domain: N

Appears in sequences

Product of 5 successive primes.at n=4A046303
T(2n+6,n), array T as in A055794.at n=16A055799
a(n) = prime(n)*prime(n+1)*...*prime(2*n-1), where prime(i) is the i-th prime.at n=5A060381
Diagonal of A083486.at n=14A083485
Product of primes greater than the greatest prime factor of n but not greater than n.at n=27A083722
Number of symmetric non-crossing connected graphs on n equidistant nodes on a circle.at n=15A089073
Least product of successive primes beginning from just greater than n which is > n!.at n=8A092981
Triangle read by rows: T(n,k) = prime(n)#/prime(k)#, 0<=k<=n.at n=49A096334
Triangle read by rows in which the k-th term in row n (n >= 1, k = 1..n) is Product_{i=0..k-1} prime(n-i).at n=40A098012
Least k such that the x^n coefficient of cyclotomic polynomial Phi(k,x) has the largest possible magnitude.at n=20A138475
Least k such that the x^n coefficient of cyclotomic polynomial Phi(k,x) has the largest possible magnitude.at n=21A138475
Least k such that the x^n coefficient of cyclotomic polynomial Phi(k,x) has the largest possible magnitude.at n=23A138475
Least k such that the x^n coefficient of cyclotomic polynomial Phi(k,x) has the largest possible magnitude.at n=25A138475
Least k such that the x^n coefficient of cyclotomic polynomial Phi(k,x) has the largest possible magnitude.at n=26A138475
Least k such that the x^n coefficient of cyclotomic polynomial Phi(k,x) has the largest possible magnitude.at n=27A138475
Numerators of A002110 divided by A102647, starting from the second term of both.at n=8A165657
a(n) = binomial(6*n, 3*n)*binomial(3*n, n)/(2*(2*n+1)*binomial(2*n, n)).at n=3A176898
Denominator of product_{k=1..n-1} (1 + 1/prime(k)).at n=9A236436
Numerator of prime(n)#/n!, where prime(n)# is the prime factorial function.at n=9A271387
Irregular triangle read by rows giving the denominators of the coefficients of the Eisenstein series G_{2*n} multiplied by 2*n-1, for n >= 2. Also Laurent coefficients of Weierstrass's P function.at n=13A274343