### Properties of the number 9348:

9348 = 2^{2}× 3 × 19 × 41 is the 8190

^{th}composite number and is not squarefree.

9348 has 4 distinct prime factors, 24 divisors, 11 antidivisors and 2880 totatives.

Reversing the decimal digits of 9348 results in a sphenic number.

9348 = 2338

^{2}- 2336

^{2}= 782

^{2}- 776

^{2}= 142

^{2}- 104

^{2}= 98

^{2}- 16

^{2}is the difference of 2 nonnegative squares in 4 ways.

9348 is the sum of 2 positive triangular numbers.

9348 is the difference of 2 positive pentagonal numbers in 1 way.

9348 = 2

^{2}+ 40

^{2}+ 88

^{2}is the sum of 3 positive squares.

9348

^{2}= 2052

^{2}+ 9120

^{2}is the sum of 2 positive squares in 1 way.

9348

^{2}is the sum of 3 positive squares.

9348 is a proper divisor of 1559

^{2}- 1.

9348 is palindromic in (at least) the following bases: -13, -22, -26, and -33.

9348 in base 25 = enn and consists of only the digits 'e' and 'n'.

9348 in base 32 = 944 and consists of only the digits '4' and '9'.

9348 in base 36 = 77o and consists of only the digits '7' and 'o'.

### The number 9348 belongs to the following On-Line Encyclopedia of Integer Sequences (OEIS) sequences (among others):

Sequence numbers and descriptions below are taken from OEIS.A001610: a(n) = a(n-1) + a(n-2) + 1.

A031367: Inflation orbit counts.

A099925: a(n) = Lucas(n) + (-1)^n.

A120019: Square table, read by antidiagonals, of self-compositions of A120010.

A120020: Coefficients of x^n in the n-th iteration of the g.f. of A120010: a(n) = [x^n] { (1-sqrt(1-4*x))/2 o x/(1-n*x) o (x-x^2) } for n>=1.

A179249: Numbers n that have 9 terms in their Zeckendorf representation.

A197218: Phi(Lucas(n)).

A209796: T(n,k)=Half the number of (n+1)X(k+1) 0..2 arrays with every 2X2 subblock having exactly one duplicate clockwise edge difference

A214980: Positions of zeros in A214979.

A231089: Initial members of abundant quadruplets, i.e., values of n such that (n, n+2, n+4, n+6) are all abundant numbers.

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