9

Number
$9$ (nine) is:


 * $3^2$


 * The $1$st odd prime power:
 * $9 = 3^2$


 * The $1$st power of $9$ after the zeroth $1$:
 * $9 = 9^1$


 * The larger of the $1$st pair of consecutive powerful numbers:
 * $8 = 2^3$, $9 = 3^2$


 * The $2$nd power of $3$ after $(1)$, $3$:
 * $9 = 3^2$


 * The sum of the first $2$ cubes:
 * $9 = 1^3 + 2^3$


 * The $2$nd square lucky number after $1$:
 * $1$, $9$, $\ldots$


 * The $2$nd Kaprekar number after $1$:
 * $9^2 = 81 \to 8 + 1 = 9$


 * The $2$nd integer after $1$ whose square has a divisor sum which is itself square:


 * The $3$rd square number after $1$, $4$:
 * $9 = 3^2$
 * and therefore from Sum of Consecutive Triangular Numbers is Square, the sum of $2$ consecutive triangular numbers:
 * $9 = 3 + 6$


 * The $2$nd positive integer after $6$ whose cube can be expressed as the sum of $3$ positive cube numbers:
 * $9^3 = 1^3 + 6^3 + 8^3$


 * The $3$rd semiprime after $4$, $6$:
 * $9 = 3 \times 3$


 * The $3$rd Cullen number after $1$, $3$:
 * $9 = 2 \times 2^2 + 1$


 * The $3$rd square after $1$, $4$ which has no more than $2$ distinct digits and does not end in $0$:
 * $9 = 3^2$


 * The sum of the first $3$ factorials:
 * $9 = 1! + 2! + 3!$


 * The $3$rd of $35$ integers less than $91$ to which $91$ itself is a Fermat pseudoprime:
 * $3$, $4$, $9$, $\ldots$


 * The $4$th powerful number after $1$, $4$, $8$


 * The $4$th lucky number:
 * $1$, $3$, $7$, $9$, $\ldots$


 * The $4$th palindromic lucky number:
 * $1$, $3$, $7$, $9$, $\ldots$


 * The $4$th subfactorial after $0$, $1$, $2$:
 * $9 = 4! \paren {1 - \dfrac 1 {1!} + \dfrac 1 {2!} - \dfrac 1 {3!} + \dfrac 1 {4!} }$


 * The $5$th trimorphic number after $1$, $4$, $5$, $6$:
 * $9^3 = 72 \mathbf 9$


 * The $5$th odd positive integer after $1$, $3$, $5$, $7$ such that all smaller odd integers greater than $1$ which are coprime to it are prime


 * The $5$th odd positive integer after $1$, $3$, $5$, $7$ that cannot be expressed as the sum of exactly $4$ distinct non-zero square numbers all of which are coprime


 * The $6$th integer after $0$, $1$, $3$, $5$, $7$ which is palindromic in both decimal and binary:
 * $9_{10} = 1001_2$


 * The $6$th positive integer after $2$, $3$, $4$, $7$, $8$ which cannot be expressed as the sum of distinct pentagonal numbers


 * The $7$th after $1$, $2$, $4$, $5$, $6$, $8$ of the $24$ positive integers which cannot be expressed as the sum of distinct non-pythagorean primes


 * The $7$th (strictly) positive integer after $1$, $2$, $3$, $4$, $6$, $7$ which cannot be expressed as the sum of exactly $5$ non-zero squares


 * The $8$th (strictly) positive integer after $1$, $2$, $3$, $4$, $6$, $7$, $8$ which cannot be expressed as the sum of distinct primes of the form $6 n - 1$


 * The $9$th integer $n$ after $0$, $1$, $2$, $3$, $4$, $5$, $6$, $7$ such that $5^n$ contains no zero in its decimal representation:
 * $5^9 = 78 \, 125$


 * The $9$th integer $n$ after $0$, $1$, $2$, $3$, $4$, $5$, $6$, $7$ such that both $2^n$ and $5^n$ have no zeroes:
 * $2^9 = 512$, $5^9 = 1 \, 953 \, 125$


 * The $9$th of the trivial $1$-digit pluperfect digital invariants after $1$, $2$, $3$, $4$, $5$, $6$, $7$, $8$:
 * $9^1 = 9$


 * The $9$th of the (trivial $1$-digit) Zuckerman numbers after $1$, $2$, $3$, $4$, $5$, $6$, $7$, $8$:
 * $9 = 1 \times 9$


 * The $9$th of the (trivial $1$-digit) harshad numbers after $1$, $2$, $3$, $4$, $5$, $6$, $7$, $8$:
 * $9 = 1 \times 9$


 * The $10$th integer $n$ after $0$, $1$, $2$, $3$, $4$, $5$, $6$, $7$, $8$ such that $2^n$ contains no zero in its decimal representation:
 * $2^9 = 512$


 * The $10$th integer after $0$, $1$, $2$, $3$, $4$, $5$, $6$, $7$, $8$ which is (trivially) the sum of the increasing powers of its digits taken in order:
 * $9^1 = 9$


 * One of the cycle of $5$ numbers (when prepended with zero) to which Kaprekar's process on $2$-digit numbers converges:
 * $09 \to 81 \to 63 \to 27 \to 45 \to 09$


 * Every positive integer can be expressed as the sum of at most $9$ positive cubes


 * The magic constant of a magic cube of order $2$ (if it were to exist), after $1$:
 * $9 = \ds \dfrac 1 {2^2} \sum_{k \mathop = 1}^{2^3} k = \dfrac {2 \paren {2^3 + 1} } 2$


 * In ternary:
 * $100_3 = 9_{10}$

Also see

 * 9 is Only Square which is Sum of 2 Consecutive Positive Cubes
 * Nine Regular Polyhedra
 * Dissection of Rectangle into 9 Distinct Integral Squares
 * Nine Point Circle Theorem
 * Divisibility by 9
 * Hilbert-Waring Theorem for $3$rd Powers

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