3^9-4^3 делится на 23

To check if $3^9 - 4^3$ is divisible by 23, we can calculate the value and then see if it is divisible by 23 or not.

Let's first compute $3^9$ and $4^3$:

$3^9 = 19683$ (which is $3 \times 3 \times 3 \times 3 \times 3 \times 3 \times 3 \times 3 \times 3$)

$4^3 = 64$ (which is $4 \times 4 \times 4$)

Now, we can calculate $3^9 - 4^3$:

$3^9 - 4^3 = 19683 - 64 = 19619$

Now, let's check if $19619$ is divisible by 23. We can do this by dividing $19619$ by $23$ and checking if the remainder is $0$:

$19619 \div 23 = 852$ with a remainder of $3$

Since there is a remainder of $3$, $19619$ is not divisible by $23$.

Therefore, the statement " $3^9 - 4^3$ is divisible by 23" is not true.

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