Powerful Zeros
How many zeros are there at the end of $3^4 \times 4^5 \times 5^6$?
Imagine the number $3^4\times 4^5\times 5^6$ is written out in full. How many zeros are there at the end of the number?
If you liked this problem, here is an NRICH task which challenges you to use similar mathematical ideas.
Answer: 6 zeros
Multiplying by $10$, or multiples/powers of $10$, makes zeros, so find powers of $10$
$3^4\times 4^5\times 5^6$
$=3^4\times 2^{10}\times 5^6$
$=3^4\times 2^4\times 2^6 \times 5^6$
$=\underbrace{6^4}_{\text{no zeros}}\times\underbrace{10^6}_{\text{six zeros}}$