116,415,321,826,934,814,453,125

Number
$116 \, 415 \, 321 \, 826 \, 934 \, 814 \, 453 \, 125$ is:
 * $5^{33}$


 * The $48 \, 828 \, 125$th cube number:
 * $116 \, 415 \, 321 \, 826 \, 934 \, 814 \, 453 \, 125 = 48 \, 828 \, 125 \times 48 \, 828 \, 125 \times 48 \, 828 \, 125$


 * The $33$rd power of $5$:
 * $116 \, 415 \, 321 \, 826 \, 934 \, 814 \, 453 \, 125 = 5^{33}$


 * The larger divisor of the $10$th and largest power of $10$ which can be expressed as the product of $2$ factors neither of which has a zero in its decimal representation:
 * $10^{33} = 8 \, 589 \, 934 \, 592 \times 116 \, 415 \, 321 \, 826 \, 934 \, 814 \, 453 \, 125$

Also see

 * Powers of 10 Expressible as Product of 2 Zero-Free Factors