374, 144,419, 156,711, 147,060, 143,317, 175,368, 453,031, 918,731, 001,856

Number
$374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856$ is:


 * $2^{168}$


 * The $19 \, 342 \, 813 \, 113 \, 834 \, 066 \, 795 \, 298 \, 816$th square number:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 19 \, 342 \, 813 \, 113 \, 834 \, 066 \, 795 \, 298 \, 816^2$


 * The $72 \, 057 \, 594 \, 037 \, 927 \, 936$th cube number:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 72 \, 057 \, 594 \, 037 \, 927 \, 936^3$


 * The $4 \, 398 \, 046 \, 511 \, 104$th fourth power:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 4 \, 398 \, 046 \, 511 \, 104^4$


 * The $268 \, 435 \, 456$th $6$th power:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 268 \, 435 \, 456^6$


 * The $16 \, 777 \, 216$th $7$th power:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 16 \, 777 \, 216^7$


 * The $2 \, 097 \, 152$th $8$th power:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 2 \, 097 \, 152^8$


 * The $42$nd power of $16$:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 16^{42}$


 * The $56$th power of $8$:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 8^{56}$


 * The $84$th power of $4$ after $(1)$, $4$, $16$, $64$, $256$, $1024$:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 4^{84}$


 * The $168$th power of $2$:
 * $374 \, 144 \, 419 \, 156 \, 711 \, 147 \, 060 \, 143 \, 317 \, 175 \, 368 \, 453 \, 031 \, 918 \, 731 \, 001 \, 856 = 2^{168}$


 * A large power of $2$ which contains no instance of the digit $2$

Also see

 * Power of 2 containing no Digit 2