Powers of 2

Revision as of 12:17, 20 December 2018 by Olivera (talk | contribs) (First 43 powers of 2)

A power of 2 means a number of the form $2^n$, in which $n$ is an integer.

First 43 powers of 2

$2^0=1 \\ 2^1=2 \\ 2^2=4\\ 2^3=8\\ 2^4=16\\ 2^5=32\\ 2^6=64\\ 2^7=128\\ 2^8=256\\ 2^9=512\\ 2^{10}=1024\\ 2^{11}=2048\\ 2^{12}=4096\\ 2^{13}=8192\\ 2^{14}=16384\\ 2^{15}=32768\\ 2^{16}=65536\\ 2^{17}=131072\\ 2^{18}=262144\\ 2^{19}=524288\\ 2^{20}=1048576\\ 2^{21}=2097152\\ 2^{22}=4194304\\ 2^{23}=8388608\\ 2^{24}=16777216\\ 2^{25}=33554432\\ 2^{26}=67108864\\ 2^{27}=134217728\\ 2^{28}=268435456\\ 2^{29}=536870912$ Contains each of the digits 0-9, except for 4, exactly once.

$2^{30}=1073741824\\ 2^{31}=2147483648\\ 2^{32}=4294967296\\ 2^{33}=8589934592\\ 2^{34}=17179869184\\ 2^{35}=34359738368\\ 2^{36}=68719476736\\ 2^{37}=137438953472\\ 2^{38}=274877906944\\ 2^{39}=549755813888\\ 2^{40}=1099511627776\\ 2^{41}=2199023255552\\ 2^{42}=4398046511104\\ 2^{43}=8796093022208$