圆周率问题一则
使用三个pi,不得有其他数字加减乘除运算,乘方运算,平方根运算,取整运算
能表示多少整数? 无穷个,我甚至怀疑可以表示所有的整数。
更加进一步,不考虑取整运算,是不是可以表示的结果在这个实数轴上是处处稠密的(也就是任意一个数字周围任意接近的范围内都有一个数字)
主要可以利用的是连续开平方根 可以无穷开平方吗? 应该只允许有限次吧 应该不是无穷吧
pi^pi^pi是最大的啊 $1=$
$2=( + * $
$3= + + $
$4=[ (sqrt(pi) * sqrt(pi) ) ^ (root{4}{pi}))]$
$5=$
$6= * $
$7= + $
$8=$
$9=$
$1=[ sqrt(pi * pi) / sqrt(pi) ] = [ pi ^ (pi - pi) ]$
$2 = ( pi + pi ) / pi$
$3 = [ pi * pi / pi ]$
$4 = [ pi + pi / pi]$
$5 = [ sqrt(pi * pi * pi) ]$
$6 = [ pi * pi - pi ]$
$7 = [ pi ^ {root{4}{pi * pi}} ]$
$10 = [ pi * pi + ]$
$11 = [ pi * pi + sqrt(pi) ]$
$12 = [ [ pi * pi ] + ]$
$13 = [ pi * pi + pi]$
$14 = [ * (pi + sqrt(pi) ) ]$
$15 = [ pi * (pi + sqrt(pi)) ]$
$16 = [ pi * sqrt(pi) * ]$
$17 = [ pi * pi * sqrt(pi) ]$
$18 = [ pi ] * [ pi + pi ]$
$19 = [ pi * ( pi + pi ) ]$
$20 = [ pi ^ pi / sqrt(pi) ]$
$21 = [ ( pi * pi ) ^ sqrt(pi) ] = [ pi ] * [ pi ^ sqrt(pi) ]$
$22 = [ pi ^ ( pi / root{8}{pi} ) ]$
$23 = [ pi * pi ^ sqrt(pi) ]$
$24 = [ ((sqrt(pi) ^ pi ) ^ sqrt(pi) ]$
$25 = [ ( pi + pi ) ^ sqrt(pi) ]$
$26 = [ pi ^ ( sqrt(pi) + root{16}{pi} ) ]$
$27 = [ pi ] * [ pi ] * [ pi ]$
$28 = [ [ pi ]* [ pi ] *pi ] = [ [ pi * pi ] * pi ]$
$29 = [ [ pi ] * ( pi * pi ) ]$
$30 =$ $31 = [ pi * pi * pi ]$
$32 = [ ( pi / root{32}{ pi} ) ^ pi ]$
$33 = [ pi ^ pi - pi ]$
$34 = [ pi ^ pi - sqrt(pi) ]$
$35 = [ pi ^ pi ] - [ sqrt(pi) ]$
$36 = [ pi ^ pi * [ sqrt(pi) ]]$
$37 = [ pi ^ pi ] + [ sqrt(pi) ]$
$38 = [ pi ^ pi + sqrt(pi) ]$
$39 = [ pi ^ pi + pi ]$
$40 = $
$41 = [ pi ^ ( pi * root{32}{pi} ) ]$
$42 = [ pi ^ pi * root{8}{pi} ]$
$43 = [ [ pi ] ^ ( [ pi ] * root{8}{[ pi ]} ) ]$
$44 = [ [ pi ] ^ ( [ pi ] * root{8}{pi} ) ]$
$45 = [ ( pi * root{16}{pi} ) ^ pi ]$
$46 = [ sqrt([ pi ]) ^ [ [ pi ] ^ sqrt(pi) ] ]$
$47 = [ sqrt(pi) * [ pi ] ^ [ pi ]]$
$48 = $
$49 = [ [ pi ] ^ ( [ pi ] ^ root{8}{pi} ) ]$
$50 = [ pi ^ ( pi ^ root{16}{pi} ) ]$
$51 = $
$52 = $
$53 = [ ( sqrt(pi) + sqrt(pi) ) ^ pi ]$
$54 =$
$55 = [ sqrt(pi) ^ ( [ pi ] ^ sqrt(pi) ) ]$
$56 =$
$57 = [ pi ^ ( sqrt(pi) + sqrt(pi) ) ]$
翻旧笔记所得,纯原创,欢迎补充 定义 sqrt(n, x)表示x连续开n次根号
那么
sqrt(u, pi)/(sqrt(v+d, pi)-sqrt(v,pi))
其中d是非常小的数,v远远大于u,可以表示很大范围的数 关键是这个函数要足够密集
每个区间(n, n + 1)均有值