作业帮x>y>1 (y!)^(x-1) 和(x!)^(y-1)的大小
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x>y>1 (y!)^(x-1) 和(x!)^(y-1)的大小
x>y>1 (y!)^(x-1) 和(x!)^(y-1)的大小
x>y>1 (y!)^(x-1) 和(x!)^(y-1)的大小
dayu
(y!)^(x-1) 和(x!)^(y-1)
题目出现阶乘“!”,所以x、y为自然数。
又x>y>1,所以y≥2,x≥3
不妨设x=y+k,k为自然数
即:
[(y!)^(x-1) ]/[(x!)^(y-1)]=[(y!)^(y+k-1)]/{[(y+k)!]^(y-1)}
=[(y!)^(y-1+k)]/{[(y!(y+1)(y+2)……(y+k)...
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(y!)^(x-1) 和(x!)^(y-1)
题目出现阶乘“!”,所以x、y为自然数。
又x>y>1,所以y≥2,x≥3
不妨设x=y+k,k为自然数
即:
[(y!)^(x-1) ]/[(x!)^(y-1)]=[(y!)^(y+k-1)]/{[(y+k)!]^(y-1)}
=[(y!)^(y-1+k)]/{[(y!(y+1)(y+2)……(y+k)]^(y-1)}
=[(y!)^(y-1+k)]/{[(y!)^(y-1)][(y+1)(y+2)……(y+k)]^(y-1)}
=[(y!)^(y-1)][(y!)^k]/{[(y!)^(y-1)][(y+1)(y+2)……(y+k)]^(y-1)}
=[(y!)^k]/{[(y+1)(y+2)……(y+k)]^(y-1)}
<[(y!)^k]/{[(y+1)^k]^(y-1)}
=[(y!)^k]/{[(y+1)^k]^(y-1)}
<[(y!)^k]/[(y^k)^(y-1)]
=[(y!)^k]/[y^(y-1)]^k
=[(y!/y^(y-1)]^k
={(y/y)[(y-1)/y][(y-2)/y]……[3/y][2/y]*1}^k
<1^k=1
即[(y!)^(x-1) ]/[(x!)^(y-1)]<1
所以(y!)^(x-1)<(x!)^(y-1)。
收起
两边取对数, 比较(x-1) ln(y!)与(y-1)ln(x!)大小
两边除以(x-1)(y-1), 比较 ln(y!)/(y-1)与ln(x!)/(x-1)大小
即求f(n)=ln(n!)/(n-1)的单调性
f(n+1)/f(n)=[ln(n+1)+lnn!]/n / [ln(n!)/(n-1)]>1,
即(fx)>f(y), (y!)^(x-1) >(x!)^(y-1)
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