若a、b、c、d是四个正数,且abcd=1.求(a/abc+ab+a+1)+(b/bcd+bc+b+1)+(c/cda+cd+c+1)+(d/dab+da+d+1)的值
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![若a、b、c、d是四个正数,且abcd=1.求(a/abc+ab+a+1)+(b/bcd+bc+b+1)+(c/cda+cd+c+1)+(d/dab+da+d+1)的值](/uploads/image/z/2753942-14-2.jpg?t=%E8%8B%A5a%E3%80%81b%E3%80%81c%E3%80%81d%E6%98%AF%E5%9B%9B%E4%B8%AA%E6%AD%A3%E6%95%B0%2C%E4%B8%94abcd%3D1.%E6%B1%82%28a%2Fabc%2Bab%2Ba%2B1%29%2B%28b%2Fbcd%2Bbc%2Bb%2B1%29%2B%28c%2Fcda%2Bcd%2Bc%2B1%29%2B%28d%2Fdab%2Bda%2Bd%2B1%29%E7%9A%84%E5%80%BC)
若a、b、c、d是四个正数,且abcd=1.求(a/abc+ab+a+1)+(b/bcd+bc+b+1)+(c/cda+cd+c+1)+(d/dab+da+d+1)的值
若a、b、c、d是四个正数,且abcd=1.求(a/abc+ab+a+1)+(b/bcd+bc+b+1)+(c/cda+cd+c+1)+(d/dab+da+d+1)的值
若a、b、c、d是四个正数,且abcd=1.求(a/abc+ab+a+1)+(b/bcd+bc+b+1)+(c/cda+cd+c+1)+(d/dab+da+d+1)的值
a/(abc+ab+a+1)+b/(bcd+bc+b+1)+c/(cda+cd+c+1)+d/(dab+da+d+1)
=a/(1/d+ab+a+1)+b/(bcd+bc+b+1)+c/(1/b+cd+c+1)+d/(dab+da+d+1)
=ad/(abd+ad+d+1)+b/(bcd+bc+b+1)+bc/(bcd+bc+b+1)+d/(dab+da+d+1)
=(ad+d)/(abd+ad+d+1)+(b+bc)/(bcd+bc+b+1)
=(ad+d)/(abd+ad+d+abcd)+(b+bc)/(bcd+bc+b+abcd)
=(a+1)/(ab+a+1+abc)+(1+c)/(cd+c+1+acd)
=(a+1)/[(a+1)+ab(c+1)]+(c+1)/[(c+1)+cd(a+1)]
=1/[1+ab(c+1)/(a+1)]+1/[1+cd(a+1)/(c+1)]
=1/{1+(c+1)/[cd(a+1)]}+1/[1+cd(a+1)/(c+1)]
令(c+1)/[cd(a+1)]=x
则cd(a+1)/(c+1)=1/x
所以原式=1/(1+x)+1/(1+1/x)
=1/(1+x)+x/(1+x)
=(1+x)/(1+x)
=1
21.5