从1/x+1/(y+z)=1/2,
可得 (x+y+z)/[x(y+z)]=1/2
即 1/x =(y+z)/[2(x+y+z)]
同样可得:
1/y=(x+z)/[3(x+y+z)]
1/z=(x+y)/[4(x+y+z)]
所以:
2/x+3/y+4/z
=(y+z)/(x+y+z)+(x+z)/(x+y+z)+(x+y)/(x+y+z)
=2(x+y+z)/(x+y+z)
=2 希望能采纳!
...先说一下,是1/2...
因为1/x+1/(y+z)=1/2,
所以 (x+y+z)/[x(y+z)]=1/2
1/x =(y+z)/[2(x+y+z)]
1/y=(x+z)/[3(x+y+z)]
1/z=(x+y)/[4(x+y+z)]
所以:
2/x+3/y+4/z
=(y+z)/(x+y+z)+(x+z)/(x+y+z)+(x+y)/(x+y+z)
=2(x+y+z)/(x+y+z)
=2
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