数学分式加减题
2个回答
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先看x/(xy+x+1),因为xyz=1 ,带入其中的1,可得:
x/(xy+x+1)=1/贺困(y+1+yz)
再看z/(xz+z+1),把分子分母同时乘以y带入可得:
z/(xz+z+1)=zy/(y+1+yz)
这样三者分母相同了,可以合并了,结果为:
x/(xy+x+1) + y/(yz+y+1) + z/(xz+z+1)
=1/(y+1+yz)+y/(yz+y+1)+zy/(y+1+yz)
=1
清楚些的:
x/郑念(xy+x+1)+y/喊拍困(yz+y+1)+z/(xz+z+1)
=x/(xy+x+xyz)+y/(yz+y+1)+z/(xz+z+1)
=1/(y+1+yz)+y/(yz+y+1)+z/(xz+z+1)
=(1+y)/(y+1+yz)+z/(xz+z+1)
=(1+y)/(y+1+yz)+zy/(yxz+yz+y)
=(1+y)/(y+1+yz)+zy/(1+yz+y)
=(1+y+yz)/(y+1+yz)
=1
x/(xy+x+1)=1/贺困(y+1+yz)
再看z/(xz+z+1),把分子分母同时乘以y带入可得:
z/(xz+z+1)=zy/(y+1+yz)
这样三者分母相同了,可以合并了,结果为:
x/(xy+x+1) + y/(yz+y+1) + z/(xz+z+1)
=1/(y+1+yz)+y/(yz+y+1)+zy/(y+1+yz)
=1
清楚些的:
x/郑念(xy+x+1)+y/喊拍困(yz+y+1)+z/(xz+z+1)
=x/(xy+x+xyz)+y/(yz+y+1)+z/(xz+z+1)
=1/(y+1+yz)+y/(yz+y+1)+z/(xz+z+1)
=(1+y)/(y+1+yz)+z/(xz+z+1)
=(1+y)/(y+1+yz)+zy/(yxz+yz+y)
=(1+y)/(y+1+yz)+zy/(1+yz+y)
=(1+y+yz)/(y+1+yz)
=1
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x/(xy+x+1)+y/(yz+y+1)+z/(xz+z+1)
=x/(xy+x+xyz)+y/(yz+y+1)+z/闭顷(xz+z+1)
=1/(y+1+yz)+y/(yz+y+1)+z/掘态空(xz+z+1)
=(1+y)/判瞎(y+1+yz)+z/(xz+z+1)
=(1+y)/(y+1+yz)+zy/(yxz+yz+y)
=(1+y)/(y+1+yz)+zy/(1+yz+y)
=(1+y+yz)/(y+1+yz)
=1
=x/(xy+x+xyz)+y/(yz+y+1)+z/闭顷(xz+z+1)
=1/(y+1+yz)+y/(yz+y+1)+z/掘态空(xz+z+1)
=(1+y)/判瞎(y+1+yz)+z/(xz+z+1)
=(1+y)/(y+1+yz)+zy/(yxz+yz+y)
=(1+y)/(y+1+yz)+zy/(1+yz+y)
=(1+y+yz)/(y+1+yz)
=1
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