[思路1]
>x²(13-x)(x+1)+x(13-x)²=42(x+1)²
>x(13-x)(x²+x+13-x)=42(x+1)²
>(13x-x²)(x²+13)=42(x+1)²
記13x-x²=a,x²+13=b,x+1=u
>ab=42(x+1)²=42u²
a+b=13(x+1)=13u
>t²-13ut+42u²=0
>(t-7u)(t-6u)=0
>t=7u=7(x+1)或t=6u=6(x+1)
當t=7(x+1)時,x²+13=7(x+1),x=6或x=1
當t=6(x+1)時,x²+13=6(x+1),x=3±√2
[思路2]
>x²(13-x)/(x+1)+x(13-x)²/(x+1)²=42
>x(13-x)/(x+1)[x+(13-x)/(x+1)]=42
>(13x-x²)/(x+1).(x²+13)/(x+1)=42
(13x-x²)/(x+1)+(x²+13)/(x+1)=13
依韋達定理(13x-x²)/(x+1)、(x²+13)/(x+1)可視為-元二次方程t²-13t+42=0的兩根
t=7或t=6
當(x²+13)/(x+1)=7時,即x²-7x+6=0
x=6或x=1
當(x²+13)/(x+1)=6時,即x²-6x+7=0
x=3±√2
教育分類資訊推薦
-
-
-
-
-
-
-
-
-
-
教育分類視頻推薦
-
-
-
-
-
-