已知x三次方-3x 1=0
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X1,X2为方程x²+3x+1=0的两根那么x1²+3x1+1=0x1²=-3x1-1x1(-3x1-1)+8x2+20=-3x1²-x1+8x2+20=-3(
X1.X2是方程:X的平方+3X+1=0的两个实数根则:X1²+3X1+1=0X1²=-3X1-1由韦达定理得:X1+X2=-3X1的三次方+8*X2+20=X1*X1²
x1三次方+8X2+20=x1³+3x1²+x1+8x2+20-3x1²-x1=x1(x1²+3x1+1)+8x2+20-3x1²-x1………………x
由一元二次方程根公式x=[-b±√(b^2-4ac)]/2a可知方程X^2-3X-1=0的两个根分别为:X1=(3+√13)/2;X2=(3-√13)/2.即X=(3±√13)/2(1)又由方程X^2
X1、X2是方程X^2+3X+1=0的两实数根韦达定理得:X1+X2=-3X1X2=1X1^2+3X1+1=0x1^2=-(3x1+1)x1^3+8x2+20=-x1*(3x1+1)+8x2+20=-
X1、X2是方程X²+3X+1=0的两实数根韦达定理得:X1+X2=-3X1X2=1X1²+3X1+1=0x1²=-(3x1+1)x1³+8x2+20=x1乘x
x1带入方程得:x1²+3x1+1=0再同乘上x1得:x1³+3x1²+x1=0所以x1³=-3x1²-x1=-3(-3x1-1)-x1=8x1+3所
X1、X2是方程X^2+3X+1=0的两实数根韦达定理得:X1+X2=-3X1X2=1X1^2+3X1+1=0x1^2=-(3x1+1)x1^3+8x2+20=-x1*(3x1+1)+8x2+20=-
(1)由韦达定理,x1+x2=-2/3,x1x2=-2于是,x1^3+x2^3=(x1+x2)(x1²-x1x2+x2²)=-2/3[(x1+x2)²-3x1x2]=-1
x^2+x-1=0x^2+x=1x^3+2x^2+3=x^3+x^2+x^2+3=x(x^2+x)+x^2+3=x+x^2+3=1+3=4
X1、X2是方程X^2+3X+1=0的两实数根韦达定理得:X1+X2=-3X1X2=1X1^2+3X1+1=0x1^2=-(3x1+1)x1^3+8x2+20=-x1*(3x1+1)+8x2+20=-
X的三次方+Y的三次方+Z的三次方=(x+y)(x2-xy+y2)+Z的三次方=-z(x2-xy+y2)+Z的三次方(x+y=-z)=-z(x2-xy+y2-z2)=-z[x(x-y)+(y+z)(y
1.x²-3x+1=0,所以X不等于0把两边同时除以X得x+x/1=3又,x+x/1=3两边平方得x²+1/x²+2=9x²+1/x²=7x²
由根与系数的关系:α+β=-3/2,α*β=-5/2;——》(α-β)^2=(α+β)^2-4αβ=49/4,——》α-β=+-7/2,α^2+αβ+β^2=(α+β)^2-αβ=19/4,——》α^
x²-3x-1=0根据韦达定理得到x1+x2=3x1x2=-1x1^2+x2^2=(x1+x2)^2-2x1x2=9+2=11x1^3+x2^3=(x1+x2)(x1^2-x1x2+x2^2
可以由十字相乘法分解因式为(3x-8)(x+1)=0,解得x1为-1,x2为8/3再问:完整可以吗
由韦达定理有x1+x2=3/2x1*x2=-1/2x1^3x2+x1x2^3=x1x2(x1^2+x2^2)=x1x2[(x1+x2)^2-2x1x2]=-1/2*(9/4+1)=-13/8
由韦达定理得x1+x2=3,x1*x2=3/2则x1²+x2²=(x1+x2)²-2x1*x2=9-3=6x1³+x2³=(x1+x2)(x1
-1x1+x2=-3x1^2=-3x1-1x1^3+8x2+20=x1(-3x1-1)+8x2+20=-3x1^2-x1+8x2+20=-3(-3x1-1)-x1+8x2+20=9x1+3-x1+8x
x1³+x2³=(x1+x2)(x1²-x1*x2+x2²)=(x1+x2)[(x1+x2)²-3x1*x2]=3×(3²-3×1)=3×6