4(x 1)的平方-9(2x-1)的平方=0运用因式分解
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![4(x 1)的平方-9(2x-1)的平方=0运用因式分解](/uploads/image/f/309540-12-0.jpg?t=4%28x+1%29%E7%9A%84%E5%B9%B3%E6%96%B9-9%282x-1%29%E7%9A%84%E5%B9%B3%E6%96%B9%3D0%E8%BF%90%E7%94%A8%E5%9B%A0%E5%BC%8F%E5%88%86%E8%A7%A3)
x-4x+2=0x1+x2=4,x1x2=21/x1+1/x2=(x1+x2)/(x1x2)=2(x1-x2)=(x1+x2)-4x1x2=4-4×2=8
x1,x2是x²+(2-M)x+(1+M)=0的两个根x1+x2=M-2x1x2=1+Mx1²+x2²>=2x1x2=2(1+M)当且仅当x1=x2时,有最小值.即根的判
X1,X2是方程2x的平方+3x-4=0的两个实数根x1+x2=-3/2x1x2=-2x1^2+2x1x2+x^2=9/4x1^2-2x1x2+x^2=9/4-4x1x2(x1-x2)^2=41/4x
4x^2-2x-1=0根据韦达定理:x1+x2=-(-2)/4=1/2
易知x1+x2=7/3,x1x2=2/3,所以(X1+2)(X2+2)=28/3Ⅰx1^2-x^2Ⅰ=(x1+x^2)^2-2x1x2=49/9-4/3=37/9再问:第二题不对吧??再答:我一般做的
根据韦达定理x1+x2=-3/2,x1x2=-2所以x1²+x2²=(x1+x2)²-2x1x2=(-3/2)²+4=9/4+4=25/4
△=4(k+1)²-4(k²-1)≥0解得:k≥-1根据韦达定理x1+x2=-2(k+1)x1*x2=k²-1x1²+x2²=(x1+x2)²
ax²+bx+c=0中有:x1+x2=-b/ax1·x2=c/a2X²-9X+6=0中:a=2b=-9c=6x1+x2=-b/a=9/2x1·x2=c/a=3(x1-x2)&sup
X1+X2=-B/A=2X1*X2=C/A=1/2求得X1=1+根号2或者X1=1-根号2从而求出X2的值X1/X2+X2/X1=(X1*X1+X2*X2)/(X1X2)=6
.(1)在一元二次方程4x²+7=9x中,b²-4ac=?将方程变形为:4x²-9x+7=0a=4,b=-9,c=7所以,b²-4ac=4²-(-9)
x-x+3=0所以x1+x2=1,x1x2=3因此(1)(X1+2)(X2+2)=x1x2+2(x1+x2)+4=3+2x1+4=9(2)(X1-X2)=(x1+x2)-4x1x2=1-4x3=-11
如图手机提问的朋友在客户端右上角评价点【评价】,然后就可以选择【满意,问题已经完美解决】了
化简原式为x1x2-3(x1+x2)+9x1x2=1/2x1+x2=-4/2=-2所以原式=31/2
设x1,x2是方程2x平方+4x-3=0的两个根,则x1+x2=-2x1·x2=-3/2∴x1平方+x2平方=(x1+x2)²-2x1·x2=(-2)²-2×(-3/2)=4+3=
首先判别式不小于零:△=4k^2-4(k^2-2k+1)≥0→k≥1/2.利用韦达定理得x1^2+x2^2=4→(x1+x2)^2-2x1x2=4→4k^2-2(k^2-2k+1)=4→k^2+2k-
3x^2+4x-7=0由韦达到理得:x1+x2=-4/3、x1x2=-7/3.x1^2+x2^2=(x1+x2)^2-2x1x2=16/9+14/3=58/9.1/x1^2+1/x2^2=(x1^2+
X1的平方+X2的平方的和=(x1+x2)的平方-2*x1x2根据韦大定理x1+x2=9/2,x1x2=6/2=3求得结果为73/4
x1,x2是方程的两根则x1+x2=5/2,x1*x2=1/2(x1-1)^2+(x2-1)^2=x1^2+x2^2-2(x1+x2)+2=(x1+x2)^2-2x1*x2-2(x1+x2)+2=(5
x1+x2=-3/2x1x2=-21/x1+1/x2=(x1+x2)/x1x2=(-3/2)/(-2)=3/4x1²+x2²=(x1+x2)²-2x1x2=(-3/2)&
x1+x2=4x1x2=-1(x1+x2)^2/(1/x1+1/x2)=(x1+x2)^2*x1x2/(x1+x2)=x1x2*(x1+x2)=-4