判断x2-1 x2-3x 2 间断点及其类型
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![判断x2-1 x2-3x 2 间断点及其类型](/uploads/image/f/2420264-56-4.jpg?t=%E5%88%A4%E6%96%ADx2-1+x2-3x+2+%E9%97%B4%E6%96%AD%E7%82%B9%E5%8F%8A%E5%85%B6%E7%B1%BB%E5%9E%8B)
1/10x4+3x2+1=x4-x3+(x3+3x2+x)-x+1=x4-x3+x(x2+3x+1)-x+1=x4-x3-x+1=x4-(x3+3x2+x)+3x2+1=x4-x(x2+3x+1)+3
An=(2n-1)x2^n=nx2^(n+1)-2^n,则Sn=[nx2^2x(2^n-1)/(2-1)]-[2x(2^n-1)/2-1]=(2^n-1)(4n-1)
设(x²-1)/(x²+2x)=t则8t+3/t=118t²-11t+3=0(8t-3)(t-1)=0解得t=3/8或t=11.t=3/8(x²-1)/(x
x2+3x2+1=0中的3x2表示什么?再问:已知X2+3X+1=0,求X2+1/X2的值?得数是7。求过程?我打的是X的平方。怎么会出X2、再答:答:因为x≠0,两边都除以x得:x+1/x=-3,两
原式=(x²+3x+9)/(x-3)(x²+3x+9)-6x/x(x-3)(x+3)-(x-1)/2(x+3)=1/(x-3)-6/(x-3)(x+3)-(x-1)/2(x+3)=
3/x2=1/x2-x即3*2-3x=x*22x*2=3Xx=0(舍去)x=3/2
(1)原式=x(x+9)x(x+3)+(x+3)(x−3)(x+3)2=x+9x+3+x−3x+3=2(x+3)x+3=2;(2)原式=-x−2x−1÷x2−4x−1=-x−2x−1•x−1(x+2)
2^5-5x2^4+10x2^3-10x2^2+5x2-1=(2-1)^5=1再问:有过程吗再答:晕,这是二项式的展开式啊,就这样:(a+b)^n=a^n+C(n,1)a^(n-1)b+C(n,2)a
x^2+3x+1=0方程两边同除以xx+3+1/x=0x+1/x=-3x^2+1/x^2=(x+1/x)^2-2=(-3)^2-2=9-2=7
(x2+3/根号x2+1)^2-(2根号2)^2=(x^4-2x^2+1)/8(x^2+1)=(x^2-1)/8(x^2+1)>=0,又因为不等式两边均为正,所以x2+3/根号x2+1≥2根号2
Sn=1*2+3*2^2+5*2^3+……+(2n-1)*2^n2Sn=1*2^2+3*2^3+...+(2n-1)*2^(n+1)相减得-Sn=1*2+2*2^2+2*2^3+..+2*2^n-(2
7/(x+x2)-3/(x-x2)=6/(x2-1)两边同乘以x(x+1)(x-1),得7(x-1)+3(x+1)=6x7x-7+3x+3=6x10x-6x=3-74x=-4x=-1经检验x=-1是增
两边乘x(x+1)(x-1)2(x-1)+3(x+1)=4x2x-2+3x+3=4x5x+1=4xx=-1经检验,x=-1时分母x+1=0增根,舍去方程无解
令t=x^2+1>=1则x^2=t-1代入函数得:f=[(t-1)^2+3(t-1)+6]/t=[t^2-2t+1+3t-3+6]/t=[t^2+t+4]/t=t+4/t+1t+4/t>=2√(t*4
x²+x-1/(x²+x)=3/2两边同时乘以(x²+x)得:(x²+x)²-1=3(x²+x)/22(x²+x)²-3
原式=-2x2+3x-5x+2x2+1+x2=x2-2x+1.
根据函数z的定义域可知z=sin(xy)/(1-x²-y²)的全部间断点为1-x²-y²=0,这些间断点都位于单位圆上,以集合形式表达应为:{(x,y)|x
可以的.设Sn等于原式,然后用2Sn-Sn做错位相减,就可以等到答案,你试试吧,
X2-3X-1=0则X-3-1/X=0则X-1/X=3则(X-1/X)²=3²=9则X²-2+1/X²=9则X²+1/X²=9+2=11