+(a)_(2n)x+(a)_(2n+1)=0-|||-至少有一个实根,其中a0,a1,···, _(2n+1) 均为常数, in N.-|||-5.证明:方程
【例14】设a_(1)+a_(2)+...+a_(n)=0,求证:方程na_(n)x^n-1+(n-1)a_(n-1)x^n-2+...+2a_(2)x+a_(
+dfrac ({a)_(n)}(n+1)=0, 证明方程 _(0)+(a)_(1)x+-|||-_(2)(x)^2+... +(a)_(n)(x)^n=0 在
+(a)_(n)=0, 求证:方程 (a)_(n)(x)^n-1+(n-1)(a)_(n-1)(x)^n-2+... +2(a)_(2)x+-|||-_(1)=
若方程a_0x^n+a_1x^n-1+…+a_(n-1)x=0有一个正根x=x_0, 证明方程a_0nx^n-1+a_1(n-1)x^n-2+…+a_(n-1)
4.设A_(2n-1)=(0,(1)/(n)),A_(2n)=(0,n),n=1,2,….求出集列(A_{n)}的上限集和下限集.4.设$A_{2n-1}=\l
4.设A_(2n-1)=(0,(1)/(n)),A_(2n)=(0,n),n=1,2,···,求出集列A_(n)的上限集和下限集.4.设$A_{2n-1}=(0
20.设a_(n)=int_(0)^1x^nsqrt(1-x^2)dx(n=0,1,2,...),则lim_(ntoinfty)((a_(n))/(a_(n-2
,-|||-;-|||-(3) (x)_(1)+(n-1)(x)_(2)+... +2(x)_(n-1)+(x)_(n)=0
+(a)_(n-1)x=0 有一个正根 =(x)_(0) ,证明方程 _(0)n(x)^n-1+(a)_(1)(n-1)(x)^n-2+... +(a)_(n-