1. 行列式的某一元素的余子式与代数余子式可以相等( )。

2.计算三阶行列式1 2 3-|||-3 1 2 2-|||-1-|||-2 3 1

设n是正整数,记Sn为曲线 =(e)^-xsin x(0leqslant xleqslant npi ) 与x轴所围图形的 面 积,求Sn,并求limSn.-|||-n→∞

9.求下列函数的极限-|||-(1) lim _(xarrow -1)dfrac ({x)^3-1}(x-1) =-|||-(3) lim _(xarrow infty )dfrac ({x)^2-1}(3{x)^2-x-1} ;-|||-(5) lim _(xarrow 3)dfrac (sqrt {x+13)-2sqrt (x+1)}({x)^2-9} :-|||-(7) lim _(xarrow 1)(dfrac (1)(1-x)-dfrac (2)(1-{x)^2}) =-|||-(9) lim _(xarrow 1)(1-x)tan dfrac (pi )(2)x ;-|||-(11) lim _(xarrow 1)(x)^dfrac (2{1-x)} =-|||-(13) lim _(xarrow infty )((dfrac {x-1)(1+x))}^x-1 =-|||-(15) lim _(xarrow -1)dfrac (ln (2+x))(sqrt [3]{1+2x)+1} =-|||-(2.) lim _(xarrow 1)dfrac ({x)^2-1}(2{x)^2-x-1} =-|||-(4) lim _(xarrow 1)dfrac (2x-1)({x)^2-5x+4} :-|||-(6) lim _(xarrow +infty )dfrac (sqrt {{x)^2+1}-1}(x) =-|||-(8) lim _(xarrow 0)dfrac (1-cos x)(xsin x) =-|||-(10) lim _(xarrow 0)dfrac (tan x-sin x)({x)^3} =-|||-(12) lim _(xarrow 0)((1-3x))^dfrac (1{x)} ;-|||-(14) lim _(xarrow 0)dfrac (x+ln (1+x))(3x-ln (1+x)) :-|||-(16) lim _(xarrow infty )((dfrac {2x+3)(2x+1))}^x+1.

-------|||-3.证明下列数列极限存在并求其值:-|||-(1)设 _(1)=sqrt (2), _(n+1)=sqrt (2{a)_(n)} =1, 2 .....-|||-(2)设 _(1)=sqrt (c)(cgt 0), _(n+1)=sqrt (c+{a)_(n)} , n=1 数学!-|||-(3) _(n)=dfrac ({c)^n}(n!)(cgt 0) . n=1,2 .----

lim _(n arrow infty)(1-(1)/(2^2))(1-(1)/(3^2)) ...(1-(1)/(n^2))= ____

在某地,下雨和晴天的时间各占一半,假设某人出门前都会使用AI预测天气,AI预测的准确率为dfrac (3)(4)如果预测有雨,某人出门一定会带伞。若预测无雨,某人也有dfrac (3)(4)的时间出门带伞。(1)试着写出写出天气情况与AI预测,(2)AI预测与带伞情况,(3)天气情况与带伞情况的条件概率矩阵。

判断设 A B 是两个随机事件且 P ( A ) = 0.5 , (Boverline (A))=0.3则 (Boverline (A))=0.3 . A . (Boverline (A))=0.3 B . √

设 0 < x_1 < 3, x_(n+1) = sqrt(x_n(3-x_n)) (n=1,2,...), 证明数列 x_n 的极限存在, 并求此极限.

填空题已知(A)=0.7, (overline (B))=0.8, (overline (B)|A)=0.6,则P(A-B) = ______.

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