lisa+ann+is+back
答:初一数学下学期期末试卷 1998.7 学校___ 班级___ 姓名___题号 一 二 三 四 五 六 七 八 九 总分 分数 一、填空题:(每小题2分,共20分)(1)已知方程2x-3y+4=0,用含有y的代数式表示x,应写成___。(2)已知x=5,y=7满足kx-2y=1,则k=___。(3)不等式2x-4<0的解...
答:Ann: Hello.___1___ Jane: I am sorry, she isn't in. She goes out for shopping. This is Jane speaking. ___2___ Ann: Yes, could you ask her to call me back this afternoon, please? Jane: Sure. What's your name, please? Ann: Ann. Jane: ___3___ Ann: Yes. A---N---...
答:6.Keren Ann(凯伦 安)-《Right Now & Right Here》(凯伦 安可以说是一位小资才女,有陈绮贞的感觉,小小的清爽,安静下来,你会得到不一样的心情)7.Lenka-《The show》(熟悉的旋律,依然的轻快,她的另一首《Trouble is a friend》也是大家为熟悉的)8.《Summer Passion》(这是我从苏荷酒吧...
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呼点19746584224:
等差数列有如下性质,若数列{an}是等差数列,则当bn=a1+a2+…+ann(n∈N*)时,数列{bn}也是等差数列;类比上述性质,相应地{cn}是正项等比数列,当数... -
43793满义
:[答案] 由数列{an}是等差数列,则当bn= a1+a2+…+an n(n∈N*)时,数列{bn}也是等差数列. 类比得到:{cn}是正项等比数列,当数列dn=(c1c2…cn) 1 n时,数列{dn}也是等比数列. 证明如下: ∵{cn}是正项等比数列,设其公比为q, ∴(c1c2…cn) 1 n=(c1nq1+...
呼点19746584224:
C语言课程设计 - 学生成绩管理程序 -
43793满义
: #include /*引用库函数*/ #include #include #include typedef struct /*定义结构体数组*/ { char...
呼点19746584224:
英语祈使句与直接引语间接引语的语法讲解 -
43793满义
: 引述别人的话时,一般采用两种方式:一是引用别人的原话,把它放在引号内,称为直接引语;二是用自己的话加以转述,被转述的话不放在引号内,称为间接引语.间接引语在大多数...
呼点19746584224:
用Who引导的疑问句怎么改?用WHO引导的疑问句,应该也是WHO+一般疑问句,像下面这个题,为什么没有借助DO呢 1.(Bob) helped Ann.改为who helped ... -
43793满义
:[答案] 疑问代词who 及what 属于疑问代词,而代词的句法功能是既可以作宾语和表语也可以作主语. 1、如果作宾语或表语,因为who 或what 是提前的代词,句子中另有主语,这是要求把主语要和谓语颠倒过来...
呼点19746584224:
根据下列条件,写出数列的前四项,并归纳猜想它的通项公式:①a1=1,an+1=an+ann+1(n∈N*)②a1= - 1,an+1=an+1n(n+1)(n∈N*) -
43793满义
:[答案] ①∵a1=1,an+1=an+ an n+1, ∴a2=a1+ a1 1+1= 3 2,∴a3=a2+ a2 2+1=2, 同理可得a4= 5 2,猜想an= n+1 2; ②∵a1=-1,an+1=an+ 1 n(n+1), ∴a2=a1+ 1 1*2=- 1 2,∴a3=a2+ 1 2*3=- 1 3, 同理可得a4=- 1 4,猜想an=- 1 n
呼点19746584224:
线性代数的证明题设n阶矩阵A=(aij)的特征值为 λ1, λ2, …… λn,证明:(1)λ1 +λ2 +……+λn=a11+a22+……+ann;(2)λ1 •λ2 •…•λn=|A|.没有,书上没有... -
43793满义
:[答案] 特征方程|λEn-A|=0的根为λ1, λ2, … λn 则|λEn-A|=(λ-λ1)(λ-λ2)…(λ-λn)=λ^n-(∑λi)λ^(n-1)+…+(-1)^n(∏λi) 取λ=0,即得|-A|=(-1)^n(∏λi) 因而|A|=∏λi,即λ1 •λ2 •…•λn=|A| 再根据行列式定义可得, |λEn-A|=(λ-a11)(λ-a22)…(λ-ann)+{(n!-1)个不含λ^n...
呼点19746584224:
一道求数列通项公式的问题2An+1=An+1/Ann+1是下标2A(n+1)=A(n)+1/A(n) -
43793满义
:[答案] 2A(n+1)+2 = An + 1/An + 2 = (An^2 + 2An + 1)/An 2A(n+1)-2 = An + 1/An - 2 = (An^2 - 2An + 1)/An => (A(n+1)+1)/(A(n+1)-1) = ((An+1)/(An-1))^2 设bn = (An+1)/(An-1) => b(n+1)=bn^2 => lgb(n+1)=2lgbn => lgbn = 2^(n-1)lgb1 => bn = b1*10^(2^(n-1)) ...
呼点19746584224:
已知数列{an}满足a1=1,若点(ann,an+1n+1)在直线x - y+1=0上,则an=___. -
43793满义
:[答案] ∵点( an n, an+1 n+1)在直线x-y+1=0上, ∴ an n- an+1 n+1+1=0, 即 an+1 n+1- an n=1, 故数列{ an n}是公差为1的等差数列,首项为 a1 1=1, 则 an n=1+n-1=n, 则an=n2, 故答案为:n2
呼点19746584224:
...shouldn"t break off the school rules4.I see him play basketball.5.Tom brought us some gifs(2句)6.Parents always wong about therir children"s students.7.... -
43793满义
:[答案] 1.The old people are often looked after by them. 2.什么叫the his made?初步理解为:He was made at night by his work. 3.The school rules should not be broken off by the students. 4.He is seen to play basketball by me. 5.Some gifts were brought to us ...
