(Ⅰ)求證:; 查看更多

 

題目列表(包括答案和解析)

(Ⅰ)求證:
sinx
1-cosx
=
1+cosx
sinx
;
(Ⅱ)化簡(jiǎn):
tan(3π-α)
sin(π-α)sin(
3
2
π-α)
+
sin(2π-α)cos(α-
2
)
sin(
2
+α)cos(2π+α)

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(Ⅰ)求證:
C
m
n
=
n
m
C
m-1
n-1
;
(Ⅱ)利用第(Ⅰ)問(wèn)的結(jié)果證明Cn1+2Cn2+3Cn3+…+nCnn=n•2n-1;  
(Ⅲ)其實(shí)我們常借用構(gòu)造等式,對(duì)同一個(gè)量算兩次的方法來(lái)證明組合等式,譬如:(1+x)1+(1+x)2+(1+x)3+…+(1+x)n=
(1+x)[1-(1+x)n]
1-(1+x)
=
(1+x)n+1-(1+x)
x
;,由左邊可求得x2的系數(shù)為C22+C32+C42+…+Cn2,利用右式可得x2的系數(shù)為Cn+13,所以C22+C32+C42+…+Cn2=Cn+13.請(qǐng)利用此方法證明:(C2n02-(C2n12+(C2n22-(C2n32+…+(C2n2n2=(-1)nC2nn

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(Ⅰ)求證:
sinx
1-cosx
=
1+cosx
sinx

(Ⅱ)化簡(jiǎn):
tan(3π-α)
sin(π-α)sin(
3
2
π-α)
+
sin(2π-α)cos(α-
2
)
sin(
2
+α)cos(2π+α)

查看答案和解析>>

(Ⅰ)求證:;
(Ⅱ)化簡(jiǎn):

查看答案和解析>>

(Ⅰ)求證:
(Ⅱ)利用第(Ⅰ)問(wèn)的結(jié)果證明Cn1+2Cn2+3Cn3+…+nCnn=n•2n-1;  
(Ⅲ)其實(shí)我們常借用構(gòu)造等式,對(duì)同一個(gè)量算兩次的方法來(lái)證明組合等式,譬如:(1+x)1+(1+x)2+(1+x)3+…+(1+x)n=;,由左邊可求得x2的系數(shù)為C22+C32+C42+…+Cn2,利用右式可得x2的系數(shù)為Cn+13,所以C22+C32+C42+…+Cn2=Cn+13.請(qǐng)利用此方法證明:(C2n2-(C2n12+(C2n22-(C2n32+…+(C2n2n2=(-1)nC2nn

查看答案和解析>>

1-10.CDBBA   CACBD

11. 12. ①③④   13.-2或1  14.   15.2  16.  17..

18.

解:(1)由已知            7分

(2)由                                                                   10分

由余弦定理得                          14分

 

19.(1)證明:∵PA⊥底面ABCD,BC平面AC,∴PA⊥BC,                                  3分

∵∠ACB=90°,∴BC⊥AC,又PA∩AC=A,∴BC⊥平面PAC.                             5分

(2)解:過(guò)C作CE⊥AB于E,連接PE,

∵PA⊥底面ABCD,∴CE⊥面PAB,

∴直線PC與平面PAB所成的角為,                                                    10分

∵AD=CD=1,∠ADC=60°,∴AC=1,PC=2,

中求得CE=,∴.                                                  14分

 

20.解:(1)由①,得②,

②-①得:.                              4分

(2)由求得.          7分

   11分

.                                                                 14分

 

21.解:

(1)由得c=1                                                                                     1分

,                                                         4分

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    市一次模文數(shù)參答―1(共2頁(yè))
                                                                                            5分
    (2),時(shí)取得極值.由,.                                                                                          8分
    ,,∴當(dāng)時(shí),, 
    上遞減.                                                                                       12分
    ∴函數(shù)的零點(diǎn)有且僅有1個(gè)     15分
     
    22.解:(1) 設(shè),由已知
    ,                                        2分
    設(shè)直線PB與圓M切于點(diǎn)A,
                                                     6分
    (2) 點(diǎn) B(0,t),點(diǎn),                                                                  7分
    進(jìn)一步可得兩條切線方程為:
    ,                                   9分
    ,
    ,,                                          13分
    ,又時(shí),,
    面積的最小值為                                                                            15分
     
     
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