第22章素养练习卷 单元测试(含答案)2026-2027学年沪科版九年级数学上册

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第22章素养练习卷 单元测试(含答案)2026-2027学年沪科版九年级数学上册

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第22章素养练习
一、选择题(本大题共10小题,每小题4INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET ,共40INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
1.下列四组线段中,成比例的是(  )
A.1,2,3,4 B.3,6,9,18
C.1,3,2,8 D.1,2,4,6
2.如图,在△ABC中,DE∥BC,AD=2,BD=3,AC=10,则AE的长为(  )
INCLUDEPICTURE"卷+21.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\卷+21.tif" \* MERGEFORMATINET
A.3 B.4 C.5 D.6
3.在中华经典美文阅读中,小明同学发现自己的一本书的宽与长之比为黄金比.已知这本书的长为20 cm,则它的宽约为(  )
A.12.36 cm B.13.6 cm C.32.36 cm D.7.64 cm
4.已知a?b=4?5,则下列式子正确的是(  )
A.= B.= C.= D.=
5.如图,这是某平台销售的折叠椅子的示意图,CD与地面AB平行,已知OF=30 cm,GF=50 cm,若AB=40 cm,则CD的长是(  )
A.30 cm B. cm C.20 cm D. cm
INCLUDEPICTURE"26Q9HKJ-3.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\26Q9HKJ-3.tif" \* MERGEFORMATINET (第5题)  INCLUDEPICTURE"KAJ-1.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAJ-1.tif" \* MERGEFORMATINET (第6题)
6.如图,E,F分别为矩形ABCD的边AD,CD上的点,∠BEF=90°,则图中①、②、③、④四个三角形中一定相似的是(  )
A.①③ B.②③ C.①②③ D.①④
7.如图,在小正方形组成的网格中,△ABC和△DEF的顶点都在格点上,则∠A+∠F的度数为(  )
A.45° B.50° C.60° D.75°
INCLUDEPICTURE"KAJ-2.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAJ-2.tif" \* MERGEFORMATINET (第7题)  INCLUDEPICTURE"KAJ-3.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAJ-3.tif" \* MERGEFORMATINET (第8题)
8.如图,点A,B都是双曲线y=(k≠0,x>0)上的点,连接AB并延长交x轴于点C,已知AB=2BC,△AOC的面积为12,则k的值为(  )
A.3 B.4 C.5 D.6
9.如图,在△ABC中,∠ABC=90°,以点A为圆心,AB长为半径作弧交AC于点D,连接BD,再分别以点B,D为圆心,大于BD的长为半径作弧,两弧交于点P,作射线AP交BC于点E,连接DE,则下列结论正确的是(  )
A.DE垂直平分AC B.△ABE∽△CBA
C.BD2=BC·BE D.CE·AB=BE·CA
INCLUDEPICTURE"卷一改+2.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\卷一改+2.tif" \* MERGEFORMATINET (第9题)  INCLUDEPICTURE"J22-1.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\J22-1.tif" \* MERGEFORMATINET (第10题)
10.如图,在正方形ABCD中,F为AB上一点,E是BC延长线上一点,且AF=EC,连接EF,DE,DF,M是EF的中点,连接MC.设EF与BD和DC分别相交于点G和N,下列结论:①△FGD∽△BGE;②若BF=4,则CE=2 ;③∠CME=∠CDE;④DG2=GN·GE,其中正确的是(  )
A.①②③ B.①③④ C.②③④ D.①②④
二、填空题(本大题共4小题,每小题5INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET ,共20INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
11.在比例尺为1∶1 000 000的地图上,测得A,B两城市的距离是3.5 cm,则A,B两城市的实际距离是________km.
12.如果△ABC∽△DEF,且△ABC的三边长分别为6,12,15,△DEF的最短边长为2,那么△DEF的周长为________.
13.如图,在平面直角坐标系中,矩形OABC的顶点坐标分别是O(0,0),C(6,0),B(6,4),A(0,4).已知矩形OA′B′C′与矩形OABC位似,位似中心是原点O,且矩形OA′B′C′的面积等于矩形OABC面积的,则点B′的坐标是____________________.
INCLUDEPICTURE"卷+28.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\卷+28.tif" \* MERGEFORMATINET (第13题)  INCLUDEPICTURE"J22-3.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\J22-3.tif" \* MERGEFORMATINET (第14题)
14.如图,在矩形ABCD中,AB=4,点E为边AD上一点,AE=3,F为BE的中点.
(1)EF=________;
(2)若CF⊥BE,CE,DF相交于点O,则=________.
三、(本大题共2小题,每小题8INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET ,共16INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
15.已知线段a,b,c满足==,且a+b+c=30.
(1)求线段a,b,c的长;
(2)若线段k是线段a,b的比例中项,求线段k的长.
16.如图,直线l1∥l2∥l3,AC分别交l1,l2,l3于点A,B,C,DF分别交l1,l2,l3于点D,E,F,AC与DF交于点O.已知DE=3,EF=6,AB=4.
(1)求AC的长;
(2)若OE:OF=1:3,求OB:AB.
INCLUDEPICTURE"J19.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\J19.tif" \* MERGEFORMATINET
四、(本大题共2小题,每小题8INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET ,共16INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
17.如图,在平面直角坐标系中,每个小正方形的边长都是1个单位,△ABC的顶点都在格点上.
(1)以原点O为位似中心,
INCLUDEPICTURE"卷+32.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\卷+32.tif" \* MERGEFORMATINET
在第三象限内画出将△ABC放大为原来的2倍后的位似图形△A1B1C1;
(2)△A1B1C1的面积为______.
18.已知:如图,AD是直角三角形ABC斜边上的中线,AE⊥AD,AE交CB的延长线于点E.求证:=.
INCLUDEPICTURE"26Q9HK一改2.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\26Q9HK一改2.tif" \* MERGEFORMATINET
五、(本大题共2小题,每小题10INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET ,共20INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
19.如图,四边形ABCD是平行四边形,DE交BC于点F,交AB的延长线于点E,且∠EDB=∠C.
INCLUDEPICTURE"KAJ-5.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAJ-5.tif" \* MERGEFORMATINET
(1)求证:△ADE∽△DBE;
(2)若BE=16 cm,DE=20 cm,求DC的长.
20.汽车盲区是指驾驶员位于正常驾驶座位时(如图①),其视线被车体遮挡而不能直接观察到的那部分区域.小明在学习了交通安全知识后,对汽车盲区产生了兴趣.如图②,是他研究的一个汽车盲区的示意图,EB为驾驶员的盲区,驾驶员的眼睛点P处与地面BE的距离为1.5 m,车宽AF=1.8 m,车头FACD可近似看成一个矩形,且满足3DF=2AF,求汽车盲区EB的长度.
INCLUDEPICTURE"JL24-10.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\JL24-10.tif" \* MERGEFORMATINET
六、(本题共12INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
21.某校的数学拓展性课程班在进行知识拓展时,张老师由黄金分割点拓展到“黄金分割线”,类似地给出“黄金分割线”的定义:直线l将一个面积为S的图形分成两部INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET ,这两部分的面积分别为S1,S2,如果=,那么称直线l为该图形的黄金分割线.如图,在△ABC中,∠A=36°,AB=AC,∠ACB的平分线交AB于点D.求证:直线CD是△ABC的黄金分割线.
INCLUDEPICTURE"KAJ-6.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAJ-6.tif" \* MERGEFORMATINET
七、(本题共12INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
22.如图,在△ABC中,∠C=90°,AB=10 cm,AC=8 cm.动点N从点C出发,以每秒1 cm 的速度沿CB向终点B移动;同时,动点M从点B出发,以每秒2 cm的速度沿BA向终点A移动.两个动点中有一个到达终点即同时停止移动.连接MN,设移动时间为t(单位:s).
(1)当△BMN的面积为 cm2时,求t的值;
(2)若以B,M,N为顶点的三角形与△ABC相似,求t的值.
INCLUDEPICTURE"KAJ-7.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAJ-7.tif" \* MERGEFORMATINET
八、(本题共14INCLUDEPICTURE"赞.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\赞.tif" \* MERGEFORMATINET )
23.(1)【问题呈现】如图①,△ABC和△ADE都是等边三角形,连接BD,CE.求证:BD=CE.
(2)【类比探究】如图②,△ABC和△ADE都是等腰直角三角形,∠ABC=∠ADE=90°.连接BD,CE,则=________.
(3)【拓展提升】如图③,△ABC和△ADE都是直角三角形,∠ABC=∠ADE=90°,且==.连接BD,CE.
①求的值;
②延长CE交BD于点F,交AB于点G.若=,AB=6,求BF的长.
INCLUDEPICTURE"KAJ-8.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAJ-8.tif" \* MERGEFORMATINET
答案
一、1.B 2.B 3.A 4.C 5.B 6.A 7.A 8.D
9.D 10.B
二、11.35 12.11 13.(3,2)或(-3,-2)
14.(1) (2)
三、15.解:(1)设===m,则a=2m,b=5m,
c=3m,
∵a+b+c=30,∴2m+5m+3m=30,解得m=3,
∴a=2m=2×3=6,b=5m=5×3=15,c=3m=3×3=9.
(2)∵线段k是线段a,b的比例中项,
∴k2=ab=6×15=90,
解得k=3或k=-3(舍去),
∴线段k的长为3.
16.解:(1)∵l1∥l2∥l3,∴DE∶DF=AB∶AC,
即3∶(3+6)=4∶AC,解得AC=12.
(2)∵l2∥l3,∴OB∶OC=OE∶OF=1∶3,
∴OC=3OB.∵AB=4,AC=12,
∴BC=8,∴OC+OB=8,∴4OB=8,∴OB=2,
∴OB∶AB=2∶4=1∶2.
四、17.解:(1)如图,△A1B1C1即为所求.
INCLUDEPICTURE"J二改+1.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\J二改+1.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\J二改+1.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\J二改+1.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\J二改+1.tif" \* MERGEFORMATINET
(2)14
18.证明:∵AE⊥AD,∴∠DAE=∠BAC=90°.
∴∠DAE-∠BAD=∠BAC-∠BAD,
∴∠BAE=∠DAC.
∵AD是直角三角形ABC斜边上的中线,
∴AD=DC=BD.
∴∠C=∠DAC.∴∠BAE=∠C.
又∵∠E=∠E,∴△BAE∽△ACE.∴=.
五、19.(1)证明:由四边形ABCD为平行四边形,可知∠A=∠C.
∵∠EDB=∠C,∴∠A=∠EDB,
又∠E=∠E,∴△ADE∽△DBE.
(2)解:由(1)得△ADE∽△DBE,∴=,
∵BE=16 cm,DE=20 cm,∴AE=25 cm,
∴AB=AE-BE=9 cm.
∵四边形ABCD是平行四边形,∴DC=AB=9 cm.
20.解:如图,过点P作PN⊥EB于点N,交AF于点M.
∵3DF=2AF,AF=1.8 m,∴DF=1.2 m.
∵四边形ACDF是矩形,∴AF∥CD,∴PM⊥AF.
易知DF=MN=1.2 m,
∵PN=1.5 m,
∴PM=PN-MN=1.5-1.2=0.3(m).
∵AF∥EB,∴△PAF∽△PBE,
∴=,∴=,∴EB=9 m.
INCLUDEPICTURE"JLD24-5.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\JLD24-5.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\JLD24-5.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\JLD24-5.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\JLD24-5.tif" \* MERGEFORMATINET
六、21.证明:设△ABC中,AB边上的高为h,则S△ABC=AB·h,S△ACD=AD·h,S△BCD=BD·h,
∴S△ACD?S△ABC=AD?AB,S△BCD?S△ACD=BD?AD.
∵AB=AC,∠A=36°,∴∠B=∠ACB=72°.
∵CD平分∠ACB,∴∠ACD=∠BCD=36°,
∴∠A=∠ACD,∠CDB=180°-∠B-∠BCD=72°,
∴AD=CD,∠CDB=∠B,
∴BC=CD.∴BC=AD.
在△BCD与△BAC中,∠B=∠B,∠BCD=∠A=36°,
∴△BCD∽△BAC,
∴=,∴=,
∴S△ACD?S△ABC=S△BCD?S△ACD,
∴直线CD是△ABC的黄金分割线.
七、22.解:(1)如图,过点M作MD⊥BC于点D.
INCLUDEPICTURE"KAD22-8.tif" INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAD22-8.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAD22-8.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAD22-8.tif" \* MERGEFORMATINET INCLUDEPICTURE "C:\\Users\\庞建宇\\Desktop\\九数HK安徽 PPT+希沃\\KAD22-8.tif" \* MERGEFORMATINET
根据题意得BM=2t cm,NC=t cm.
在Rt△ABC中,∠C=90°,AB=10 cm,AC=8 cm,
∴BC===6(cm).
∴BN=(6-t)cm.
∵∠C=90°,MD⊥BC,∴∠MDB=∠ACB=90°,
∵∠MBD=∠ABC,∴△BMD∽△BAC,
∴=,即=,解得MD=t cm.
∵S△BMN=BN·MD,∴(6-t)×t=,
解得t1=t2=3,∴t的值为3.
(2)分两种情况讨论:
①当MN⊥BC时,Rt△MBN∽Rt△ABC,
此时=,即=,解得t=;
②当MN⊥AB时,Rt△NBM∽Rt△ABC,
此时=,即=,解得t=.
综上所述,t的值为或.
八、23.(1)证明:∵△ABC和△ADE都是等边三角形,
∴AD=AE,AB=AC,∠DAE=∠BAC=60°,
∴∠DAE-∠BAE=∠BAC-∠BAE,
∴∠BAD=∠CAE,∴△BAD≌△CAE,
∴BD=CE.
(2)
(3)解:①设AB=3a,
∵==,∴BC=4a,=.
又∵∠ABC=∠ADE=90°,∴△ABC∽△ADE,
∴∠BAC=∠DAE,=,
∴∠CAE=∠BAD,∴△CAE∽△BAD,
∴=.
由勾股定理,得AC==5a,
∴==.
②∵AB=6,=,∴AC=10.
由①得△CAE∽△BAD,
∴∠ACE=∠ABD.
又∵∠AGC=∠BGF,
∴△BGF∽△CGA,
∴==,
∴BF=·AC=.

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