精品上海市各区2019届精品中考二模数学分类汇编:综合计算专题(含答案)

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上海市各区2018届九年级中考二模数学试卷精选汇编综合计算宝山区、嘉定区21.(本题满分10分,第(1)小题5分,第(2)小题5分)如图4,在梯形ABCD 中,AD ∥BC ,︒=∠90BAD ,AD AC =. (1)如果BAC ∠︒=∠-10BCA ,求D ∠的度数; (2)若10=AC ,31cot =∠D ,求梯形ABCD 的面积.21.解:(1)∵AD ∥BC∴CAD BCA ∠=∠ …………………1分 ∵BAC ∠︒=∠-10BCA∴BAC ∠︒=∠-10CAD …………………1分 ∵︒=∠90BAD∴BAC ∠︒=∠+90CAD∴︒=∠40CAD …………………1分 ∵AD AC =∴D ACD ∠=∠ …………………1分 ∵︒=∠+∠+∠180CAD D ACD∴︒=∠70D …………………1分(2) 过点C 作AD CH ⊥,垂足为点H ,在Rt △CHD 中,31cot =∠D ∴31cot ==∠CH HD D …………………………1分 设x HD =,则x CH 3=,∵AD AC =,10=AC ∴x AH -=10在Rt △CHA 中,222AC CH AH =+ ∴22210)3()10(=+-x x ∴2=x ,0=x (舍去)∴2=HD …………1分 ∴6=HC ,8=AH ,10=AD ………………1分 ∵︒=∠=∠90CHD BAD ∴AB ∥CH∵AD ∥BC ∴四边形ABCH 是平行四边形 ∴8==AH BC ………1分 ∴梯形ABCD 的面积546)810(21)(21=⨯+=⨯+=CH BC AD S ………1分 长宁区21.(本题满分10分,第(1)小题4分,第(2)小题6分)如图,在等腰三角形ABC 中,AB =AC ,点D 在BA 的延长线上,BC =24,135sin =∠ABC . 图4DCB A图4DCB AH AD(1)求AB 的长;(2)若AD =6.5,求DCB ∠的余切值.21.(本题满分10分,第(1)小题4分,第(2)小题6分) 解:(1)过点A 作AE ⊥BC ,垂足为点E又∵AB =AC ∴BC BE 21= ∵BC =24 ∴ BE =12 (1分)在ABE Rt ∆中,︒=∠90AEB ,135sin ==∠AB AE ABC (1分)设AE=5k,AB=13k ∵222BE AE AB += ∴1212==k BE∴1=k , ∴55==k AE , 1313==k AB (2分) (2)过点D 作DF ⊥BC ,垂足为点F∵AD=6.5,AB=13 ∴BD=AB+AD=19.5∵AE ⊥BC ,DF ⊥BC ∴ ︒=∠=∠90DFB AEB ∴ DF AE //∴BDABBF BE DF AE == 又 ∵ AE =5,BE =12,AB =13, ∴18,215==BF DF (4分) ∴BF BC CF -= 即61824=-=CF (1分)在DCF Rt ∆中,︒=∠90DFC ,542156cot ===∠DF CF DCB (1分)崇明区21.(本题满分10分,第(1)、(2)小题满分各5分)已知圆O 的直径12AB =,点C 是圆上一点,且30ABC ∠=︒,点P 是弦BC 上一动点, 过点P 作PD OP ⊥交圆O 于点D .(1)如图1,当PD AB ∥时,求PD 的长;(2)如图2,当BP 平分OPD ∠时,求PC 的长.21.(本题满分10分,每小题5分) (1)解:联结OD(第21题图1) A BO P C D(第21题图2)OA BDPC∵直径12AB = ∴6OB OD == ……………………………………1分∵PD OP ⊥ ∴90DPO =︒∠∵PD AB ∥ ∴180DPO POB +=︒∠∠ ∴90POB =︒∠ ……1分 又∵30ABC =︒∠,6OB =∴30OP OB tan =︒= ………………………………………………1分 ∵在Rt POD △中,222PO PD OD += ……………………………1分∴2226PD +=∴PD =……………………………………………………………1分 (2)过点O 作OH BC ⊥,垂足为H ∵OH BC ⊥∴90OHB OHP ==︒∠∠ ∵30ABC =︒∠,6OB =∴132OH OB ==,30BH OB cos =︒= ……………………2分 ∵在⊙O 中,OH BC ⊥∴CH BH == ……………………………………………………1分 ∵BP 平分OPD ∠ ∴1452BPO DPO ==︒∠∠ ∴453PH OH cot =︒= ……………………………………………1分∴3PC CH PH =-= ………………………………………1分奉贤区21.(本题满分10分,每小题满分各5分)已知:如图6,在△ABC 中,AB =13,AC=8,135cos =∠BAC ,BD ⊥AC ,垂足为点D ,E 是BD 的中点,联结AE 并延长,交边BC 于点F . (1) 求EAD ∠的余切值; (2) 求BFCF的值.AD E21、(1)56; (2)58; 黄浦区21.(本题满分10分)如图,AH 是△ABC 的高,D 是边AB 上一点,CD 与AH 交于点E .已知AB =AC =6,cos B =23, AD ∶DB =1∶2.(1)求△ABC 的面积; (2)求CE ∶DE.21. 解:(1)由AB =AC =6,AH ⊥BC ,得BC =2BH .—————————————————————————(2分)在△ABH 中,AB =6,cosB =23,∠AHB =90°, 得BH =2643⨯=,AH=2分) 则BC =8,所以△ABC 面积=182⨯=——————————————(1分) (2)过D 作BC 的平行线交AH 于点F ,———————————————(1分)由AD ∶DB =1∶2,得AD ∶AB =1∶3,则31CE CH BH AB DE DF DF AD ====. ——————————————(4分)金山区21.(本题满分10分,每小题5分)如图5,在矩形ABCD 中,E 是BC 边上的点,AE =BC ,DF ⊥AE ,垂足为F . (1)求证:AF=BE ; (2)如果BE ∶EC=2∶1,求∠CDF 的余切值.21.解:(1)∵四边形ABCD 是矩形,∴AD =BC ,AD ∥BC ,∠B =90°,∴∠DAF=∠A B C D F E图5AEB ,……………………………………………………………………(1分)∵AE=BC ,DF ⊥AE ,∴AD=AE ,∠ AFD=∠EBA=90°,………………………(2分) ∴△ADF ≌△EAB ,∴AF =EB ,………………………………………………………(2分)(2)设BE =2k ,EC =k ,则AD =BC =AE =3k ,AF =BE =2k ,…………………………(1分)∵∠ADC =90°,∠AFD =90°,∴∠CDF +∠ADF =90°,∠DAF +∠ADF =90°,∴∠CDF =∠DAF …………………………………………………………………(2分)在Rt △ADF 中,∠AFD =90°,DF=∴cot ∠CDF =cot ∠DAF=5AF DF ==.………………………………(2分) 静安区21.(本题满分10分,第(1)小题满分5分,第(2)小题满分5分)已知:如图,边长为1的正方形ABCD 中,AC 、DB 交于点H .DE 平分∠ADB ,交AC 于点E .联结BE 并延长,交边AD 于点F .(1)求证:DC =EC ; (2)求△EAF 的面积.21.(本题满分10分, 第(1)小题5分,第(2)小题5分)解:(1)∵正方形ABCD ,∴DC=BC=BA=AD , ∠BAD =∠ADC =∠DCB =∠CBA =90° AH=DH=CH=BH , AC ⊥BD ,∴∠ADH =∠HDC =∠DCH =∠DAE = 45°. …………(2分) 又∵DE 平分∠AD B ∴∠ADE =∠EDH∵∠DAE +∠ADE =∠DEC , ∠EDH +∠HDC =∠EDC …………(1分) ∴∠EDC =∠DEC …………(1分) ∴DC =EC …………(1分)(2)∵正方形ABCD ,∴AD ∥BC ,∴△AFE ∽△CBE ∴2)(ECAE S S CEB AEF =∆∆ ………………………………(1分) ∵AB=BC=DC=EC =1,AC =2,∴AE =12- …………………………(1分)Rt △BHC 中, BH =22BC =22,第21题图第21题图∴在△BEC 中,BH ⊥EC , 4222121=⨯⨯=∆BEC S ……………………(2分) ∴2)12(42-=∆AEF S , ∴4423)223(42-=-⨯=∆AEF S …………(1分) 闵行区21.(本题满分10分,其中第(1)小题4分,第(2)小题6分)已知一次函数24y x =-+的图像与x 轴、y 轴分别交于点A 、B ,以AB 为边在第一象限内作直角三角形ABC ,且∠BAC = 90o ,1tan 2ABC ∠=. (1)求点C 的坐标; (2)在第一象限内有一点M (1,m ),且点MC 位于直线AB 的同侧,使得ABC ABM S S ∆∆=2求点M 的坐标.21.解:(1)令0y =,则240x -+=,解得:2x =,∴点A 坐标是(2,0).令0x =,则4y =,∴点B 坐标是(0,4).………………………(1分)∴AB 1分)∵90BAC ∠=,1tan 2ABC ∠=,∴AC =过C 点作CD ⊥x 轴于点D ,易得OBA DAC ∆∆∽.…………………(1分) ∴2AD =,1CD =,∴点C 坐标是(4,1).………………………(1分)(2)11522ABC S AB AC ∆=⋅=⨯.………………………………(1分)∵2ABM ABC S S ∆∆=,∴52ABM S ∆=.……………………………………(1分)∵(1M ,)m ,∴点M 在直线1x =上;令直线1x =与线段AB 交于点E ,2ME m =-;……………………(1分) 分别过点A 、B 作直线1x =的垂线,垂足分别是点F 、G ,∴AF +BG = OA = 2;……………………………………………………(1分)∴111()222ABM BME AME S S S ME BG ME AF ME BG AF ∆∆=+=⋅+⋅=+1152222ME OA ME =⋅=⨯⨯=…………………(1分) ∴52ME =,522m -=,92m =,∴(1M ,92).……………………(1分)普陀区21.(本题满分10分)如图7,在Rt △ABC 中,90C ∠=,点D 在边BC 上,DE ⊥AB ,点E 为垂足,7AB =,(第21题图)45DAB ∠=,3tan 4B =. (1)求DE 的长;(2)求CDA ∠的余弦值.21.解:(1)∵DE ⊥AB ,∴︒=∠90DEA又∵45DAB ∠=,∴AE DE =. ······································································· (1分)在Rt △DEB 中,︒=∠90DEB ,43tan =B ,∴43=BE DE . ······························· (1分)设x DE 3=,那么x AE 3=,x BE 4=. ∵7AB =,∴743=+x x ,解得1=x . ······························································ (2分) ∴3=DE . ············································································································· (1分)(2) 在Rt △ADE 中,由勾股定理,得23=AD . ················································· (1分)同理得5=BD . ······································································································ (1分) 在Rt △ABC 中,由43tan =B ,可得54cos =B .∴528=BC . ····················· (1分) ∴53=CD . ············································································································· (1分)∴102cos ==∠AD CD CDA .················································································· (1分)即CDA ∠ 青浦区21. (本题满分10分,第(1)、(2)小题,每小题5分)如图5,在Rt △ABC 中,∠C =90°,AC=3,BC =4,∠ABC 的平分线交边AC 于点D ,延长BD 至点E ,且BD=2DE ,联结AE .(1)求线段CD 的长; (2)求△ADE 的面积.21.解:(1)过点D 作DH ⊥AB ,垂足为点H . ·································································· (1分)∵BD 平分∠ABC ,∠C =90°, ∴DH = DC =x , ··································································································· (1分) 则AD =3-x .∵∠C =90°,AC=3,BC =4,∴AB =5. ····························································· (1分)∵sin ∠==HD BCBAC AD AB, ∴435=-x x , ·································································································· (1分) E D CBA图5∴43=x . ··········································································································· (1分) (2)1141052233=⋅=⨯⨯=ABDSAB DH . ····························································· (1分) ∵BD=2DE , ∴2==ABD ADES BDSDE, ····················································································· (3分) ∴1015323=⨯=ADES. ···················································································· (1分) 松江区21.(本题满分10分, 每小题各5分)如图,已知△ABC 中,∠B =45°,1tan 2C =,BC =6.(1)求△ABC 面积;(2)AC 的垂直平分线交AC 于点D ,交BC 于 点E. 求DE 的长.21.(本题满分10分, 每小题各5分) 解:(1)过点A 作AH ⊥BC 于点H …………1分 在Rt ABC ∆中,∠B =45°设AH =x ,则BH =x ………………………………1分 在Rt AHC ∆中,1tan 2AH C HC == ∴HC=2x ………………………………………………………1分 ∵BC =6∴x+2x =6 得x =2∴AH =2…………………………………………………………1分 ∴162ABC S BC AH ∆=⋅⋅=……………………………………1分(2)由(1)得AH =2,CH=4在Rt AHC ∆中,AC =2分 ∵DE 垂直平分AC ∴12CD AC =ED ⊥AC …………………………………………………1分 在Rt EDC ∆中,1tan 2ED C CD ==……………………………1分 (第21题图)DA∴DE =………………………………………………1分 徐汇区21. 如图,在Rt ABC ∆中,90C ∠=︒,3AC =,4BC =,AD 平分BAC ∠交BC 于点D . (1)求tan DAB ∠;(2)若⊙O 过A 、D 两点,且点O 在边AB 上,用 尺规作图的方法确定点O 的位置并求出的⊙O 半径. (保留作图轨迹,不写作法)杨浦区21、(本题满分10分,第(1)小题满分3分,第(2)小题满分7分)已知,如图5,在梯形ABCD 中,DC//AB, AD=BC, BD 平分∠ABC ,∠A =600 求:(1)求∠CDB 的度数(2)当AD =2时,求对角线BD 的长和梯形ABCD 的面积。