新課程能力培養(yǎng)九年級(jí)數(shù)學(xué)北師大版
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12. (2024·重慶) 如圖��,在△ABC中�����,延長(zhǎng)AC至點(diǎn)D����,使CD = CA��,過(guò)點(diǎn)D作DE∥CB��,且DE = DC�����,連接AE交BC于點(diǎn)F. 若∠CAB = ∠CFA�����,CF = 1�,則BF = _________.
答案:1
13. (2024·蘇州) 如圖����,在△ABC中�,∠ACB = 90°���,CB = 5���,CA = 10,點(diǎn)D��,E分別在AC���,AB邊上��,AE = $\sqrt{5}$AD�,連接DE��,將△ADE沿DE翻折���,得到△FDE���,連接CE,CF. 若△CEF的面積是△BEC面積的2倍��,則AD = _________.
答案:
14. (2024·河南) 如圖�,在□ABCD中�,對(duì)角線AC�,BD相交于點(diǎn)O,點(diǎn)E為OC的中點(diǎn)�����,EF∥AB交BC于點(diǎn)F. 若AB = 4���,則EF的長(zhǎng)為( )A. $\frac{1}{2}$ B. 1 C. $\frac{4}{3}$ D. 2
答案:B
15. (2024·德陽(yáng)) 如圖����,在菱形ABCD中�����,∠ABC = 60°����,對(duì)角線AC與BD相交于點(diǎn)O�,點(diǎn)F為BC的中點(diǎn),連接AF與BD相交于點(diǎn)E����,連接CE并延長(zhǎng)交AB于點(diǎn)G. 求證:(1) △BEF∽△BCO����;(2) △BEG≌△AEG.
答案:(1) 證明:在菱形ABCD中��,BO⊥AC�����,BC = AB�,因?yàn)椤螦BC = 60°,所以△ABC是等邊三角形����,點(diǎn)F為BC的中點(diǎn),則OF是△ABC的中位線���,OF∥AB�,所以∠BEF = ∠BCO�,∠EBF = ∠OBC,所以△BEF∽△BCO��;(2) 證明:因?yàn)椤鰽BC是等邊三角形���,F(xiàn)是BC中點(diǎn)�����,所以AF⊥BC�����,BF = CF���,又因?yàn)锽O⊥AC�����,∠ABC = 60°��,∠BAC = 60°,在菱形ABCD中���,AB = BC�,∠ABO = ∠CBO = 30°�����,由(1) △BEF∽△BCO�����,可得$\frac{BE}{BC}=\frac{BF}{BO}$,因?yàn)锽F=$\frac{1}{2}$BC�����,所以BE = EC��,∠EBC = ∠ECB = 30°��,∠BEC = 120°�,∠AEG = ∠BEC = 120°,∠EAG = 60° - ∠BAE��,∠EBG = 30°�����,∠BGE = 180° - 120° - 30° = 30°����,所以∠EBG = ∠BGE,BG = EG�,又因?yàn)锳E = EC = BE,所以△BEG≌△AEG(SSS)。
16. (2024·上海) 如圖����,在矩形ABCD中,E為邊CD上一點(diǎn)���,且AE⊥BD. (1) 求證:AD2 = DE·DC�����;(2) F為線段AE的延長(zhǎng)線上一點(diǎn)�,且滿足EF = CF = $\frac{1}{2}$BD��,求證:CE = AD.
答案:(1) 證明:因?yàn)樗倪呅蜛BCD是矩形��,所以∠ADC = 90°�,∠ADE+∠CDE = 90°,因?yàn)锳E⊥BD����,所以∠DAE+∠ADE = 90°���,則∠DAE = ∠CDE�����,又因?yàn)椤螦DE = ∠ADC = 90°�����,所以△ADE∽△DCA����,所以$\frac{AD}{DC}=\frac{DE}{AD}$,即AD2 = DE·DC�;(2) 證明:連接AC,因?yàn)樗倪呅蜛BCD是矩形����,所以AC = BD,因?yàn)镋F = CF = $\frac{1}{2}$BD�����,所以EF = CF = $\frac{1}{2}$AC�����,取AC中點(diǎn)O��,連接OF,因?yàn)椤螦EC = 90°(AE⊥BD�,矩形性質(zhì)),所以O(shè)F = $\frac{1}{2}$AC = EF = CF�����,所以點(diǎn)E在以F為圓心���,CF為半徑的圓上��,∠ECF = ∠EFC���,因?yàn)椤螪AE = ∠CDE((1)中已證),∠AED = ∠DEC = 90°���,在矩形ABCD中�����,AC = BD�����,又EF = CF = $\frac{1}{2}$BD����,所以AC = 2CF���,因?yàn)椤螦EC = 90°�,所以∠EAC+∠ECA = 90°���,又∠DAC+∠EAC = 90°���,所以∠DAC = ∠ECA,因?yàn)椤鰽DE∽△DCA��,所以$\frac{AD}{AC}=\frac{DE}{AD}$����,設(shè)AD = x,DC = y���,由AD2 = DE·DC得DE=$\frac{x^{2}}{y}$���,EC = y - $\frac{x^{2}}{y}$,通過(guò)角度關(guān)系和邊的關(guān)系可證得△ADC≌△CEF(AAS或ASA等方法��,具體過(guò)程:因?yàn)椤螪AC = ∠ECA,∠ADC = ∠CEF = 90°���,AC = 2CF����,EF = CF�����,所以可證全等)�,所以CE = AD。
