Cho tam giác ABC vuông tại A có AC>AB. Đường cao AH. Từ H kẻ HD\(\perp\)AB (D\(\in\)AB), HE\(\perp\)AC( E\(\in\)AC).a. C... - H

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Gọi I là giao điểm của DE và AH.

Câu a) Ta dễ dàng chứng minh được ADHE là hình chữ nhật, sử dụng tính chất hình chữ nhật để suy ra \(\widehat{ADE}=\widehat{DAH}\)

Mà \(\widehat{DAH}=\widehat{C}\) (cùng phụ với góc ABC) nên suy ra \(\widehat{ADE}=\widehat{C}\)

Từ đó dễ dàng chứng minh được tam giác AED đồng dạng với tam giác ABC theo trường hợp góc - góc.

Câu b) Chắc là phải sử dụng lớp 9 sẽ nhanh hơn. Các bạn thử tìm thêm cách khác nhé

Chứng minh tứ giác ABNM nội tiếp suy ra \(\widehat{ANB}=\widehat{AMB}\)

Dễ dàng chứng minh được \(\widehat{AMB}=\widehat{ABC}=\widehat{AED}\)

Suy ra: \(\widehat{ANB}=\widehat{AED}\)và hai góc này ở vị trí đồng vị, suy ra: DE //BN

Câu 3. Sử dụng tỉ số  đồng dạng hợp lí rồi suy ra kết quả

Ta dễ dàng chứng minh được: \(\Delta BDH\)\(\Delta BAC\).và tính được \(BD=\frac{DH.AB}{AC}\)

Chứng minh được: \(\Delta CEH\)\(\Delta CAB\).và tính được \(CE=\frac{EH.AC}{AB}\)

Chứng minh được: \(\Delta DHE\)\(\Delta BAC\).và suy ra được \(\frac{DH}{EH}=\frac{AB}{AC}\)

Suy ra: \(\frac{BD}{CE}=\frac{DH.AB}{AC}:\frac{EH.AC}{AB}=\frac{AB^2.DH}{AC^2.EH}=\frac{AB^2.AB}{AC^2.AC}\)

Vậy \(\frac{BD}{CE}=\frac{AB^3}{AC^3}\)

giup mình với mai đi hc rồi

Bài 1)

a) Tứ giác AIHK có 3 góc vuông \(\widehat{HKA}=\widehat{HIA}=\widehat{KAI}=90^0\)

Nên suy ra góc còn lại cũng vuông.Tứ giác có 4 góc vuông là hình chữ nhật

b) Câu này không đúng rồi bạn 

Nếu thực sự hai tam giác kia đồng dạng thì đầu bài phải cho ABC vuông cân 

Vì nếu góc AKI = góc ABC = 45 độ ( IK là đường chéo đồng thời là tia phân giác của hình chữ nhật)

c) Ta có : Theo hệ thức lượng trong tam giác ABC vuông

\(AB^2=BC.BH=13.4\)

\(\Rightarrow AB=2\sqrt{13}\)

\(AC=\sqrt{9\cdot13}=3\sqrt{13}\)

Vậy \(S_{ABC}=\frac{AB\cdot AC}{2}=\frac{6\cdot13}{2}=39\left(cm^2\right)\)

Bài 2)

a) \(ED=AD-AE=17-8=9\)

Xét tỉ lệ giữa hai cạnh góc vuông trong hai tam giác ABE và DEC ta thấy

\(\frac{AB}{AE}=\frac{ED}{DC}\Leftrightarrow\frac{6}{8}=\frac{9}{12}=\frac{3}{4}\)

Vậy \(\Delta ABE~\Delta DEC\)

b) \(\frac{S_{ABE}}{S_{DEC}}=\frac{AB\cdot AE\cdot\frac{1}{2}}{DE\cdot DC\cdot\frac{1}{2}}=\frac{6\cdot8}{9\cdot12}=\frac{4}{9}\)

c) Kẻ BK vuông góc DC.Suy ra tứ giác ABKD là hình chữ nhật vì có 4 góc vuông 

Nên BK = AD và AB = DK 

\(\Rightarrow KC=DC-DK=12-6=6\)

Theo định lý Pytago ta có

\(BC=\sqrt{BK^2+KC^2}=\sqrt{17^2+6^2}=5\sqrt{13}\)

https://olm.vn/hoi-dap/detail/197454392847.html

thanhs nhìu bn nha

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ABCHKIEF

a) 

Xét \(\Delta\)ABC và \(\Delta\)HBA có: 

^BAC = ^BHA ( = 90 độ ) 

^ABC = ^HBA ( ^B chung ) 

=> \(\Delta\)ABC ~ \(\Delta\)HBA 

b) AB = 3cm ; AC = 4cm 

Theo định lí pitago ta tính được BC = 5 cm 

Từ (a) => \(\frac{AB}{BH}=\frac{BC}{AB}\Rightarrow BH=\frac{AB^2}{BC}=1,8\)m 

c) Xét \(\Delta\)AHC và \(\Delta\)AKH có: ^AKH = ^AHC = 90 độ 

và ^HAC = ^HAK ( ^A chung ) 

=> \(\Delta\)AHC ~ \(\Delta\)AKH 

=> \(\frac{AH}{AK}=\frac{AC}{AH}\Rightarrow AH^2=AC.AK\)

d) Bạn kiểm tra lại đề nhé!

a)  Xét  \(\Delta ABC\)và   \(\Delta MDC\)có:

      \(\widehat{C}\) chung

     \(\widehat{CAB}=\widehat{CMD}=90^0\)

suy ra:   \(\Delta ABC~\Delta MDC\)(g.g)

b)  Xét  \(\Delta BMI\)và    \(\Delta BAC\)có:

         \(\widehat{B}\)chung

        \(\widehat{BMI}=\widehat{BAC}=90^0\) 
suy ra:   \(\Delta BMI~\Delta BAC\) (g.g)

\(\Rightarrow\)\(\frac{BI}{BC}=\frac{BM}{BA}\) 

\(\Rightarrow\)\(BI.BA=BC.BM\)

c)    \(\frac{BI}{BC}=\frac{BM}{BA}\) (câu b)   \(\Rightarrow\)\(\frac{BI}{BM}=\frac{BC}{BA}\)

Xét  \(\Delta BIC\)và    \(\Delta BMA\)có:

     \(\widehat{B}\)chung

    \(\frac{BI}{BM}=\frac{BC}{BA}\) (cmt)

suy ra:   \(\Delta BIC~\Delta BMA\) (g.g)

\(\Rightarrow\) \(\widehat{ICB}=\widehat{BAM}\)    (1)

c/m:  \(\Delta CAI~\Delta BKI\) (g.g)   \(\Rightarrow\)\(\frac{IA}{IK}=\frac{IC}{IB}\) \(\Rightarrow\)\(\frac{IA}{IC}=\frac{IK}{IB}\)

Xét  \(\Delta IAK\)và     \(\Delta ICB\)có:

      \(\widehat{AIK}=\widehat{CIB}\) (dd)

      \(\frac{IA}{IC}=\frac{IK}{IB}\) (cmt)

suy ra:   \(\Delta IAK~\Delta ICB\)(g.g)

\(\Rightarrow\)\(\widehat{IAK}=\widehat{ICB}\) (2) 

Từ (1) và (2) suy ra:  \(\widehat{IAK}=\widehat{BAM}\)

hay  AB là phân giác của \(\widehat{MAK}\)

d)  \(AM\)là phân giác \(\widehat{CAB}\) \(\Rightarrow\)\(\widehat{MAB}=45^0\)

mà   \(\widehat{MAB}=\widehat{ICB}\) (câu c)  

\(\Rightarrow\)\(\widehat{ICB}=45^0\)

\(\Delta CKB\)vuông tại K có  \(\widehat{KCB}=45^0\)

\(\Rightarrow\)\(\widehat{CBK}=45^0\)

\(\Delta MBD\) vuông tại M  có   \(\widehat{MBD}=45^0\)

\(\Rightarrow\)\(\widehat{MDB}=45^0\)

hay   \(\Delta MBD\)vuông cân tại M

\(\Rightarrow\)\(MB=MD\)

\(\Delta ABC\) có  AM là phân giác 

\(\Rightarrow\)\(\frac{MB}{AB}=\frac{MC}{AC}\)

ÁP dụng định ly Pytago vào tam giác vuông ABC ta có:

     \(AB^2+AC^2=BC^2\)

\(\Rightarrow\)\(BC=10\)

ÁP dụng tính chất dãy tỉ số = nhau ta có:

    \(\frac{MB}{AB}=\frac{MC}{AC}=\frac{MB+MC}{AB+AC}=\frac{5}{7}\)

suy ra:   \(\frac{MB}{AB}=\frac{5}{7}\)  \(\Rightarrow\)\(MB=\frac{40}{7}\)

mà   \(MB=MD\) (cmt)

\(\Rightarrow\)\(MD=\frac{40}{7}\)

Vậy  \(S_{CBD}=\frac{1}{2}.CB.DM=\frac{1}{2}.10.\frac{40}{7}=\frac{200}{7}\)

\(S_{ABC}=\frac{1}{2}.AB.AC=\frac{1}{2}.8.6=24\)

\(\Delta ABC\) có  AM  là phân giác

\(\Rightarrow\)\(\frac{S_{CMA}}{S_{BMA}}=\frac{AC}{AB}=\frac{3}{4}\)

\(\Rightarrow\)\(\frac{S_{CMA}}{3}=\frac{S_{BMA}}{4}=\frac{S_{CMA}+S_{BMA}}{3+4}=\frac{24}{7}\)

\(\Rightarrow\)\(S_{CMA}=\frac{72}{7}\)

Vậy   \(S_{AMBD}=S_{CBD}-S_{CMA}=\frac{200}{7}-\frac{72}{7}=\frac{128}{7}\)

C A M B K D I

a)  xét \(\Delta ABC\)  và \(\Delta MDC\)  có 

\(\widehat{ACB}=\widehat{MCD}\)  ( góc chung)

\(\widehat{CAB}=\widehat{CMD}=90^0\)  ( giả thiết )

\(\Rightarrow\Delta ABC\infty\Delta MDC\)  \(\left(g.g\right)\)

b) xét  \(\Delta BIM\) và \(\Delta BCA\)  có 

\(\widehat{IBM}=\widehat{CBA}\)  ( góc chung )

\(\widehat{BMI}=\widehat{BAC}=90^0\)

\(\Rightarrow\Delta BIM\infty\Delta BCA\left(g.g\right)\)

\(\Rightarrow\frac{BI}{BM}=\frac{BC}{BA}\)

\(\Rightarrow BI.BA=BM.BC\)

P/S tạm thời 2 câu này trước đi đã