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補充教材

補充教材. 1. 母 子相似性質 2. 內分比性質 3. 外分比性質. 母 子相似性質. 在 △ ABC 中 , 若 ∠ BAC=90 °, AD ⊥ BC , 則 ( 1 )△ ABC ~△ DBA ~△ DAC ( 2 ) AB 2 =BD ×BC ( 3 ) AC 2 =CD ×BC ( 4 ) AD 2 =BD ×CD. A. C. B. D. 母 子相似性質. ( 1 )在 △ ABC 中 , 若 ∠ BAC=90 °, AD ⊥ BC , 則 △ ABC ~△ DBA ~△ DAC

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補充教材

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  1. 補充教材 1.母子相似性質 2. 內分比性質 3. 外分比性質

  2. 母子相似性質 在△ABC中,若∠BAC=90°,AD⊥BC,則 (1)△ABC~△DBA~△DAC (2)AB2=BD ×BC (3)AC2=CD ×BC (4)AD2=BD ×CD A C B D

  3. 母子相似性質 (1)在△ABC中,若∠BAC=90°,AD⊥BC,則 △ABC~△DBA~△DAC 【證明】:在△ABC與△DBA與△DAC中, ∵∠BAC=∠BDA=∠CDA=90°, 且 ∠B=∠BAD=∠C, ∴△ABC~△DBA~△DAC(AA相似) A B C D

  4. 母子相似性質 (2)在△ABC中,若∠BAC=90°,AD⊥BC,則 AB2=BD ×BC 【證明】:在△ABC與△DBA中, ∵∠BAC=∠BDA=90°, ∠B=∠B ∴△ABC~△DBA(AA相似) ∴AB:BD=BC:AB ∴AB2=BD ×BC A B C D

  5. 母子相似性質 (3)在△ABC中,若∠BAC=90°,AD⊥BC,則 AC2=CD ×BC 【證明】:在△ABC與△DAC中, ∵∠BAC=∠CDA=90, ∠C=∠C ∴△ABC~△DAC(AA相似) ∴AC:CD=BC:AC ∴AC2=CD ×BC A B C D

  6. 母子相似性質 (4)在△ABC中,若∠BAC=90°,AD⊥BC,則 AD2=BD ×CD 【證明】:在△ABC與△CAD中, ∵∠B=∠CAD, ∠ADB=∠ADC=90° ∴△ABD~△CAD(AA相似) ∴AD:CD=BD:AD ∴AD2=BD ×CD A B C D

  7. 內分比性質 在△ABC中,若AD平分∠BAC,交BC於D點, 則AB:AC=BD:DC 【證明】:過C點作AD的平行線, 設交BA延長線於E點, 則∵CE∥AD ∴∠E=∠BAD ∠ACE=∠CAD ∴∠E=∠ACE AC=AE且AB:AE=BD:DC ∴AB:AC=BD:CD E A B D C

  8. 外分比性質 在ABC中,AD平分∠BAC的外角,且交BC延長線於D點,則 AB:AC=BD:CD 【證明】:過C點作AD的平行線,設交AB於E點 ∵CE∥AD ∴∠QAD=∠AEC,∠ACE=∠CAD ∴AE=AC AB:AE=BD:BC ∴AB:AC=BD:BC Q A E B C D 結語.

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