F如图∠ABC=∠ADE=90°AD=ABAC=AEBC与DE相较于D
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△ACD≌△AEB.证明:∵Rt△ABC≌Rt△ADE,∴AC=AE,AB=AD,∵∠BAC=∠DAE,∴∠CAD=∠BAE,∴△ACD≌△AEB(SAS)
证法一:连接CE,∵Rt△ABC≌Rt△ADE,∴AC=AE.∴∠ACE=∠AEC.又∵Rt△ABC≌Rt△ADE,∴∠ACB=∠AED.∴∠ACE=∠ACB=∠AEC-∠AED.即∠BCE=∠DEC
∠dae=∠dac+∠cae又∵∠bad=∠cae∴∠bac=∠dae,∠abc=∠ade∴三角形△abc和△ade两个角相等∴△abc∽△ade∴ab/ad=ac/ae(相似三角形相等角的两夹边成比
(1)△ABC∽△ADE,△ABD∽△ACE(2分)(2)①证△ABC∽△ADE,∵∠BAD=∠CAE,∠BAD+∠DAC=∠CAE+∠DAC,即∠BAC=∠DAE.(4分)又∵∠ABC=∠ADE,∴
△ABD∽△ACE你已经证明△ABC∽△ADE那么得AB/AC=AD/AE∠BAD=∠CAE△ABD∽△ACE(边角边)
连接CE,因为Rt△ABC≌Rt△ADE,所以AC=AE,DE=BC,∠ACB=∠AED;则∠ACE=∠AEC;所以∠ACE-∠ACB=∠AEC-∠AED;即:∠BCE=∠DEC综上:BC=DE;∠B
证法一:连接CE,∵Rt△ABC≌Rt△ADE,∴AC=AE.∴∠ACE=∠AEC.又∵Rt△ABC≌Rt△ADE,∴∠ACB=∠AED.∴∠ACE=∠ACB=∠AEC-∠AED.即∠BCE=∠DEC
很简单的∵ΔABC为直角三角型∴∠2+∠7=180°-(∠1+∠3)=90°又∵ΔADC为直角三角形∴∠3+∠7=180°-∠6=90°∴∠2+∠7=∠3+∠7∴∠2=∠3因此与∠2相等的角为∠3小菜
如图,△ADE和△ABC有公共的顶点A,∠1=∠2,∠ABC=∠ADE.则△ABD∽△又因为∠1=∠2所以△ABD∽△ACE(两边对应成比例且夹角相等的三角形相似
是否是求证:CF=EF?如果是的话证明:连接AF∵△ABC≌△ADE∴AB=AD,BC=DE∵∠ABC=∠ADE=90,AF=AF∴△ABF≌△ADF(HL)∴BF=DF∵CF=BC-BF,EF=DE
∵△ABC≌△ADE,∴∠ACB=∠AED,∠ABC=∠ADE,∠BAC=∠EAD∵∠ADE=25°,∴∠ABC=25°,∴∠CAB=50°∴∠DFB=∠DAB+∠ABC=50°+10°+25°=85
∵△ABC≌△ADE,∴∠ACB=∠AED,∠ABC=∠ADE,∠CAB=∠EAD.∵∠ADE=25°,∴∠ABC=∠ADE=25°.∵∠ACB=105°,∴∠CAB=180°-105°-25°=50
相似因为∠BAD=∠CAE,所以∠BAC=∠DAE又因为∠ABC=∠ADE所以△ABC∽△ADE所以AD/AE=AB/AC在△ABD和△ACE中AD/AE=AB/AC,∠BAD=∠CAE所以△ABD∽
∵△ABC≌△ADE,∴∠ACB=∠E=105°,∴∠ACF=180°-105°=75°,在△ACF和△DGF中,∠D+∠DGB=∠DAC+∠ACF,即25°+∠DGB=16°+75°,解得∠DGB=
∵∠ABC=∠ADE,BE、DF分别平分∠ABC和∠ADE∴∠ADF=1/2∠ADE=1/2∠ABC=∠ABE∴BE∥DF
(1)∵∠BAD=∠CAE,∠DAC=∠DAC.∴∠BAC=∠DAE,又∵∠ABC=∠ADE.∴△ABC∽△ADE,(AA)∴AB:AC=AD:AE°∵∠BAD=∠CAE∴△ABD∽ACE(SAS)(