(1)△DCE∽△AED一定,△DCE∽BEC不一定
(2)作DF⊥BC于F,∠CDF=90°-FDE=∠DEA→△FCD∽△AED
AD/DF=AC/FC→b/a=AE/b→AE=b2/a
CD=√(DF2+FC2)= √(a2+b2)
DE=√(AD2+AE2)= √[b2+ (b2/a)2]=√[(a2+b2)b2/a2]= b/a*√(a2+b2)
CD/AD=√(a2+b2)/b
DE/AE=[b/a*√(a2+b2)]/( b2/a)= √(a2+b2)/b
即CD/AD= DE/AE,∠CDE=∠A=90°,故△DCE∽△AED
(3)要△DCE∽BEC,心需∠CEB=∠CED,因△DCE∽△AED即∠CED=∠DEA
因此∠CEB=∠CED=∠DEA=180°/3=60°→∠ADE=30°
sin∠ADE=AE/DE=1/2→(b2/a)/[b/a*√(a2+b2)]=1/2→b/√(a2+b2)=1/2→a=(√3)