△DAB、△DBC、△DAC是等腰直角△,DA=DB=DC=1,AB=BC=AC=√2,设内切球心O,半径为R,分别连结OA、OB、OC、OD,S△ABC=√3(√2)^2/4=√3/2,S△DAB=S△DBC=S△DAC=1*1/2=1/2,V棱锥O-ABC=R*S△ABC/3=R√3/6,V棱锥O-DAB=V棱锥O-DAC=V棱锥O-DBC=R*△BCD/3=R/6,V棱锥D-ABC=S△DBC*AD/3=1/6,V棱锥D-ABC=V棱锥O-DAB+V棱锥O-DAC+V棱锥O-DBC,1/6=R√3/6+3*R/6,∴内切球半径:R=(3-√3)/6。
