a)
AC=10√2 (pitagora in ABC)
aria VAC=AC x VO/2=10√2 x √119/2=5√238 cm2
b)
ducem AE⊥VC, d(A;VC)=AE
VC x AE/2= aria VAC
AE=10√2 cm
c)
VN apotema piramidei VN⊥AB, cu pitagora in VON
VN=√(VO^2+NO^2)=√(119+25)=12 cm
d)
perimetrultr. BMD este minim daca distantele de la B si D la VC sunt minime situatie in care BM⊥VC si DM⊥VC
VC=√(CO^2+VO^2)=√(2 x 25+119)=13 cm
din aria tr. VBC in doua moduri rezulta relatia:
BC x VF=VC x BM, unde VF=VN, apoteme piramida
BM=BC x VF/VC=10 x 12/13
BM=DM=120/13 cm
BM⊥VC, cu pitagora in tr. dreptunghic BMC calculam cateta CM
CM=√(BC^2-BM^2)=√(100 - (120/13)^2)
CM=50√13/13 cm
perimetrul minim MBD=BD+2 x BM=10√2 + 240/13=10(24+13√2)/13 cm
