Let first term be a and common ratio r>1.
From a2⋅a3⋅a4=64: (ar)(ar2)(ar3)=a3r6=64⇒ar2=4.
From a1+a3+a5=7813: a(1+r2+r4)=7813.
Substituting a=r24: 4(r21+1+r2)=7813.
Let u=r2: 28u2−785u+28=0 gives u=28 (since r>1).
a3+a5+a7=ar2(1+r2+r4)=4(1+28+784)=3252.