<Qua-2026-812>, hint
Let <ABC=<ADC=X AB=a, AD=b
Then <EAF=180-X-2(90-X)=X. AE/AF=a sinX/ b sinX=a/b
Hence Triangles AEF and ABC are similar, EF/AC=AE/AB=sinX=35/37
Let R be the circumradius of AEF. Since AH=2RcosX, EF/sin<EAF=2R , 35/sinX=2R
2R=35/(35/37)=37. AH=37 cosX( sinX=35/37). Finally AH=12.
