Length of the altitude on the hypotenuse of a right angled triangle with area A cm2 and one of the sides equal to b cm, is
2bA√b4+4A2
Let PQR be a right angled triangle at Q such that QR = b and A = Area of ΔPQR.
Now, draw QN⊥PR
A=Area ofΔPQR=12(QR×PQ)=12(b×PQ)⇒PQ=2Ab...(i)
Now, in ΔPNQ and ΔPQR,
∠PNQ=∠PQR [each 90∘]
and ∠QPN=∠QPR [common]
∴ΔPNQ∼ΔPQR [by AA similarity]
⇒PQPR=NQQR...(ii)
Now, in ΔPQR, by Pythagoras theorem,
PQ2+QR2=PR2⇒4A2b2+b2=PR2⇒PR=√4A2+b4b2=√4A2+b2b∴2Ab×PR=NQb
[from Eqs. (i) and (ii)]
⇒NQ=2APR⇒NQ=2Ab√4A2+b4