Mathematics
In the adjoining figure, the diagonals AC and BD of a quadrilateral ABCD intersect at O, at right angles. Prove that AB2 + CD2 = AD2 + BC2.
Answer
By pythagoras theorem,
In right angle triangle AOB,
AB2 = OB2 + OA2 …….(i)
In right angle triangle COD,
CD2 = OC2 + OD2 …….(ii)
In right angle triangle AOD,
AD2 = AO2 + OD2 …….(iii)
In right angle triangle BOC,
BC2 = OB2 + OC2 …….(iv)
Adding (i), (ii) we get,
AB2 + CD2 = OB2 + OA2 + OC2 + OD2
AB2 + CD2 = (OA2 + OD2) + (OC2 + OB2)
Substituting value from (iii) and (iv) in above equation we get,
AB2 + CD2 = AD2 + BC2.
Hence, proved that AB2 + CD2 = AD2 + BC2.
Related Questions
In a △ABC, ∠A = 90°, CA = AB and D is a point on AB produced. Prove that
DC2 - BD2 = 2AB × AD.
If AD, BE and CF are medians of △ABC, prove that
3(AB2 + BC2 + CA2) = 4(AD2 + BE2 + CF2).
In the adjoining figure, D and E are mid-points of the sides BC and CA respectively of a △ABC, right angled at C. Prove that :
(i) 4AD2 = 4AC2 + BC2
(ii) 4BE2 = 4BC2 + AC2
(iii) 4(AD2 + BE2) = 5AB2
In a quadrilateral ABCD, ∠B = 90° = ∠D. Prove that
2AC2 - BC2 = AB2 + AD2 + DC2.