In an equilateral triangle PQR, if p, q and r denote the lengths perpendiculars from P, Q, R respectively on the opposite sides, then –
p ≠ q ≠ r
p = q = r
p ≠ q = r
p = q ≠ r
In an equilateral triangle PQR, if p, q and r denote the lengths perpendiculars from P, Q, R respectively on the opposite sides, then
In an equilateral triangle PQR, if p, q and r denote the lengths of the perpendiculars from P, Q, R respectively on the opposite sides, then which of the following is/are correct?
In an equilateral triangle ABC; points P, Q and R are taken on the sides AB, BC and CA respectively such that AP= BQ = CR. Prove that triangle PQR is equilateral.