Triangel ABC is right angles at A. The points P and Q are on hypotenuse BC such that BP = PQ = QC. If AP = 3 and AQ = 4, then length BC is equal to

Triangle ABC is right angle at A. The points P and Q are on hypotenuse BC such that BP = PQ = QC .if AP = 3 and AQ = 4 , then length BC is equal to

A Delta ABC is right angled at A . L is a point on BC such that AL bot BC . Prove that /_BAL = /_ACB .

A Delta ABC is right angled at A. L is a point on BC such that AL bot BC. Prove that /_BAL = /_ACB .

In the adjoining figure, DeltaABC is right angled at C and M is the mid-point of hypotenuse AB, If AC = 32 cm and BC = 60 cm, then find the length of CM.

ABCD is a square. P, Q and Rare the points on AB, BC and CD respectively, such that AP = BQ = CR. Prove that: PQ = QR

Construct a right angled DeltaABC , right angled at A if hypotenuse BC = 5 cm and side AB = 3 cm.

ABCD is a square. P, Q and Rare the points on AB, BC and CD respectively, such that AP = BQ = CR. Prove that: PB = QC

Given a triangle ABC in which A = (4, -4) B = (0,5) and C = (5, 10). A point P lies on BC such that BP : PC = 3 : 2. Find the length of line segment AP.

A triangle ABC right angled at A has points A and B as (2, 3) and (0, -1) respectively. If BC = 5 units, then the point C is

ABC is an equilateral triangle, P is a point in BC such that BP : PC =2 : 1. Prove that : 9 AP^(2) =7 AB^(2)