Let A,P , Q , and B be points on `bar(AB)`, as shown above . If AP:PQ=1:4, PQ:QB=8:3 , and AP, PQ and QB are all integer lengths , which could be the length of AB ?

Point A, B, and C all lie on a line. Point D is midpoint of bar(AB) and E is the midpoint of BC, bar(AB)=4 and bar(BC)=10 . Which of the following could be the length of bar(AE) ?

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

let P be the point (1, 0) and Q be a point on the locus y^2= 8x . The locus of the midpoint of PQ is

The points P,Q,R and S lie in that order on a straight line . The midpoint of bar(QS) is R and the midpoint of bar (PS) is Q . The length of bar(QR) is x feet and the length of bar (PQ) is 4x-16 feet . What is the length , in feet , of bar(PS) ?

Let P and Q be points of the ellipse 16 x^(2) +25y^(2) = 400 so that PQ = 96//25 and P and Q lie above major axis. Circle drawn with PQ as diameter touch major axis at positive focus, then the value of slope m of PQ is

In a triangle AOB, R and Q are the points on the side OB and AB respectively such that 3OR = 2RB and 2AQ = 3QB. Let OQ and AR intersect at the point P (where O is origin). Q. If the point P divides OQ in the ratio of mu:1 , then mu is :

Two line segment AB and AC include an angle of 60^(@) , where AB=5 cm and AC= 7 cm. Locate points P and Q on AB and AC, respectively such that AP=(3)/(4)AB and AQ=(1)/(4)AC . Join P and Q and measure the length PQ.

P and Q are points on the sides AB and AC respectively of a triangleABC . If AP= 2cm, PB = 4cm AQ= 3cm and QC= 6cm. Show that BC= 3PQ.

If AB and CD are perpendicular diameters of circle Q. and /_QPC = 60^(@) , then the length of PQ divided by, the length of AQ is:-