In `Delta PQR, M` is the mid-point of QR and C is the mid-point of PM. If QC when extended meets PR at N, then `|(bar(QN))/(bar(CN))|=`

DeltaPQR Is an isosceles triangle and ‘S’ is the mid-point of bar(QR) then DeltaPQS~=

If D, E and F are respectively the mid-points of AB, AC and BC in DeltaABC then bar(BE)+bar(AF)=

In Delta ABC , D is the mid point of BC and AD is perpendicular to AC , then show that cos A cos C = ( 2 ( c^(2) - a^(2))/( 3ac)

If C is the mid point of AB and if P is any point out side AB then show that bar(PA)+bar(PB)=2bar(PC) .

In DeltaOAB , L is the midpoint of OA and M is a point on OB such that (OM)/(MB)=2 . P is the mid point of LM and the line AP is produced to meet OB at Q. If bar(OA)=bar(a), bar(OB)=bar(b) then find vectors bar(OP) and bar(AP) interms of bar(a) and bar(b) .

In DeltaABC, bar(AD),bar(BE) are medians bar(BE)|\|bar(DF) . To prove CF=1/4AC it was written as In DeltaABC 'D' is the mid-point of bar(BC) and BE|\|DF . As per triangle mid-point theorem F is the mid-point of bar(CE) :. CF=1/2 CE . Which of the following is the next step? Which of the following is the next step?