A line segment AB is divided internally ...

A line segment AB is divided internally and externally in the same ratio `(> 1)` at `P and Q` respectively and M is mid point of AB. Statement-1: `MP, MB, MQ` are in `G.P.` Statement-2 `AP, AB and AQ` are in `H.P.`

Similar Questions

Explore conceptually related problems

Line segment AB is divided internally and externally in the same ratio (> 1) at P and Q respectively and M is mid point of AB. Statement-1: MP MB, MQ are in GP Statement-2 AP, AB and AQ are in HP.

A line segment AB is divided internally and externally in the same ratio at P and Q respectively and M is the mid-point of AB. Statement I : MP, MB, MQ are in G.P. Statement II : AP, AB and AQ are in H.P.

AB=6.4cm . It is divided internally and externally at the points P and Q respectively in the ratio 5:3 . Prove that (2)/(AB)=(1)/(AP)+(1)/(AQ) .

The line segment AB is divided at P(1,1) internally in the ratio 5:2 and coordinates of point B are (-1,-1) find the coordinates of point A.

A line segment AB is divided at point P such that PB : AB = 3:7, then the ratio of AP : PB = ________.

A segment AB is divided at a point P such that 7PB = 3AB. Then, the ratio AP: PB =…….

A line segment AB is internally divided by the point P(1,1) in the ratio 3:1.If the coordinates of A are (-5,4),then find the coordinates of B.

In figure, in what ratio, P divides AB internally.

A line segment AB is divided internally and externally in the same ratio `(> 1)` at `P and Q` respectively and M is mid point of AB. Statement-1: `MP, MB, MQ` are in `G.P.` Statement-2 `AP, AB and AQ` are in `H.P.`

Similar Questions

Recommended Questions