`AB` and `CD` are two vertical poles of heights `15` ft. and `20` ft. respectively placed at a horizontal distance of `21` ft. Find the distance of a point M form A such that the sum of the distance of M from B and D is minimum.

Let AP and BQ be two vertical poles at points A and B respectively.If AP=16m,BQ=22m and AB=20m then find the distance of a point R on AB from the point A such that RP^(2)+RQ^(2) is minimum.

Let AP and BQ be two vertical poles at points A and B, respectively. If A P = 16 m , B Q = 22 m a n d A B = 20 m , then find the distance of a point R on AB from the point A such that R P^2+R Q^2 is minimum.

Let AP and BQ be two vertical poles at points A and B respectively. If AP = 16 m, BQ = 22m and AB = 20 m, then find the distance of a point R on AB from the point A such that RP^(2)+RQ^(2) is minimum.

Let AP and BQ be two vertical poles at point A and B, respectively. If AP= 16 m, BQ = 22 m and AB=20 m, then find the distance of a point R on AB from the point A such that RP^2+RQ^2 is minimum.

Let AP and BQ be two vertical poles at points A and B, respectively. If AP = 16 m, BQ = 22 m and AB = 20 m, then find the distance of a point R on AB from the point A such that RP^(2) + RQ^(2) is minimum.

Let AP and BQ be two vertical poles at points A and B, respectively. If AP = 16 m, BQ = 22 m and AB = 20 m, then find the distance of a point R on AB from the point A such that RP^(2) + RQ^(2) is minimum.

Let AP and BQ be two vertical poles at points A and B, respectively. If AP = 16 m, BQ = 22 m and AB = 20 m, then find the distance of a point R on AB from the point A such that RP^(2) + RQ^(2) is minimum.

Let AP and BQ be two vertical poles at points A and B, respectively. If AP = 16 m, BQ = 22 m and AB = 20 m, then find the distance of a point R on AB from the point A such that RP^(2) + RQ^(2) is minimum.

Let AP and BQ be two vertical poles at points A and B, respectively. If A P" "=" "16" "m ," "B Q" "=" "22" "m" "a n d" "A B" "=" "20" "m , then find the distance of a point R on AB from the point A such that R P^2+R Q^2 is minimum.