Number of points of intersection of n straight lines if n satisfies `.^(n+5)P_(n+1)=(11(n-1))/(2)xx.^(n+3)P_(n)` is

Number of points of intersection of n straight lines if n satisfies n+5P_(n+1)=(11(n-1))/2xx^(n+3)P_n is a. 15 b. 28 c. 21 d. 10

Prove that .^(n)P_(r)=.^(n-1)P_(r)+r.^(n-1)P_(r-1) .

If .^(n+1)P_(3)=10.^(n-1)P_(2) , find n.

If n is a positive integer then .^(n)P_(n) =

Straight lines are drawn by joining m points on a straight line of n points on another line. Then excluding the given points, the number of point of intersections of the lines drawn is (no tow lines drawn are parallel and no these lines are concurrent). a. 4m n(m-1)(n-1) b. 1/2m n(m-1)(n-1) c. 1/2m^2n^2 d. 1/4m^2n^2

If .^(2n+1)P_(n-1): .^(2n-1)P_(n)=3:5 , find n.

Show that , .^(n)P_(r)=n.^(n-1)P_(r-1)=(n-r+1).^(n)P_(r-1) .

If .^(n)P_(5)=20.^(n)P_(3) , find n.

There are n is straight lines in a plane in which no two are parallel and no three pass through the same point their points of intersection are joined show that the number of fresh lines thus introduced is (1/8)n(n-1)(n-2)(n-3)

Find n and r if .^(n)P_(r)=.^(n)P_(r+1)and^(n)C_(r)=^(n)C_(r-1) .