Two lines intersect at O. points `A_(1),A_(2), . . .A_(n)` are taken on one of them and `B_(1),B_(2), . . .,B_(n)` on the other, the number of triangle that can be drawn with the help of these (2n+1) points are:

Two straight lines intersect at a point o.Points A_(1),A_(2)...,A_(n) are taken on one line and points B,B_(2),...,B_(n), on the other.If the point O is not to be used,then the number of triant O is that can be drawn using these points as vertices,is

If n arithmetic means A_(1),A_(2),---,A_(n) are inserted between a and b then A_(2)=

Let L_(1) and L_(2) be two lines intersecting at P If A_(1),B_(1),C_(1) are points on L_(1),A_(2),B_(2),C_(2),D_(2),E_(2) are points on L_(2) and if none of these coincides with P, then the number of triangles formed by these 8 points is

n equidistant points A_(1), A_(2), A_(3) ………A_(n) are taken on base BC of DeltaABC is A_(1)B=A_(1)A_(2)=A_(n)C and area of DeltaA""A_(4)A_(5) is k cm^(2) , then what is the area of DeltaABC .

if a,A_(1),A_(2),A_(3)......,A_(2n),b are in A.P.then sum_(i=1)^(2n)A_(i)=(a+b)

Suppose A_(1) ,A_(2) ,. . . .,A_(30) are thirty sets each with fvie elements and B_(1),B_(2), .. . .,B_(n) are n sets elements such that bigcup_(i=1)^(30)A_(i)= bigcup _(i=1)^(n)B_(i) and exactly 9 of the B_(j) 's then the value of n , is

" If A_(1),A_(2),A_(3),...,A_(6) are 'n' numbers inserted between "a,b" to form AP.Then A_(1)+A_(2)+...+A_(n) =

. If a_(1),a_(2),a_(3),...,a_(2n+1) are in AP then (a_(2n+1)+a_(1))+(a_(2n)+a_(2))+...+(a_(n+2)+a_(n)) is equal to