If (t, 2t), (-2, 6), and (3, 1) are collinear, t =

If t_(1), t_(2) and t_(3) are distinct, then the points: (t_(1), 2at_(1), at_(1)^(3)), (t_(2), 2at_(2)+at_(2)^(3)) and (t_(3), 2at_(3)+at_(3)^(3)) are colinear if :

Prove that the area of the triangle whose vertices are (t,t -2), (t + 2 , t + 2), and (t + 3, t ) is independent of t.

Find whether the points (-a,-b),[-(s+1)a,-(s+1)b] and [ (t-1)a,(t-1)b] are collinear?

Given P (at^(2), 2at) , Q ((a)/(t^(2)) , (-2a)/(t) ) , and S(a, 0 ) , show that (1)/(SP) + (1)/(SQ) is independent of t .

Show that the relation R defined in the set A of all triangles as R={(T _(1), T _(2))):T _(1) is similar to T _(2) } is equivalence relation. Consider three right angle triangles T_(1) with sides 3,4,5,T_(2) with sides 5,12,13 and T_(3) with sides 6,8,10. Which triangles among T_(1), T_(2) and T_(3) are related ?

Football teams T_1 and T_2 have to play two games against each other. It is assumed that the outcomes of the two games are independent. The probabilities of T_1 winning. Drawing and losing a game against T_2 are (1)/(2),(1)/(6) and (1)/(3) respectively. Each team gets 3 points for a win. 1 point for a draw and 10 pont for a loss in a game. Let X and Y denote the total points scored by teams T_1 and T_2 respectively. after two games.

The velocity of a particle is given by v = 3+6 (a_1 + a_2 t) where a, and an are constants and t is time. The acc. of particle is:

Let g(x) = int_0^(x) f(t) dt , where 1/2 le f(t) < 1, t in [0,1] and 0 < f(t) le 1/2 "for" t in[1,2] . Then :