The lineas r = (6 - 6s) a + (4s - 4) b + (4 - 8s) c and r = (2t - 1) a + (4t - 2) b - (2t + 3) c intersect at

( r_ 1) /( (s-b) (s-c) ) + ( r_2)/( (s-c) (s-a) ) + ( r_3)/((s-a) ( s-b)) = (3)/(r)

A particle is at x =+ 5 m at t =0,x =- 7 m at t = 6 s and x = + 2 at t = 10s. Find the average velocity of the particle during the intervals (a)t=0 to t=6s (b)t=6s to 6=10s (c ) t=0 to t=10s .

If r_(1) = 2, r_(2) = 3, r_(3) = 6 and r =1 , prove that a = 3, b=4 and c = 5 .

If c^(2) = a^(2) + b^(2) then write the value of 4s ( s- a) (s-b) (s-c) in terms of a,b.

Velocity-time equation of a particle moving in a straight line is v=2t-4 for t le 2s and v= 4-2t for 1 gt 2s . The distance travelled ( in meters) by the particle in the time interval from t=0 to t=4s is 4k. The value of 'k' is ( Here t is in second and v in m/s) :