Given,

Velocity of car A, v_A = 36 km/h = 10 m/s

Velocity of car B, v_B = 54 km/h = 15 m/s

Velocity of car C, v_C = 54 km/h = 15 m/s

Relative velocity of car B with respect to car A,

v_BA = v_B – v_A = 15-10 = 5 m/s

Relative velocity of car C with respect to car A,

v_CB = v_C – (-v_A)= 15+10 = 25 m/s

At a certain time, both cars B and C are at the same distance,

s = 1 km = 1000m

Time taken (t) by car C to just reach car A is,

t = = 40 s

∴ The minimum acceleration (a) required for car B to just beat car C in reaching car A is given by,

From 2^nd equation of motion,

s = ut + 0.5at²

where,

u = Initial velocity = 5 m/s

a = Acceleration/Deceleration

s = Distance covered = 1000 m

t = Time = 40 s

⇒ 1000 = (5×40) + (0.5×a×40²)

∴ a = ms^-2 = 1 ms^-2

Hence, car B require minimum acceleration, a = 1 ms^-2 to beat car C.