Total length of yard, \(D = 400(3) = 1200 feet\)

Let \(x\) be the distance travelled by Car A from starting point to the point of collision with Car B
Hence, distance travelled by Car B will be \(1200 - x\)

Speed of Car A, \(S_A = 40 ft/s\)
Speed of Car B, \(S_B = 56 ft/s\)

Since time taken by both cars will be same,

\(t_A = t_B\)

\(\frac{x}{S_A} = \frac{1200 - x}{S_B}\)

\(\frac{x}{40} = \frac{1200 - x}{56}\)

\(56x = 1200*40 - 40x\)

\(96x = 1200*40\)

\(x = \frac{1200*40}{96}\)

Hence time taken will be = \(\frac{x}{40} = \frac{1200*40}{96*40} = \frac{1200}{96} = \frac{48(25)}{48(2)} = \frac{25}{2}\)

Hence, Answer is D

A general formula can be applied to such similar type of question,

Time \(t = \frac{D}{S_A + S_B}\)