A car initially traveling at 30 m/s passes a road sign located 750 meters ahead in a time of 12 seconds. When the car reaches the road sign, the driver applies the brakes and brings the car to rest at a traffic light located 900 meters ahead of the road sign.

To determine the car's velocity at t=14 seconds, we need to consider its motion before and after reaching the road sign.

Before reaching the road sign, the car traveled a distance of 750 meters in 12 seconds. We can use the equation:

Distance = Velocity × Time

750 = Velocity × 12

Solving for velocity, we find:

Velocity = 750 / 12 = 62.5 m/s

So, before reaching the road sign, the car's velocity is 62.5 m/s.

After reaching the road sign, the car applies the brakes and comes to a stop at the traffic light located 900 meters ahead. This means the car travels an additional distance of 900 - 750 = 150 meters.

Since the car comes to a rest, its final velocity is 0 m/s. We can use the equation:

Final Velocity^2 = Initial Velocity^2 + 2 × Acceleration × Distance

Since the final velocity is 0 and we want to find the acceleration, the equation becomes:

0 = (62.5)^2 + 2 × Acceleration × 150

Solving for the acceleration, we find:

2 × Acceleration × 150 = - (62.5)^2

Acceleration = - (62.5)^2 / (2 × 150)

Acceleration ≈ -13.33 m/s^2

Now we can use the formula:

Velocity = Initial Velocity + Acceleration × Time

to find the car's velocity at t=14 seconds.

Velocity = 62.5 + (-13.33) × 14

Velocity ≈ 62.5 - 186.62

Velocity ≈ -124.12 m/s

Therefore, at t=14 seconds, the car's velocity is approximately -124.12 m/s.