Correct Answer: Option C

Explanation

To determine the deceleration of the motorcyclist, we can use the kinematic equation that relates initial velocity, final velocity, acceleration, and distance:

\(v^2 = u^2 + 2as\)

Where:  \( v \) = final velocity (0 m/s, since he stops at the traffic light), \( u \) = initial velocity (30 m/s), \( a \) = acceleration (deceleration, which will be negative)
   \( s \) = distance (50 m)

Substituting the values into the equation, we rearrange it to solve for \( a \):

\(0 = (30)^2 + 2a(50)\)

Calculating \( (30)^2 \):

\(0 = 900 + 100a\)

Now, rearranging for \( a \):

\(100a = -900\)

\(a = -\frac{900}{100} = -9 \, \text{m/s}^2\)

The deceleration of the motorcyclist is \( \mathbf{9 \, m/s^2} \).

There is an explanation video available below.

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