Particle A and Particle B begin moving away from a wall at the same time and are traveling in the same direction. The function $a(t)=7 t+14$ determines Particle A's distance from the wall (in $\mathrm{cm}$ ) given a number of $\mathrm{ms} t$ since the particle started moving. Similarly, $b(t)=6 t+10$ determines Particle B's distance from the wall (in $\mathrm{cm}$ ) given a number of ms $t$ since the particle started moving.
a. Evaluate $a(24)$.
\[
a(24)=
\]
Preview
b. Evaluate $b(24)$.
\[
b(24)=
\]
Preview
c. Which particle was closer to the wall $24 \mathrm{~ms}$ after it started moving? Select an answer $\mathrm{V}$
Answer
Therefore, Particle B was closer to the wall 24 ms after it started moving.
Step 1 :Substitute \(t=24\) into the function \(a(t)=7t+14\) to find the distance of Particle A from the wall after 24 ms.
Step 2 :\[a(24)=7(24)+14=182\]
Step 3 :Substitute \(t=24\) into the function \(b(t)=6t+10\) to find the distance of Particle B from the wall after 24 ms.
Step 4 :\[b(24)=6(24)+10=154\]
Step 5 :Compare the distances of Particle A and Particle B from the wall after 24 ms.
Step 6 :Particle A is \(\boxed{182}\) cm away from the wall after 24 ms.
Step 7 :Particle B is \(\boxed{154}\) cm away from the wall after 24 ms.
Step 8 :Therefore, Particle B was closer to the wall 24 ms after it started moving.
