Chapter A.8, Problem 52AYU

To determine

To find: The speed of each cyclist.

Answer to Problem 52AYU

Speed of eastbound cyclist is $18$ mph and speed of westbound cyclist is $23$ mph.

Explanation of Solution

Given information:

Two cyclists leave a city at the same time, one going east and the other going west.

The speed of westbound cyclist is $5$ mph faster than eastbound cyclist. After $6$ hours they are $246$ miles apart.

Calculation:

As per the given information −

Two cyclists leave a city at the same time, one going east and the other going west.

The speed of westbound cyclist is $5$ mph faster than eastbound cyclist. After $6$ hours they are $246$ miles apart.

Let us suppose speed of eastbound cyclist is $x$ mph. Then speed of westbound cyclist would be $\left(x+5\right)$ mph.

After $6$ hours they are $246$ miles apart.

Since both are riding in opposite direction and going away from each other.

  $\begin{array}{l}\text{So, }6x+6(x+5)=246\\ \Rightarrow 12x=246-30\\ \Rightarrow x=\frac{216}{12}\\ \Rightarrow x=18\\ \text{And }x+5=23\end{array}$

Hence, speed of eastbound cyclist is $18$ mph and speed of westbound cyclist is $23$ mph.