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Richi · Answer 1 · 2023-12-25T00:08:19+0000

$\begin{gathered} \text{Let V}_1\text{ represent Velocity of the 1st train} \\ \text{Let V}_2\text{ represent Velocity of the 2nd train} \end{gathered}$

Thus,

$\begin{gathered} V_1=V_1 \\ V_2=V_1-13 \end{gathered}$

The speed of an object/a body is calculated as:

$\text{Speed, V=}\frac{dis\tan ce}{\text{time}}$

Thus, we have:

$\begin{gathered} V_1=(D_1)/(t);V_2=(D_2)/(t) \\ \text{The two trains are 1212km apart} \\ \text{Thus, we have: D}_1+D_2=1212\operatorname{km} \\ \text{Time, t =4 hours} \end{gathered}$
$\begin{gathered} V_1=(D_1)/(4) \\ \text{cross}-\text{multiply} \\ D_1=4V_1 \end{gathered}$
$\begin{gathered} V_2=(D_2)/(4) \\ D_2=4_{}V_2 \\ \text{ Recall that V}_2=V_1-13 \\ \text{Thus, we have:} \\ D_2=4(V_1-13) \end{gathered}$
$\begin{gathered} D_1+D_2=1212\operatorname{km} \\ 4V_1+4(V_1-13)=1212 \\ 4V_1+4V_1-52=1212 \\ 8V_1=1212+52 \\ 8V_1=1264 \\ V_1=(1264)/(8) \\ V_1=158\text{ km/hr} \end{gathered}$

To find the speed of the second train, we have:

$\begin{gathered} V_2=V_1-13 \\ V_2=158-13 \\ V_2=145_{} \end{gathered}$

Hence, the rate of the first train is 158 km/hr and the rate of the second train is 145 km/hr

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