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A car travelling at 90 km/h is 500 m behind another car travelling at 70 km/h in the same direction. How long will it take the first car to catch the second?

Rauhan Jan 26, 2017

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A car travelling at 90 km/h is 500 m behind another car travelling at 70 km/h in the same direction.

How long will it take the first car to catch the second?

\(\begin{array}{cll} \text{Let } v_1 &=& 90\ \frac{km}{h} \\ \text{Let } v_2 &=& 70\ \frac{km}{h} \\ \text{Let } d = 500\ m &=& 0.5\ km \\ \text{Let } t &=& time \\ \end{array}\)

if d is the distance:

\(\begin{array}{|rcll|} \hline d_{\text{car}_1} &=& v_1\cdot t - 0.5 \\ d_{\text{car}_2} &=& v_2\cdot t \\ \hline \end{array}\)

The first car catch the second if \(d_{\text{car}_1} = d_{\text{car}_2}\)

\(\begin{array}{|rcll|} \hline d_{\text{car}_1} &=& d_{\text{car}_2} \\ v_1\cdot t -0.5\ km &=& v_2\cdot t \quad & | \quad -v_2\cdot t +0.5 \\ v_1\cdot t - v_2\cdot t &=& 0.5\ km \\ t\cdot ( v_1 - v_2 ) &=& 0.5\ km \quad & | \quad :( v_1 - v_2 ) \\ t &=& \frac {0.5\ km} { v_1 - v_2 } \quad & | \quad v_1 = 90\ \frac{km}{h} \qquad v_2 = 70\ \frac{km}{h} \\ t &=& \frac {0.5\ km} { 90\ \frac{km}{h} - 70\ \frac{km}{h} } \\ t &=& \frac {0.5\ km} { 20\ \frac{km}{h} } \\ t &=& \frac {0.5} { 20 }\ h \\ t &=& 0.025\ h \quad & | \quad 1\ h = 60\min.\\ t &=& 0.025\cdot 60\min.\\ \mathbf{t} & \mathbf{=} & \mathbf{1.5\min.} \\ \hline \end{array}\)

heureka Jan 26, 2017

edited by heureka Jan 26, 2017
edited by heureka Jan 26, 2017

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heureka · Answer 1 · 2017-01-26T12:26:35

A car travelling at 90 km/h is 500 m behind another car travelling at 70 km/h in the same direction.

How long will it take the first car to catch the second?

\(\begin{array}{cll} \text{Let } v_1 &=& 90\ \frac{km}{h} \\ \text{Let } v_2 &=& 70\ \frac{km}{h} \\ \text{Let } d = 500\ m &=& 0.5\ km \\ \text{Let } t &=& time \\ \end{array}\)

if d is the distance:

\(\begin{array}{|rcll|} \hline d_{\text{car}_1} &=& v_1\cdot t - 0.5 \\ d_{\text{car}_2} &=& v_2\cdot t \\ \hline \end{array}\)

The first car catch the second if \(d_{\text{car}_1} = d_{\text{car}_2}\)

\(\begin{array}{|rcll|} \hline d_{\text{car}_1} &=& d_{\text{car}_2} \\ v_1\cdot t -0.5\ km &=& v_2\cdot t \quad & | \quad -v_2\cdot t +0.5 \\ v_1\cdot t - v_2\cdot t &=& 0.5\ km \\ t\cdot ( v_1 - v_2 ) &=& 0.5\ km \quad & | \quad :( v_1 - v_2 ) \\ t &=& \frac {0.5\ km} { v_1 - v_2 } \quad & | \quad v_1 = 90\ \frac{km}{h} \qquad v_2 = 70\ \frac{km}{h} \\ t &=& \frac {0.5\ km} { 90\ \frac{km}{h} - 70\ \frac{km}{h} } \\ t &=& \frac {0.5\ km} { 20\ \frac{km}{h} } \\ t &=& \frac {0.5} { 20 }\ h \\ t &=& 0.025\ h \quad & | \quad 1\ h = 60\min.\\ t &=& 0.025\cdot 60\min.\\ \mathbf{t} & \mathbf{=} & \mathbf{1.5\min.} \\ \hline \end{array}\)

ElectricPavlov · Answer 2 · 2017-01-26T12:36:49

Rate times time = distance the distance is 500m (.5 km)

and the rate is the net speed difference (90-70) = 20 kmh

20 x t = .5 km

t = .5/20 = .025 hr = 1.5 minutes

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