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Manuel can drive 5 times as fast as Carlos can ride his bicycle. If it takes Carlos 3 hours longer than Manuel to travel 60 miles, how fast can Carlos ride his bioAnswerKeyboarmph

Manuel can drive 5 times as fast as Carlos can ride his bicycle. If it takes Carlos-example-1
User Sasidharan
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1 Answer

24 votes
24 votes

Given:

a.) Manuel can drive 5 times as fast as Carlos can ride his bicycle.

b.) It takes Carlos 3 hours longer than Manuel to travel 60 miles.

Solution:

Let,

x = Carlos' speed

y = Manuel's speed

Manuel can drive 5 times as fast as Carlos can ride his bicycle.


\text{ y = 5x}
\text{ x = }\frac{\text{Distance}}{\text{ Time}}=\frac{\text{ 60}}{\text{ T + 3}}\text{ ; T = Time of Manuel to reach miles}
\text{ y = }\frac{\text{60}}{\text{ T}}\text{ }\rightarrow\text{ 5x =}\frac{\text{ 60}}{\text{ T}}\text{ }\rightarrow\text{ x =}\frac{\text{60}}{\text{ 5T}}

Let's incorporate the formula for Manuel and Carlos' speed to find T.


\frac{\text{ 60}}{\text{ T + 3}}=\frac{\text{ 60}}{\text{ 5T}}
\begin{gathered} \text{ \lparen60\rparen\lparen5T\rparen = \lparen60\rparen\lparen T + 3\rparen} \\ \text{ 300T = 60T + 180} \\ \text{ 300T - 60T = 180} \\ \text{ 240T = 180} \\ \text{ 240T/240 = 180/240 } \\ \text{ T = 180/240 = 3/4 or 0.75 hours} \end{gathered}
\text{ 0.75 hours x 60 mins/hour = 45 mins.}

Therefore,

Manuel can travel 60 miles in 45 mins. while Carlos can travel 60 miles in 3 hours and 45 minutes.

Let's determine the speed of Carlos,


\text{ x = Speed = Distance/Time}
\text{ = 60 miles/3.75 hours}
\text{ Speed = 16 miles per hour \lparen mph\rparen}

Therefore, Carlos' speed is 16 mph.

User Blerontin
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