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1. Write a linear equation of the form y1 = mx + b for your first set of data.2. Write a linear equation of the form y2 = mx + b for the other equation in your system. 3. How many round trips in a 12-hour day can each mode of transportation produce?

1. Write a linear equation of the form y1 = mx + b for your first set of data.2. Write-example-1
User Nikhil Aneja
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1 Answer

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Given the distance of 382 miles, and a velocity of 760 miles/hour and a time of 0.583 hour, we can writte the following equation:


382\text{ miles}=760(miles)/(hour)*0.583hour+b

Then the intercept b is:


\begin{gathered} b=382-760*0.583 \\ b=-61.08\text{ miles} \end{gathered}

Hence the equation for the first data set is:


distance=0.583*speed-61.08

Now the next dataset:


\begin{gathered} 382miles=(535miles)/(hour)*1.25hour+b \\ b=-286.5\text{ miles} \end{gathered}

Hence the equation for the second point is:


distance=1.25*speed-286.5

Next, for the third point. By hyperloop, a round trip takes 0.583*2=1.166 hour (go and back), hence in a 12-hour day:


(12)/(1.166)=10.29\text{ trips}

Hence by hyperloop we got 10 trips.

On the other way, by airplane it takes 1.25*2=2.5hour:


(12)/(2.5)=4.8\text{ trips}

Then by airplane we got 4 round trips.

User Jamesmoschou
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