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Difference between revisions of "1955 AHSME Problems/Problem 50"

(Created page with "== Solution== Let <math>V_A, V_B, V_C</math> be <math>A, B, C</math>'s velocity, respectively. We want to pass <math>B</math> before we collide with <math>C</math>. Since <ma...")
 
(Solution)
 
(One intermediate revision by the same user not shown)
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In order to pass <math>B</math> going <math>40</math> mph on a two-lane highway, <math>A</math>, going <math>50</math> mph, must gain <math>30</math> feet.
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Meantime, <math>C, 210</math> feet from <math>A</math>, is headed toward him at <math>50</math> mph. If <math>B</math> and <math>C</math> maintain their speeds,
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then, in order to pass safely, <math>A</math> must increase his speed by:
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<math> \textbf{(A)}\ \text{30 mph}\qquad\textbf{(B)}\ \text{10 mph}\qquad\textbf{(C)}\ \text{5 mph}\qquad\textbf{(D)}\ \text{15 mph}\qquad\textbf{(E)}\ \text{3 mph} </math>
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== Solution==
 
== Solution==
  
Let <math>V_A, V_B, V_C</math> be <math>A, B, C</math>'s velocity, respectively. We want to pass <math>B</math> before we collide with <math>C</math>. Since <math>A</math> and <math>B</math> are going in the same direction and <math>V_A>V_B</math>, <math>A</math> will pass <math>B</math> in <math>\frac{30\mathrm{ft}}{V_A-V_B}</math> time. Since <math>A</math> and <math>C</math> are going in opposite directions, their velocity is given by <math>V_A+V_C</math>, so the amount of time before <math>A</math> will collide with <math>C</math> is given by <math>\frac{210\mathrm{ft}}{V_A+V_C}</math>. We want to pass <math>B</math> before we collide with <math>C</math>, so <math>V_A</math> must satisfy the inequality <math>\frac{30\mathrm{ft}}{V_A-V_B}<\frac{210\mathrm{ft}}{V_A+V_C}</math>. We can eliminate all the units, simplifying the inequality to <math>\frac{1}{V_A-V_B} < \frac{7}{V_A+V_C}</math>. Solving this and substituting our known values of <math>V_B</math> and <math>V_C</math> yields <math>330<6V_A</math>, so <math>A</math> must increase his speed by <math>\boxed{\textbf{(C) \ } 5 }</math> miles per hour.
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Let <math>V_A, V_B, V_C</math> be <math>A, B, C</math>'s velocity, respectively. We want to pass <math>B</math> before we collide with <math>C</math>. Since <math>A</math> and <math>B</math> are going in the same direction and <math>V_A>V_B</math>, <math>A</math> will pass <math>B</math> in <math>\frac{30\mathrm{ft}}{V_A-V_B}</math> time. Since <math>A</math> and <math>C</math> are going in opposite directions, their relative velocity is <math>V_A+V_C</math>, so the amount of time before <math>A</math> will collide with <math>C</math> is given by <math>\frac{210\mathrm{ft}}{V_A+V_C}</math>. We want to pass <math>B</math> before we collide with <math>C</math>, so <math>V_A</math> must satisfy the inequality <math>\frac{30\mathrm{ft}}{V_A-V_B}<\frac{210\mathrm{ft}}{V_A+V_C}</math>. We can eliminate all the units, simplifying the inequality to <math>\frac{1}{V_A-V_B} < \frac{7}{V_A+V_C}</math>. Solving this and substituting our known values of <math>V_B</math> and <math>V_C</math> yields <math>330<6V_A</math>, so <math>A</math> must increase his speed by <math>\boxed{\textbf{(C) \ } 5 }</math> miles per hour.
  
 
~anduran
 
~anduran

Latest revision as of 00:47, 1 January 2024

In order to pass $B$ going $40$ mph on a two-lane highway, $A$, going $50$ mph, must gain $30$ feet. Meantime, $C, 210$ feet from $A$, is headed toward him at $50$ mph. If $B$ and $C$ maintain their speeds, then, in order to pass safely, $A$ must increase his speed by:

$\textbf{(A)}\ \text{30 mph}\qquad\textbf{(B)}\ \text{10 mph}\qquad\textbf{(C)}\ \text{5 mph}\qquad\textbf{(D)}\ \text{15 mph}\qquad\textbf{(E)}\ \text{3 mph}$

Solution

Let $V_A, V_B, V_C$ be $A, B, C$'s velocity, respectively. We want to pass $B$ before we collide with $C$. Since $A$ and $B$ are going in the same direction and $V_A>V_B$, $A$ will pass $B$ in $\frac{30\mathrm{ft}}{V_A-V_B}$ time. Since $A$ and $C$ are going in opposite directions, their relative velocity is $V_A+V_C$, so the amount of time before $A$ will collide with $C$ is given by $\frac{210\mathrm{ft}}{V_A+V_C}$. We want to pass $B$ before we collide with $C$, so $V_A$ must satisfy the inequality $\frac{30\mathrm{ft}}{V_A-V_B}<\frac{210\mathrm{ft}}{V_A+V_C}$. We can eliminate all the units, simplifying the inequality to $\frac{1}{V_A-V_B} < \frac{7}{V_A+V_C}$. Solving this and substituting our known values of $V_B$ and $V_C$ yields $330<6V_A$, so $A$ must increase his speed by $\boxed{\textbf{(C) \ } 5 }$ miles per hour.

~anduran

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