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Mr. Johnston is contemplating which chauffeured car service to take to the airport. The first costs $30\$30 up front and $2\$2 per mile. The second costs $20\$20 plus $3\$3 per mile. For a certain driving distance, the two companies charge the same total fare. What is the total fare?\newlineWrite a system of equations, graph them, and type the solution.\newline____\_\_\_\_ dollars

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Mean, variance, and standard deviation of binomial distributionsright chevron icon

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Q. Mr. Johnston is contemplating which chauffeured car service to take to the airport. The first costs $30\$30 up front and $2\$2 per mile. The second costs $20\$20 plus $3\$3 per mile. For a certain driving distance, the two companies charge the same total fare. What is the total fare?\newlineWrite a system of equations, graph them, and type the solution.\newline____\_\_\_\_ dollars
  1. Define Cost Equations: Step 11: Define the cost equations for both car services.\newlineFor the first service: Cost = 30+2x30 + 2x, where xx is the distance in miles.\newlineFor the second service: Cost = 20+3x20 + 3x.
  2. Set Equations Equal: Step 22: Set the equations equal to find the distance where both services cost the same.\newline30+2x=20+3x30 + 2x = 20 + 3x
  3. Solve for x: Step 33: Solve for x.\newlineSubtract 2x2x from both sides: 30=20+x30 = 20 + x\newlineSubtract 2020 from both sides: 10=x10 = x
  4. Substitute xx into Equation: Step 44: Substitute x=10x = 10 back into either original equation to find the total fare.\newlineUsing the first service's equation: Cost = 30+2(10)=30+20=5030 + 2(10) = 30 + 20 = 50

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