Question
The cost for a different taxi company is expressed with the equation y = 1.65x + 2.35, where x represents the miles driven and y represents the cost per trip. If Susan takes a taxi for the 14-mile trip from the bus terminal to her house, how much will the ride cost?
Answers
GPT-4o mini
To find out the cost of Susan's 14-mile taxi ride, we can substitute \( x = 14 \) into the equation \( y = 1.65x + 2.35 \).
1. Substitute \( x \) with 14:
\[
y = 1.65(14) + 2.35
\]
2. Calculate \( 1.65 \times 14 \):
\[
1.65 \times 14 = 23.1
\]
3. Now, add 2.35 to 23.1:
\[
y = 23.1 + 2.35 = 25.45
\]
Thus, the cost of the 14-mile trip is \( y = 25.45 \).
Therefore, Susan's taxi ride will cost **$25.45**.
1. Substitute \( x \) with 14:
\[
y = 1.65(14) + 2.35
\]
2. Calculate \( 1.65 \times 14 \):
\[
1.65 \times 14 = 23.1
\]
3. Now, add 2.35 to 23.1:
\[
y = 23.1 + 2.35 = 25.45
\]
Thus, the cost of the 14-mile trip is \( y = 25.45 \).
Therefore, Susan's taxi ride will cost **$25.45**.