An elementary school is taking a busload of children to a science fair. It costs $150.00 to drive the bus to the fair and back, and the school pays each student's $3.00 admission fee. (a) Use a formula to express the total cost C, in dollars, of the science fair trip as a linear function of the number n of children who make the trip. C = (b) Identify the slope and initial value of C. slope initial value Explain in practical terms what these values mean. The slope indicates that for each additional child we take on the trip the total cost increases by . The initial value is , and it is the cost of taking the bus itself to the fair. (c) Explain in practical terms what C(7) means. C(7) represents the ---Select--- initial value total cost (in dollars) of the science fair trip if 7 children make the trip. Calculate C(7). $ (d) Solve the equation C(n) = 168 for n. n = Explain what the answer you get represents. The solution of the equation 3n + 150 = 168 is the number of students we can take if there is $ to spend.
An elementary school is taking a busload of children to a science fair. It costs $150.00 to drive the bus to the fair and back, and the school pays each student's $3.00 admission fee. (a) Use a formula to express the total cost C, in dollars, of the science fair trip as a linear function of the number n of children who make the trip. C = (b) Identify the slope and initial value of C. slope initial value Explain in practical terms what these values mean. The slope indicates that for each additional child we take on the trip the total cost increases by . The initial value is , and it is the cost of taking the bus itself to the fair. (c) Explain in practical terms what C(7) means. C(7) represents the ---Select--- initial value total cost (in dollars) of the science fair trip if 7 children make the trip. Calculate C(7). $ (d) Solve the equation C(n) = 168 for n. n = Explain what the answer you get represents. The solution of the equation 3n + 150 = 168 is the number of students we can take if there is $ to spend.
Chapter4: Linear Functions
Section4.1: Linear Functions
Problem 121SE: Suppose that average annual income (in dollars) forthe years 1990 through 1999 is given by the...
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Question
An elementary school is taking a busload of children to a science fair. It costs $150.00 to drive the bus to the fair and back, and the school pays each student's $3.00 admission fee.
(a) Use a formula to express the total cost C, in dollars, of the science fair trip as a linear function of the number n of children who make the trip.
C =
(b) Identify the slope and initial value of C.
Explain in practical terms what these values mean.
(c) Explain in practical terms what C(7) means.
Calculate C(7).
$
(d) Solve the equation C(n) = 168 for n.
n =
Explain what the answer you get represents.
C =
(b) Identify the slope and initial value of C.
slope | ||
initial value |
Explain in practical terms what these values mean.
The slope indicates that for each additional child we take on the trip the total cost increases by . The initial value is , and it is the cost of taking the bus itself to the fair.
(c) Explain in practical terms what C(7) means.
C(7) represents the ---Select--- initial value total cost (in dollars) of the science fair trip if 7 children make the trip.
Calculate C(7).
$
(d) Solve the equation C(n) = 168 for n.
n =
Explain what the answer you get represents.
The solution of the equation 3n + 150 = 168 is the number of students we can take if there is $ to spend.
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