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Question
- a family bought a new car for a purchase price of $32,000. the car will lose 15% of its value the day it is purchased and the car will depreciate at a constant rate following that. the value of the car as a function of time can be modeled by ( y = c - 0.09cx ), where ( y ) is the value of the car ( x ) years after the car was purchased and ( c ) is the value of the car after the initial 15% depreciation.
a. what is the value of the car 2 years after its purchase date? show your work.
b. on an ( xy )-grid, graph the value, ( y ), of the car, as a function of ( x ), where ( x ) represents the number of years after the purchase date, for ( 0 leq x leq 7 ) years. label the axes and show the scales used for the graph.
c. use your graph to estimate the number of years, ( x ), after the purchase date that the value of the car is $15,000. label this point on your graph and indicate the approximate coordinates of the point.
d. algebraically find the number of years, ( x ), after the purchase date that the value of the car is exactly $15,000. round your solution to the nearest tenth of a year. show your work.
2.
the diagram above shows the plan berenice has for a triangular splash pad in a local city park. there will be three circles, each with a diameter of 6 feet, and the circles will be enclosed by an equilateral triangle with a side length of 30 feet. berenice plans to have splash areas/fountains within the circles and walkways in the shaded areas of the triangle.
a. according to the diagram, what is the maximum area, in square feet, available for berenice to have for splash/fountain areas in the triangle? show your work.
b. according to the diagram, what percentage of the triangle will be set aside for walkways? show your work.
c. if a ball were to fall on a random point within the triangular splash pad, what is the probability that the ball would fall where berenice plans to have splash areas? show your work or explain your reasoning.
Problem 1 - Part A
Step1: Find the initial value \( c \)
The car's purchase price is $32,000, and it loses 15% initially. So, \( c = 32000\times(1 - 0.15) \)
\( c = 32000\times0.85 = 27200 \)
Step2: Use the function \( y = c - 0.09cx \) for \( x = 2 \)
Substitute \( c = 27200 \) and \( x = 2 \) into the function:
\( y = 27200 - 0.09\times27200\times2 \)
First, calculate \( 0.09\times27200 = 2448 \)
Then, \( 2448\times2 = 4896 \)
Finally, \( y = 27200 - 4896 = 22304 \)
Step1: Set up the equation
We know \( y = 15000 \), \( c = 27200 \), and the function \( y = c - 0.09cx \). So:
\( 15000 = 27200 - 0.09\times27200\times x \)
Step2: Simplify the equation
First, calculate \( 0.09\times27200 = 2448 \), so the equation becomes:
\( 15000 = 27200 - 2448x \)
Step3: Solve for \( x \)
Subtract 27200 from both sides:
\( 15000 - 27200 = -2448x \)
\( -12200 = -2448x \)
Divide both sides by -2448:
\( x = \frac{12200}{2448} \approx 4.98 \approx 5.0 \) (rounded to the nearest tenth)
Step1: Find the area of one circle
The diameter of each circle is 6 ft, so the radius \( r = \frac{6}{2} = 3 \) ft.
The area of a circle is \( A_{circle} = \pi r^2 \), so:
\( A_{circle} = \pi\times3^2 = 9\pi \) square feet.
Step2: Find the total area of three circles
There are three circles, so total splash area \( A_{total} = 3\times9\pi = 27\pi \approx 27\times3.1416 \approx 84.82 \) square feet.
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The value of the car 2 years after purchase is $22,304.