Respuesta :
Answer:
a) It is expected to sell 560 cars.
b) The total amount invested is $145,000.
c) [tex]y=0.004x+200[/tex]
m is the slope of the linear function, and represents the additional amount of cars it will sell due to an additional dollar invested in advertising. Its units of m is [cars/dollar].
b is the y-intercept and represent the amount of cars the company would sell if there is 0 dollars invested in advertising. It may or not be a representative point in the real world (it depends on how accurate is the linear function and the range where it is valid). The unit of b is [cars].
Step-by-step explanation:
a) If the company invest $90,000, that is 3 times $10,000 plus the originals $60,000. Then, it is expected to sell 560 cars.
[tex]440+3*40=440+120=560[/tex]
b) If the company sold 800 cars, we have 440 cars that corresponds to the original $60,000 and (800-440)=360 cars that correspond to the additional invest.
If an additional 40 cars are sold by an additional $10,000 invest, 340 cars are sold by 340*10,000/40= $85,000.
Then the total amount invested is 60,000+85,000=$145,000.
c) We can estimate the parameters m and b of the equation taking into account one known point ($60,000 corresponds to 440 sold cars) and the known variation (40 sold cars for every $10,000 invested).
[tex]m=\frac {\Delta y} {\Delta x }=\frac{40}{10,000}=0.004 \, \frac{cars}{dollar}[/tex]
Then we can use the known point to estimate b:
[tex]b=y-mx=440-(0.004)*60000=440-240=200 \, cars[/tex]
The equation is then
[tex]y=0.004x+200[/tex]
m is the slope of the linear function, and represents the additional amount of cars it will sell due to an additional dollar invested in advertising. Its units of m is [cars/dollar].
b is the y-intercept and represent the amount of cars the company would sell if there is 0 dollars invested in advertising. It may or not be a representative point in the real world (it depends on how accurate is the linear function and the range where it is valid). The unit of b is [cars].
