Ask question

Ask question

All categories

3 years ago

15

A car dealership is trying to sell all of the cars that are on the lot. If there are 675 cars on the lot and they sell 45 cars p

er week, how many weeks will it take for the number of cars on the lot to be less than 65?

1 answer:

Lisa [10]3 years ago

8 0

Around 14 weeks

45*14=630
675-630=45

So around 14 weeks

You might be interested in

James joins club one which Charges a Montly membership of $19.99 how much will James spend in all .if he continúes his membershi

zubka84 [21]

19.99 (price per month) multiplied by 6 (amount of months) is $119.94, because he is spending $19.99 per month for a period of 6 months

6 0

3 years ago

A car travels 1295 feet in 5 seconds. How far can the car travel in 50 seconds?

Vladimir79 [104]

Answer:

12950

Step-by-step explanation:

3 0

3 years ago

This is for freckle which I hate can someone help?

oksian1 [2.3K]

Answer:

The answer is B. 26 miles per hour.

Step-by-step explanation:

13+13=26

X goes by an hour.

5 0

3 years ago

Read 2 more answers

3(x-2) <br> I don’t know how to do this

grandymaker [24]

Answer:

3x - 6 should be it

6 0

2 years ago

Read 2 more answers

A bakery finds that the price they can sell cakes is given by the function p = 580 − 10x where x is the number of cakes sold per

dexar [7]

Answer:

The total revenue is $TR=580x-10x^2$ .

The marginal revenue is $MR=580-20x$ .

The fixed cost is $900.

The marginal cost function is $MC=50x+300$ .

Step-by-step explanation:

The Total Revenue ( $TR$ ) received from the sale of $x$ goods at price $p$ is given by

$TR=p\cdot x$

The Marginal Revenue ( $MR$ ) is the derivative of total revenue with respect to demand and is given by

$MR=\frac{d(TR)}{dx}$

From the information given we know that the price they can sell cakes is given by the function $p=580-10x$ , where $x$ is the number of cakes sold per day.

So, the total revenue is

$TR=(580-10x)\cdot x\\TR=580x-10x^2$

And the marginal revenue is

$MR=\frac{d}{dx}(580x-10x^2) \\\\\mathrm{Apply\:the\:Sum/Difference\:Rule}:\quad \left(f\pm g\right)'=f\:'\pm g'\\\\MR=\frac{d}{dx}\left(580x\right)-\frac{d}{dx}\left(10x^2\right)\\\\MR=580-20x$

The Fixed Cost ( $FC$ ) is the amount of money you have to spend regardless of how many items you produce.

The Marginal Cost ( $MC$ ) function is the derivative of the cost function and is given by

$MC=\frac{d(TC)}{dx}$

We know that the total cost function of the company is given by $C=(30+5x)^2$ , which it is equal to

$\mathrm{Apply\:Perfect\:Square\:Formula}:\quad \left(a+b\right)^2=a^2+2ab+b^2\\a=30,\:\:b=5x\\\\\left(30+5x\right)^2=30^2+2\cdot \:30\cdot \:5x+\left(5x\right)^2=25x^2+300x+900\\\\C=25x^2+300x+900$

From the total cost function and applying the definition of fixed cost, the fixed cost is $900.

And the marginal cost function is

$MC=\frac{d}{\:dx}\left(25x^2+300x+900\right)\\\\MC=\frac{d}{dx}\left(25x^2\right)+\frac{d}{dx}\left(300x\right)+\frac{d}{dx}\left(900\right)\\\\MC=50x+300+0=50x+300$

4 0

3 years ago