(1 point) The profit function for a computer company is given by P(x)=−x2+26x−13 where x is...

Suppose the Sunglasses Hut Company has a profit function given by P(q)=-0.01q2+4q-26, where q is the...

Suppose the Sunglasses Hut Company has a profit function given by P(q)=-0.01q2+4q-26, where q is the number of thousands of pairs of sunglasses sold and produced, and P(q) is the total profit, in thousands of dollars, from selling and producing q pairs of sunglasses. A) Find a simplified expression for the marginal profit function. (Be sure to use the proper variable in your answer.) Answer: MP(q)= B) How many pairs of sunglasses (in thousands) should be sold to maximize profits?...

The profit function for a company producing x thousand items of a certain good (in hundreds...

The profit function for a company producing x thousand items of a certain good (in hundreds of dollars) is given by P(x)= -1000 + 30x2 - x3, where 1 < x < 50. Find the number of items that should be produced in order to maximize the profit. What is the maximum profit?

The total profit Upper P(x) ​(in thousands of​ dollars) from the sale of x hundred thousand...

The total profit Upper P(x) ​(in thousands of​ dollars) from the sale of x hundred thousand pillows is approximated by: P(x) = -x^3 + 9x^2 + 165x - 200 , x ≥ 5 Find the number of hundred thousands of pillows that must be sold to maximize profit. Find the maximum profit.

5.) A computer software company models the profit on its lastest video game using the relation...

5.) A computer software company models the profit on its lastest video game using the relation p(x) = -4x^2+20x-9 where x is the number ofgames produced in hundred thousand and p(x) is the profit in millions of dollars. a) what is the profit when 500000 games are produced? b) what type of function is p(x) c.) what are the best break even points for the company?(Hint: when profit is 0.)

The profit P (in thousands of dollars) for a company spending an amount s (in thousands...

The profit P (in thousands of dollars) for a company spending an amount s (in thousands of dollars) on advertising is shown below. P = −1/3 s3 + 9s2 + 400 (a) Find the amount of money the company should spend on advertising in order to yield a maximum profit. s =   thousands of dollars (b) The point of diminishing returns is the point at which the rate of growth of the profit function begins to decline. Find the point of...

Let's say an online retailer sells tablets. The demand (price) function is given by p(x)=500−18x, where...

Let's say an online retailer sells tablets. The demand (price) function is given by p(x)=500−18x, where x is the number of tablets produced sold and p(x) is the price per week, while the cost, in dollars per week to produce x tablets is given by C(x)=35000+120x. Based on this, answer the following questions: 1. Determine the Revenue Function. 2. Determine the number of tablets the retailer would have to sell to maximize revenue. What is the maximum revenue? 3. Determine...

The profit function for a certain commodity is P(x) = 120x − x2 − 2000. Find...

The profit function for a certain commodity is P(x) = 120x − x2 − 2000. Find the level of production that yields maximum profit, and find the maximum profit.

The profit function for a certain commodity is P(x) = 170x − x2 − 1000. Find...

The profit function for a certain commodity is P(x) = 170x − x2 − 1000. Find the level of production that yields maximum profit, and find the maximum profit.

If the profit function for a product is P(x) = 4800x + 90x^2 − x^3 −...

If the profit function for a product is P(x) = 4800x + 90x^2 − x^3 − 199,000 dollars, selling how many items, x, will produce a maximum profit? x = items Find the maximum profit. $

Question 4 i. The profit for a product is given by π(x) = −1600 + 100x...

Question 4 i. The profit for a product is given by π(x) = −1600 + 100x − x^2, where x is the number of units produced and sold. How many units of the product must be sold to break-even? ii. Write the profit function in the form k − a(x − h)^2 . a. How many units of the product must be sold to maximise profit? b. What would the maximum profit be?