Let p=15-sqrt of x and C(x)=201+2x, where x is the number of garden hoees that can be sold at a price of $p per unit and C(x) is the total cost (in dollars) of producing x garden hoses.
B. Graph the cost function and the revenue function in the same viewing window for x greater or equal 0 and less than or equal 225. Use approximation techniques to find the break even points. (left and right)
**I need help with break even points ((((
Let P 15 Sqrt Of X And C X 201 2x Where X Is The Number Of Garden Hoees That Can Be Sold At A Price Of P Per Unit And 1 (11.04 KiB) Viewed 29 times
Let P 15 Sqrt Of X And C X 201 2x Where X Is The Number Of Garden Hoees That Can Be Sold At A Price Of P Per Unit And 2 (20.31 KiB) Viewed 29 times
Let p-15-√x and C(x)=201+2x, where x is the number of garden hoses that can be sold at a price of $p per unit and C(x) is the total cost (in dollars) of producing x garden hoses (A) Express the revenue function in terms of x. (B) Graph the cost function and the revenue function in the same viewing window for 0 sxs225. Use approximation techniques to find the break-even points Cm
(A) R(x)= 15x-x√x (8) Choose the correct graph for R(x) and C(x) on (0,225)x(0,600) OA AV 800- 400 200 Q C The break even point on the left is approximately (Round each coordinate to the nearest integer as needed.) Ask my instructor OB 600+ 400- 200 1 N 8" ■ √ V 4 (K) ± More 000 400 206- a Clear all
Join a community of subject matter experts. Register for FREE to view solutions, replies, and use search function. Request answer by replying!
((((