Math 410 Course Resources - Marginal Analysis & Elasticity Course Packet on marginal analysis j l l l I the demand unction of ma e - e I e I I E! 5 1 n t e f t C St fll Ct n t m f ct r t j t t f f f (h S I h Ip Vld OS IS glV by 6 0. X, a d h 0 al 0 n it) 0 an a U e he videos iS given by 8X + 9 evalua e h r I1 I f , e ma 91' a pro If function atx = 10. Marginal Prot = :] l . . . l This means that If production and sales increase by one unit, than total profit will i 0 decrease ' 0 increase ' by approximately :] dollars. 2. [I1 Points] DETAILS ' MY NOTES 3 I Math 110 Course Resources ' Marginal Analysis & Elasticity Course Packet on marginal analysis l The weekly demand for Xbox Math-Hero video games is given by p = x3 170x + 1450 venue function, R'(x), approximate the marginal revenue when 10 x video games produced and sold, and p is in dollars. Using the Marginal Re been produced and sold. l where x is the number of Xbo 'l Math-Hero video games have 3. [-I1 Points] DETAILS MY NOTES Math 110 Course Resources Marginal Analysis & Elasticity Course Packet on marginal analysis The weekly demand for Math Wars - The Tangent Menace video games is given by p: 210 +2000 X3 Where x is the number thousands of video games produced and sold, and p is in dollars. Using the Marginal Revenue function, R'(X), approximate the marginal revenue when 6,000 video games have been produced and sold. I:] dollars 5. [-/1 Points] DETAILS Math 110 Course Resources - Marginal Analysis & Elasticity Course Packet on marginal analysis The daily cost (in dollars) of producing LG ultra high definition televisions is given by C(x) = 5x3 - 50x2 + 90x + 400 where x denotes the number of thousands of televisions produced in a day. (a) Compute the average cost function, C(x). C ( x ) = (b) Compute the marginal average cost function, C'(x). C ' ( x ) = (c) Using the marginal average cost function, C'(x), approximate the marginal average cost when 2000 televisions have been produced. SEP istv A 28 20 898 F5 - F6 44 F7 DII F8 F4 F1 F2 @ & 3 A 5 O 7 O N Q W E R T Y U O A S D F G H J K Z X C V B N M6. [-/1 Points] DETAILS Math 110 Course Resources - Marginal Analysis & Elasticity Course Packet on marginal analysis The daily cost (in dollars) of producing Samsung VR headsets is given by C(x) = 900 + 600x2 + 6x3 where x denotes the number of headsets produced in a day and the total revenue in dollars is given by R(x) = 6000x - 90x2 Using the marginal average profit function, P'(x), approximate the marginal average profit when 3 headsets have been produced and sold SEP itv 4 28 DD esc F2 2OF 988 F4 .... F5 F6 14 F7 FB F9 F10 F1 @ # $ 5 6 O 2 3 A Q W E R T Y U O A S D F G H K Z X C B N M command com