Answer to Question #283525 in Finance for Rajat

Solution:

i.). We use cross-price elasticity to determine whether goods are complements or substitutes; if the cross-price elasticity is positive, the goods are substitutes; if the cross-price elasticity is negative, the goods are complements.

The two products are complements since the cross-price elasticity is negative.

ii.). Profit maximizing output is where: MR = MC

MR₁ = "\\frac{\\partial TR} {\\partial QT}" = 1 - 12QT

MC₁ = 20

MR₁ = MC₁

1 - 12QT  = 20

 – 12QT = 19

QT = 19/-12 = -1.58

MR₂ = "\\frac{\\partial TR} {\\partial QS}" = 100 – 8QS

MC₂ = 10

MR₂ = MC₂

100 – 8QS = 20

100 – 20 = 8QS

80 = 8QS

QS = 10

iii.). Without demand interdependence:

TR = QT – 6QT2 + 100 QS – 4QS2 + QTQS

TR₁ = QT – 6QT2 + QT

MR₁ = "\\frac{\\partial TR_{1} } {\\partial QT}" = 1 - 12QT + 1

MC₁ = 20

MR₁ = MC₁

1 - 12QT + 1 = 20

12QT = 19

QT = "\\frac{19}{12}" = 1.58

TR₂ = 100QS – 4QS² + QS

MR₂ = "\\frac{\\partial TR_{2} } {\\partial QS}" = 100 - 8QS + 1

MC₂ = 10

MR₂ = MC₂

100 - 8QS + 1 = 20

101 – 20 = 8QS

81 = 8QS

QS = 10.1