Answer to Question #303348 in Finance for Lukas

Question #303348

Assuming that Nations 1 and 2 are both large and starting from the equilibrium level of

national income and equilibrium in the trade balance in Nation 1 and given that 𝑀𝑃𝑆1 = 0.20; 𝑀𝑃𝑆2 = 0.15; 𝑀𝑃𝑀1 = 0.20 𝑎𝑛𝑑 𝑀𝑃𝑀2 = 0.10, find the change in the

equilibrium level of national income and the trade balance in Nation 1 for:

a) An autonomous increase in the exports of Nation 1 of 200 that replaces domestic

production in Nation 2

b) An autonomous increase in investment of 200 in Nation 1

c) An autonomous increase in investment of 200 in Nation 2.

Expert's answer

A)"K^{"} = \\frac{1} { MPS1 + MPM1 + MPM2 (MPS1\/MPS2)}"

= "\\frac{1}{ 0.20 +0.20+ 0.10 (0.20\/0.15)}"

="\\frac{1}{0.533} = 1.88"

"\\Delta{YE} =(\\Delta{X})(K") = (200)\\times(1.88) = 376"

"\\Delta{M} =(\\Delta YE)(MPM_1)=(376)\\times(0.20) = 75.2"

"\\Delta S=(\\Delta YE)(MPS_1)=376\\times0.20"

"\\Delta X = \\Delta S + \\Delta M = 75.2+ 75.2 = 150.4" so that

"\\Delta X-\\Delta M" = 75.2= Nation 1's trade surplus.

B)"K^{*} = \\frac{1+ MPM2\/MP52}{MPS1+ MPM1+ MPM2(MPS1\/MPS)}"

= ("\\frac{1+0.101}{0.15\/0.533})"

="\\frac{1.667}{0.533}" =3.13

"\\Delta YE= (\\Delta IX)= (200X3.13)" =626

"\\Delta M=(\\Delta YE\\times MPM_1)=(626\\times0.20)" =125.2

"\\Delta S= (\\Delta YE\\times MPS1) =(626X0.20)" =125.2

200+"\\Delta X" =125.2+125.2

and "\\Delta X" = 50.4

so that"\\Delta X-\\Delta M" =50.4-125.2=74.8

c)"K^{*} = \\frac{1+ MPM2\/MP52}{MPS1+ MPM1+ MPM2(MPS1\/MPS)}"

"(\\frac{1+0.101}{0.20\/0.533})"

"\\frac{1.667}{0.106}=15.72"

"\\Delta YE= (\\Delta IX)= (200X15.72)=3144"

"\\Delta M=(\\Delta YEX\\times MPM_1)=(626\\times0.15)=93.9"

"\\Delta S= (\\Delta YE\\times MPS1) =(626X0.15)=93.9"

200+"\\Delta" X=93.9+93.9=187.8

"\\Delta X=" 134.8

"\\Delta X" -"\\Delta M" =134.8-93.9=40.9

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Answer to Question #303348 in Finance for Lukas

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