Math, asked by kohimasharma817, 9 months ago

Q1. The equilibrium conditions for two substitute goods are given below:
5P, - 2P, = 15 and -P, + 8P,= 16
Find the equilibrium prices of the two goods.​

Answers

Answered by hukam0685
0

Step-by-step explanation:

Given that:

The equilibrium conditions for two substitute goods are given below:

5P1- 2P2 = 15 and -P1 + 8P2 = 16

To find :

Find the equilibrium prices of the two goods.

Solution:

To find the equilibrium prices of the two goods,

solve the two equations

5P_1- 2P_2 = 15 \:  \:  \: ...eq1 \\   \\ -P_1 + 8P_2 = 16 \:  \:  \: ...eq2 \\  \\

equate the coefficient of P1 by multiplying eq2 by 5

5P_1- 2P_2 = 15  \\  -5P_1 + 40P_2 = 80 \\  -  -  -  -  -  -  -  - -  -   \\ 38P_2 = 95 \\  \\ P_2 =  \frac{95}{38}  \\  \\\bold{P_2= \frac{5}{2}}\\\\

Put the value of P2 in eq1

5P_1 - 2 \times   \frac{5}{2} = 15 \\  \\ 5P_1 = 15+5   \\  \\ 5P_1 = 20 \\  \\ \bold{P_1 = 4 }\\  \\

Thus,

Equilibrium prices of two goods are

P1=4

P2=5/2

Hope it helps you.

Answered by charisma47
0

Answer:

Equilibrium prices of two goods are

Equilibrium prices of two goods areP1=4

Equilibrium prices of two goods areP1=4P2=5/2

Equilibrium prices of two goods areP1=4P2=5/2Hope it helps you.

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