Answer:
(a) [tex]360=2 \times P + 4 \times M + 6 \times J[/tex]
(b) 2
(c) 3
(d) 180
(e) [tex]180=1 \times P+ 2 \times M + 3 \times J[/tex]
It is not different than before, he can afford the same amount of goods.
Explanation:
let's start by writing down all the components of the problem:
1. Potato's sacs ( [tex]P[/tex]) cost 2 crowns, denote the price a potato sack by [tex]P_p[/tex]
2. Meatballs ( [tex]M[/tex]) cost 4 per crock, denote [tex]P_m[/tex] as the price of meatballs
3. Jam cost 6 per jar ( [tex]J[/tex]), denote [tex]P_j[/tex] as the price of jam.
4. Gunnar has an Income [tex]M=360\\[/tex]
His budget constrain is then:
He only spends money on those goods, then his expenditures equals his income
[tex]I=P_p \times P + P_m \times M + P_j \times J[/tex]
[tex]360=2 \times P + 4 \times M + 6 \times J[/tex]
(b) Next we need to re express all prices so relative prices are the same as before.
If the new price of potatoes is [tex]P'_p=1[/tex], then the price of meatballs will be [tex]P'_m=\frac{P_m}{P_p}=\frac{4}{2}=2[/tex]
(c) the same can be done for jam
If the new price of potatoes is [tex]P'_p=1[/tex], then the price of jam will be [tex]P'_j=\frac{P_j}{P_p}=\frac{6}{2}=3[/tex]
(d) Gunnar's Income would be then half as before
[tex]I'=\frac{I}{P_p}=\frac{360}{2}=180[/tex]
(e) We can summarize everything re expressing Gunnars budget constraint
The old budget constraint was
[tex]I=P_p \times P + P_m \times M + P_j \times J[/tex]
Now setting [tex]P'_p=1[/tex] is the same as dividing everything by [tex]P_p=2[/tex]
[tex]\frac{I}{P_p}=\frac{P_p}{P_p} \times P + \frac{P_m}{P_p} \times M + \frac{P_j}{P_p} \times J[/tex]
[tex]I'= P + P'_m \times M + P'_j \times J[/tex]
[tex]180=1 \times P+ 2 \times M + 3 \times J[/tex]
