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| A plot of indifference curves is a graphical map of preferences. The two axes on such a plot are two different goods, and a consumer is indifferent between any of the combinations of goods on an indifference curve. | A plot of indifference curves is a graphical map of preferences. The two axes on such a plot are two different goods, and a consumer is indifferent between any of the combinations of goods on an indifference curve. | ||
| - | {{: | + | {{: |
| ==== Properties of indifference curves ==== | ==== Properties of indifference curves ==== | ||
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| ===== Marginal rate of substitution ===== | ===== Marginal rate of substitution ===== | ||
| - | The marginal rate of substitution is the slope of the indifference curve. It denotes the quantity of one good that you are willing to give up to get one more of another good. | + | The marginal rate of substitution |
| - | $$ MRS = \frac{\Delta Y}{\Delta | + | $$ MRS = \frac{\Delta Y}{\Delta |
| + | Here, MRS is defined as the amount of good Y you would give up for an extra unit of good X. MRS is always negative since the indifference curve is always downward sloping. MRS also tells us the relative marginal utilities of the two goods along the indifference curve. Intuitively, | ||
| + | Diminishing marginal utility implies that indifference curves are non-concave relative to the origin. | ||
| + | ===== Budget constraints ===== | ||
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| + | Assume that the amount a consumer can spend is equal to their income. | ||
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| + | $$ \mathrm{Budget} = \mathrm{Income} $$ | ||
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| + | If a consumer can spend their income on either good X or good Y, the budget constraint equation is given by: | ||
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| + | $$ I = X p_X + Y p_Y $$ | ||
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| + | This can be represented as a line on a graph: | ||
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| + | {{: | ||
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| + | The slope of this line is the marginal rate of transformation (MRT): | ||
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| + | $$ \mathrm{MRT} = - \frac{p_X}{p_Y} $$ | ||
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| + | Because of the budget constraint, buying more of one good results in buying less of the other, which is effectively " | ||
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| + | The opportunity set is the set of available choices given a budget constraint and prices of goods. Graphically, | ||
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| + | A change in prices will cause the slope and intercepts to change. A change in the budget will cause the intercepts to change, but not the slope. | ||
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| + | ==== Constrained choices ==== | ||
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| + | Consumers will achieve the most utility given the constraint of their budget. Graphically, | ||
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| + | {{: | ||
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| + | In this plot, point B is the optimal point. | ||
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| + | The following equation comes from the fact that the indifference curve and budget constraint curve have the same slope at the optimal point: | ||
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| + | $$ \mathrm{MRT} = -\frac{\mathrm{MU}_X}{\mathrm{MU}_Y} = -\frac{P_X}{P_Y} = \mathrm{MRT} $$ | ||
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| + | Rearranging the equation: | ||
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| + | $$ \frac{\mathrm{MU}_X}{P_X} = \frac{\mathrm{MU}_Y}{P_Y} $$ | ||
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| + | As a reminder, MRT is the amount of one good you are willing to give up in exchange for another, and MRS is the amount of one good that the market is asking you to give up in exchange for another (because of budget constraints). A consumer will effectively trade one good for another until these two quantities are equal. | ||
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| + | ===== Paternalism ===== | ||
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| + | Paternalism is the government imposing its preferences on consumers. | ||