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31.33: Consumption and Saving

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    51831
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    The consumption function is a relationship between current disposable income and current consumption. It is intended as a simple description of household behavior that captures the idea of consumption smoothing. We typically suppose the consumption function is upward-sloping but has a slope less than one. So as disposable income increases, consumption also increases but not as much. More specifically, we frequently assume that consumption is related to disposable income through the following relationship:

    \[consumption = autonomous\ consumption + marginal\ propensity\ to\ consume \times disposable\ income.\]

    A consumption function of this form implies that individuals divide additional income between consumption and saving.

    • We assume autonomous consumption is positive. Households consume something even if their income is zero. If a household has accumulated a lot of wealth in the past or if a household expects its future income to be larger, autonomous consumption will be larger. It captures both the past and the future.
    • We assume that the marginal propensity to consume is positive. The marginal propensity to consume captures the present; it tells us how changes in current income lead to changes in current consumption. Consumption increases as current income increases, and the larger the marginal propensity to consume, the more sensitive current spending is to current disposable income. The smaller the marginal propensity to consume, the stronger is the consumption-smoothing effect.
    • We also assume that the marginal propensity to consume is less than one. This says that not all additional income is consumed. When a household receives more income, it consumes some and saves some.

    Figure 31.2.25 "The Consumption Function" shows this relationship.

    09b2863e054041b2ffafffac1d125419.jpg
    Figure \(\PageIndex{25}\): The Consumption Function

    More Formally

    In symbols, we write the consumption function as a relationship between consumption (C) and disposable income (Yd):

    \[C = a + bY^{d}\]

    where a and b are constants. Here a represents autonomous consumption and b is the marginal propensity to consume. We assume three things about a and b:

    1. a > 0
    2. b > 0
    3. b < 1

    The first assumption means that even if disposable income is zero \((Y^{d}= 0)\), consumption will still be positive. The second assumption means that the marginal propensity to consume is positive. By the third assumption, the marginal propensity to consume is less that one. With 0 < b < 1, part of an extra dollar of disposable income is spent.

    What happens to the remainder of the increase in disposable income? Since consumption plus saving is equal to disposable income, the increase in disposable income not consumed is saved. More generally, this link between consumption and saving (S) means that our model of consumption implies a model of saving as well.

    Using

    \[Y^{d}= C + S\]

    and

    \[C = a + bY^{d}\]

    we can solve for S:

    \[S = Y^{d} − C = −a + (1 − b)Y^{d}.\]

    So −a is the level of autonomous saving and (1 − b) is the marginal propensity to save.

    We can also graph the savings function. The savings function has a negative intercept because when income is zero, the household will dissave. The savings function has a positive slope because the marginal propensity to save is positive.

    Economists also often look at the average propensity to consume (APC), which measures how much income goes to consumption on average. It is calculated as follows:

    \[APC = C / Y^{d}.\]

    When disposable income increases, consumption also increases but by a smaller amount. This means that when disposable income increases, people consume a smaller fraction of their income: the average propensity to consume decreases. Using our notation, we are saying that using \(C = a + bY^{d}\), so we can write

    \[APC = a/Y^{d} + b.\]

    An increase in disposable income reduces the first term, which also reduces the APC.

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