Learning Objectives
Learning Objectives
By the end of this section, you will be able to do the following:- Explain the poverty trap, noting how it is impacted by government programs
- Identify potential issues in government programs that seek to reduce poverty
- Calculate a budget constraint line that represents the poverty trap
Can you give people too much help, or the wrong kind of help? When people are provided with food, shelter, health care, income, and other necessities, assistance may reduce their incentive to work. Consider a program to fight poverty that works in this reasonable-sounding manner: the government provides assistance to the poor, but as the poor earn income to support themselves, the government reduces the level of assistance it provides. With such a program, every time a poor person earns $100, the person loses $100 in government support. As a result, the person experiences no net gain for working. Economists call this problem the poverty trap.
Consider the situation faced by a single-parent family: a single mother (earning $8 an hour) with two children, as illustrated in Figure 14.3. First, consider the labor–leisure budget constraint faced by this family in a situation without government assistance. On the horizontal axis is hours of leisure (or time spent with family responsibilities), increasing in quantity from right to left. Also on the horizontal axis is the number of hours of paid work, going from zero hours on the right to the maximum of 2,500 hours on the left. On the vertical axis is the amount of income per year, rising from lower to higher amounts of income. The budget constraint line shows that at zero hours of leisure and 2,500 hours of work, the maximum amount of income is $20,000 ($8 × 2,500 hours). At the other extreme of the budget constraint line, an individual would work zero hours, earn zero income, but enjoy 2,500 hours of leisure. At point A on the budget constraint line, by working 40 hours a week, 50 weeks a year, the utility-maximizing choice is to work a total of 2,000 hours per year and earn $16,000.
Now suppose that a government antipoverty program guarantees every family with a single mother and two children $18,000 in income. This is represented on the graph by a horizontal line at $18,000. With this program, each time the mother earns $1,000, the government will deduct $1,000 of its support. Table 14.3 shows what will happen at each combination of work and government support.
Amount Worked (hours) | Total Earnings | Government Support | Total Income |
---|---|---|---|
0 | 0 | $18,000 | $18,000 |
500 | $4,000 | $14,000 | $18,000 |
1,000 | $8,000 | $10,000 | $18,000 |
1,500 | $12,000 | $6,000 | $18,000 |
2,000 | $16,000 | $2,000 | $18,000 |
2,500 | $20,000 | 0 | $20,000 |
The new budget line, with the antipoverty program in place, is the horizontal and heavy line that is flat at $18,000. If the mother does not work at all, she receives $18,000, all from the government. If she works full time, giving up 40 hours per week to spend with her children, she still ends up with $18,000 at the end of the year. Only if she works 2,300 hours during the year—which is an average of 44 hours per week for 50 weeks a year—does the household income rise to $18,400. Even in this case, all of her year’s work means that the household income rises by only $400 above the income she would receive if she did not work at all. She would need to work 50 hours a week to reach $20,000.
Indeed, the poverty trap is even stronger than this simplified example shows, because a working mother will have extra expenses such as clothing, transportation, and child care that a nonworking mother will not face, making the economic gains from working even smaller. Moreover, those who do not work fail to build up job experience and contacts, which makes working in the future even less likely.
The bite of the poverty trap can be reduced by designing an antipoverty program so that, instead of reducing government payments by $1 for every $1 earned, payments are reduced by some smaller amount instead. The bite of the poverty trap can also be reduced by imposing requirements for work as a condition of receiving benefits and setting a time limit on benefits.
Figure 14.4 illustrates a government program that guarantees $18,000 in income, even for those who do not work at all, but then reduces this amount by 50 cents for each $1 earned. The new, higher budget line in Figure 14.4 shows that, with this program, additional hours of work will bring some economic gain. Because of the reduction in government income when an individual works, an individual earning $8.00 per hour will really only net $4.00 per hour. The vertical intercept of this higher budget constraint line is at $28,000 ($18,000 + 2,500 hours × $4.00 per hour = $28,000). The horizontal intercept is at the point on the graph where $18,000 and 2500 hours of leisure is set. Table 14.4 shows the total income differences with various combinations of labor and leisure.
This type of program, however, raises other issues. First, even if it does not eliminate the incentive to work by reducing government payments by $1 for every $1 earned, enacting such a program may still reduce the incentive to work. At least some people who would be working 2,000 hours each year without this program might decide to work fewer hours but still end up with more income—that is, their choice on the new budget line would be like S, above and to the right of the original choice, P. Of course, others may choose a point such as R, which involves the same amount of work as P, or even a point to the left of R, which involves more work.
The second major issue is that when the government phases out its support payments more slowly, the antipoverty program costs more money. Still, it may be preferable in the long run to spend more money on a program that retains a greater incentive to work, rather than spending less money on a program that nearly eliminates any gains from working.
Amount Worked (hours) | Total Earnings | Government Support | Total Income |
---|---|---|---|
0 | 0 | $18,000 | $18,000 |
500 | $4,000 | $16,000 | $20,000 |
1,000 | $8,000 | $14,000 | $22,000 |
1,500 | $12,000 | $12,000 | $24,000 |
2,000 | $16,000 | $10,000 | $26,000 |
2,500 | $20,000 | $8,000 | $28,000 |
The next module will consider a variety of government support programs focused specifically on the poor, including welfare, Supplemental Nutritional Assistance Program (SNAP), Medicaid, and the earned income tax credit (EITC). Although these programs vary from state to state, it is generally a true statement that in many states from the 1960s into the 1980s, if poor people worked, their level of income barely rose—or did not rise at all—after the reduction in government support payments was factored in. The following Work It Out feature shows how this happens.
Work It Out
Calculating a Budget Constraint Line
Jason earns $9.00 an hour, and a government antipoverty program provides a floor of $10,000 guaranteed income. The government reduces government support by $0.50 for each $1.00 earned. What are the horizontal and vertical intercepts of the budget constraint line? Assume the maximum hours for work or leisure is 2,500 hours.
Step 1. Determine the amount of the government guaranteed income. In this case, it is $10,000.
Step 2. Plot that guaranteed income as a horizontal line on the budget constraint line.
Step 3. Determine what Jason earns if he has no income and enjoys 2,500 hours of leisure. In this case, he will receive the guaranteed $10,000 (the horizontal intercept).
Step 4. Calculate how much Jason’s salary will be reduced by due to the reduction in government income. In Jason’s case, it will be reduced by one half. He will, in effect, net only $4.50 per hour.
Step 5. If Jason works 1,000 hours, at a maximum what income will Jason receive? Jason will get the government assistance of $10,000. He will net only $4.50 for every hour he chooses to work. If he works 1,000 hours at $4.50 per hour, his earned income is $4,500 plus the government income of $10,000. Thus, the total maximum income (the vertical intercept) is $10,000 + $4,500 = $14,500.