x (a -bT
+ Ig + Xn + G).Government
We can add a public sector to our economic model by assuming a fixed level of government expenditures, G, and lump-sum taxes, T. The addition of taxes to the model introduces another complication: disposable income no longer is identical to GDP. Rather, DI = Y -T. Here we make use of the convention that "Y" stands for GDP.
Equilibrium still requires
that total production equals total purchases, or in this case, Ye
= C + Ig + Xn + G. As before,
consumption is assumed to be a linear function of disposable income: C
= a + bDI. Substituting Y -T for DI and inserting
into our equilibrium relationship, we find Ye = a +
b(Ye -T) + Ig + Xn
+ G. Finally, we solve for Ye to find that Ye
= x (a -bT
+ Ig + Xn + G).
Following the usual procedure,
it is apparent that 
= and that 
= 
. That is, the
change in equilibrium GDP from a one dollar change in government expenditures
is equal to the standard multiplier, while a one dollar increase in lump-sum
taxes decreases equilibrium GDP by b (the MPC) times the standard
multiplier. Since the MPC is between zero and one by assumption, it is clear
that -
< 
.
That is, the impact on equilibrium GDP of a change in government spending exceeds
the impact of an equal (but in the opposite direction) change in taxes.
Suppose for example that
C = 97.5 + .75DI, Ig = 20, Xn = 0,
G = 20, and T = 20. Following the formula, Ye
= 
x (97.5 - .75x(20)
+ 20 + 0 +20) = 4 x 122.5 = $490. A $10 increase in government spending will
increase equilibrium GDP by x10
= $40, while a $10 increase in lump-sum taxes will reduce equilibrium
GDP by 
x10 = $30.