Lecture 11
Learning objectives
After this class, you should be able to:
- Explain the theorem on page 340.
- Apply the above theorem to express a rational function as partial fractions, and to solve a recurrence using generating functions.
Reading assignment
- Page 338-340.
- Review division on polynomials.
Exercises and review questions
- Questions on current lecture's material
- Use generating functions to derive the closed for solution to the following recurrence:
g0 = 1/4, g1 = 1/4, gn = (3/2) gn-1 - (1/2) gn-2
.
- Verify the correctness of the partial fraction expansion that we performed for the following rational function:
z/(z2 - 2z + 2)
.
- Questions on next lecture's material
- Find the integer and fractional parts for the following division: 1000/11.
- Express the following rational function as
T(z) + P(z)/Q(z)
, where P(z)
is a lower degree polynomial than Q(z)
, and T(z)
is some polynomial: z3/(z+1)
.
- Express the following rational function as
T(z) + P(z)/Q(z)
, where P(z)
is a lower degree polynomial than Q(z)
, and T(z)
is some polynomial: z3/(z-1)
.
- Express the following rational function as
T(z) + P(z)/Q(z)
, where P(z)
is a lower degree polynomial than Q(z)
, and T(z)
is some polynomial: (2 z3 + 2 z2 - 2 z - 2)/(z-1)
.
Last modified: 27 Mar 2006