Learning Objectives for This Lesson
By the end of this lesson, you should be able to:
- Construct Pascal's Triangle and identify
for any row - Expand
using Pascal's Triangle, correctly applying the exponent pattern - Calculate binomial coefficients using
- Find specific terms of a binomial expansion without full expansion
- Apply the Binomial Theorem to non-standard binomials like
Recall: Binomial Expansions You Already Know
— coefficients: 1, 2, 1 — coefficients: 1, 3, 3, 1- Each term:
-exponent + -exponent =
What is the coefficient of
Without Multiplying, Expand
You may know:
What are the coefficients for
Is there a pattern that avoids repeated multiplication?
Prior Identities Are Pascal's Triangle Rows
These coefficient rows are rows 2 and 3 of Pascal's Triangle.
Build Pascal's Triangle: Rows 0 Through 5
Each entry = sum of two above it. Row
Why Adjacent Entries Add Up
Coefficient of
Adjacent entries add because
Use Row 5 to Expand
Row 5 coefficients: 1, 5, 10, 10, 5, 1
Exponent pattern:
Sum of exponents in each term equals 5.
Check-In: Expand
Write out Row 6 of Pascal's Triangle, then use it to expand
Reminder: each entry in Row 6 is the sum of two adjacent entries in Row 5.
Verify that every term has exponents summing to 6.
Pascal's Triangle Has Limits: We Need a Formula
Pascal's Triangle is efficient for small
But for
Better: compute any coefficient directly using
No building required — just compute the entry you need.
The Binomial Theorem: Formal Statement
Written term by term:
Computing
Key:
(matches Row 4)
Shortcut for small
Full Expansion Using the Formula:
| Term | ||
|---|---|---|
| 0 | 1 | |
| 1 | 5 | |
| 2 | 10 | |
| 3 | 10 | |
| 4 | 5 | |
| 5 | 1 |
Probe: Connect the Triangle to the Formula
Row 4: 1, 4, 6, 4, 1
— —
Verify
The th Term: No Full Expansion Needed
The general term of
The
Key rule: "Find the
Find the 5th Term of
5th term →
Verify:
Find a Term by Its -Exponent
Probe: Spot the Off-by-One Error
Question: "Find the 4th term of
Two students:
- Student A uses
→ gets - Student B uses
→ gets
Who is correct? Why does the other fail?
Non-Standard Binomials: Full Expression in the Formula
In
Every term:
Worked: Expand
Treat as
Worked: 4th Term of
4th term →
Two steps: index correction (
Check-In: Apply All Three Techniques
- Identify
: the -exponent is 2, so - Write the term:
- Compute:
Verify the sign:
Three Common Errors to Avoid
Off-by-one: "4th term" → use
Inner coefficient:
Sign pattern:
Your Turn: Unscaffolded Term Problem
Find the 4th term of
(index correction)
Summary: The Binomial Theorem as a Power Tool
- Pascal's Triangle: fast for small
— read row formula: works for any directly- Specific terms:
th term → index - Non-standard: substitute full expressions; track signs
Next: These Coefficients Reappear in Probability
In the binomial distribution:
Flipping a fair coin 10 times: probability of exactly 6 heads?