5 Must Know Facts For Your Next Test

1. The $n$-th row of Pascal's Triangle corresponds to the coefficients in the expansion of $(a + b)^n$.
2. The elements in Pascal's Triangle are symmetrical.
3. Each entry in Pascal’s Triangle can be calculated using the formula $\binom{n}{k}$, where $n$ is the row number and $k$ is the position within the row.
4. The sum of the elements in the $n$-th row is equal to $2^n$.
5. Pascal's Triangle can be used to find combinations, which is fundamental in probability and counting theory.

Review Questions

• How do you determine an entry in Pascal’s Triangle using binomial coefficients?
• What does the $10$th row of Pascal’s Triangle represent in terms of binomial expansion?
• Why are the rows of Pascal’s Triangle symmetrical?

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