Sources
Alcocer, Yuanxin (Amy) Yang. "Blaise Pascal: Contributions, Inventions & Facts." Education Portal. N.p., n.d. Web.
"Blaise Pascal Quotes." IPerceptive. N.p., n.d. Web.
Canavan-McGrath, Cathy. "Permutations and Combinations." Principles of Mathematics 12. Toronto: Nelson Education, 2011. N. pag. Print.
Erdman, Wayne. "Extensions of Combinations." How to Get an A In-- Permutations, Combinations & Probability. Toronto: Coles Pub., 1998. N. pag. Print.
N.d. Web. <http://4.bp.blogspot.com/-KESsqpLMOEQ/UxTEK0shFeI/AAAAAAAAAto/k1m2AIRWUu8/s1600/pascal.png>.
N.d. Web. <http://cdn.marketplaceimages.windowsphone.com/v8/images/5d8fcf4b-ddca-4bc3-9053-9fd4ebc3fb03?image>.
N.d. Web. <http://www.mathnstuff.com/math/algebra/tt/tt43h.gif>.
N.d. Web. <http://www.mathsisfun.com/algebra/images/binomial-theorem-first4.gif>.
"Pascal's Triangle." Math Is Fun. N.p., n.d. Web.
"Pascal's Triangle." Wikipedia. Wikimedia Foundation, n.d. Web.
Alcocer, Yuanxin (Amy) Yang. "Blaise Pascal: Contributions, Inventions & Facts." Education Portal. N.p., n.d. Web.
"Blaise Pascal Quotes." IPerceptive. N.p., n.d. Web.
Canavan-McGrath, Cathy. "Permutations and Combinations." Principles of Mathematics 12. Toronto: Nelson Education, 2011. N. pag. Print.
Erdman, Wayne. "Extensions of Combinations." How to Get an A In-- Permutations, Combinations & Probability. Toronto: Coles Pub., 1998. N. pag. Print.
N.d. Web. <http://4.bp.blogspot.com/-KESsqpLMOEQ/UxTEK0shFeI/AAAAAAAAAto/k1m2AIRWUu8/s1600/pascal.png>.
N.d. Web. <http://cdn.marketplaceimages.windowsphone.com/v8/images/5d8fcf4b-ddca-4bc3-9053-9fd4ebc3fb03?image>.
N.d. Web. <http://www.mathnstuff.com/math/algebra/tt/tt43h.gif>.
N.d. Web. <http://www.mathsisfun.com/algebra/images/binomial-theorem-first4.gif>.
"Pascal's Triangle." Math Is Fun. N.p., n.d. Web.
"Pascal's Triangle." Wikipedia. Wikimedia Foundation, n.d. Web.
Further Inquiry Questions
- Is there a way to find out how many numbers there are in each row of Pascal's triangle without constructing the triangle?
- How is Pascal's triangle used in architecture?
- What would happen if you had a negative binomial when doing expansion?
- How could you figure out larger rows of Pascal's triangle when doing binomial expansion without constructing the triangle?
- How many odd and even numbers are there in Pascal's Triangle?
- Is there a way to find out how many numbers there are in each row of Pascal's triangle without constructing the triangle?
- How is Pascal's triangle used in architecture?
- What would happen if you had a negative binomial when doing expansion?
- How could you figure out larger rows of Pascal's triangle when doing binomial expansion without constructing the triangle?
- How many odd and even numbers are there in Pascal's Triangle?