PASCAL’S TRIANGLE & BINOMIAL EXPANSIONS
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MCR3U1 U7L6 PASCAL’S TRIANGLE & BINOMIAL EXPANSIONS PART A ~ WHO IS PASCAL & WHAT IS HIS TRIANGLE?!? The array of numbers shown below is called Pascal’s triangle in honour of French mathematician, Blaise Pascal (1623–1662). Each row is generated by calculating the sum of pairs of consecutive terms in the previous row. 1 1 1 1 1 1 1 6 1 2 3 4 5 Row 0 1 3 6 10 15 Row 1 1 4 10 20 Row 2 Row 3 1 5 15 Row 4 1 6 Row 5 1 Row 6 Row 7 Row 8 Complete rows 7 & 8. PART B ~ BINOMIAL EXPANSIONS (π + π)π Expand each of the following: a) (π + π)2 = b) (π + π)3 = c) (π + π)4 = Examine the coefficients in the above examples. Is there a connection between the coefficients and Pascal’s triangle? Examine the literal coefficients in the above examples. Is there a pattern with the exponents of π and π? MCR3U1 U7L6 In general, when expanding any binomial (π + π)π : ο· the coefficients of each term follow Pascal’s Triangle (n = row #) ο· the pattern of exponents on a and b follows: (a ο« b)n ο½ a n ο« a nο1b ο« a nο2b2 ο« a nο3b 3 ο« a nο4 b 4 ο«... ο« b n Note: If the exponent is n, there will be n + 1 terms in the expansion. PART C ~ EXAMPLES ο ο Ex ο Expand each of the following binomials: a) (π₯ + π¦)5 = b) (x − y)5 = c) (2x − 1)6 = d) (3π₯ 2 − 2y)4 = MCR3U1 U7L6 Determine the value of k in each term from the binomial expansion of (π + π)11 : Ex ο a) Ex ο 462π6 ππ b) 330ππ π 4 Determine the number of terms in the expansion of each of the following: a) (2π + 3π)12 b) (2π₯ − 3π¦)27 Ex ο Write and simplify the fourth term in the expansion of (3π₯ 2 − 4π¦)8 . Ex ο Write 1 + 10π₯ 2 + 40π₯ 4 + 80π₯ 6 + 80π₯ 8 + 32π₯ 10 in the form (π + π)π . HOMEWORK: p.466 #1, 2, 4bdf, 5ace
