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General Expansion of Binomials
General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k
General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k 
General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n
General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n
General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n e.g .2  3 x  4
General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n e.g .2  3 x   4C0 2 4  4C1 23 3 x  4C2 2 2 3 x   4C3 23 x   4C4 3 x  4 2 3 4
General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n e.g .2  3 x   4C0 2 4  4C1 23 3 x  4C2 2 2 3 x   4C3 23 x   4C4 3 x  4 2 3 4  16  96 x  216 x 2  216 x 3  81x 4
Pascal’s Triangle Relationships
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1 
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck 
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck 2 nCk  nCnk where 1  k  n  1 " Pascal' s triangle is symmetrical"
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck 2 nCk  nCnk where 1  k  n  1 " Pascal' s triangle is symmetrical" 3 nC0  nCn  1
Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck 2 nCk  nCnk where 1  k  n  1 " Pascal' s triangle is symmetrical" Exercise 5B; 2ace, 5, 6ac, 10ac, 11, 14 3 nC0  nCn  1

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12 x1 t08 02 general binomial expansions (2012)

  • 2. General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k
  • 3. General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k 
  • 4. General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n
  • 5. General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n
  • 6. General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n e.g .2  3 x  4
  • 7. General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n e.g .2  3 x   4C0 2 4  4C1 23 3 x  4C2 2 2 3 x   4C3 23 x   4C4 3 x  4 2 3 4
  • 8. General Expansion of Binomials Ck is the coefficient of x k in 1  x  n k n n Ck    k  1  x n  nC0  nC1 x  nC2 x 2   nCn x n which extends to; a  b n  nC0 a n  nC1a n1b nC2 a n2b 2   nCn1ab n1  nCnb n e.g .2  3 x   4C0 2 4  4C1 23 3 x  4C2 2 2 3 x   4C3 23 x   4C4 3 x  4 2 3 4  16  96 x  216 x 2  216 x 3  81x 4
  • 10. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1
  • 11. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1
  • 12. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1 
  • 13. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k
  • 14. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk
  • 15. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk
  • 16. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck 
  • 17. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck
  • 18. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck
  • 19. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck 2 nCk  nCnk where 1  k  n  1 " Pascal' s triangle is symmetrical"
  • 20. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck 2 nCk  nCnk where 1  k  n  1 " Pascal' s triangle is symmetrical" 3 nC0  nCn  1
  • 21. Pascal’s Triangle Relationships 1 nCk  n1Ck 1  n1Ck where 1  k  n  1 1  x n  1  x 1  x n1  1  x  n1C0  n1C1 x   n1Ck 1 x k 1  n1Ck x k   n1Cn1 x n1  looking at coefficients of x k LHS  nCk RHS  1 n1Ck 1   1 n1Ck   n1Ck 1  n1Ck n Ck  n1Ck 1  n1Ck 2 nCk  nCnk where 1  k  n  1 " Pascal' s triangle is symmetrical" Exercise 5B; 2ace, 5, 6ac, 10ac, 11, 14 3 nC0  nCn  1