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11X1 T10 02 geometric series

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Nigel Simmons
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Geometric Series
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term.
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r.
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T r 2 a
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T r 2 a T  3 T2
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T r 2 a T  3 T2 Tn r Tn1
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T  3 T2 Tn r Tn1
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar T  3 T2 Tn r Tn1
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn r Tn1
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32, 
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  a  2, r  4
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4  24  n 1
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4  24  n 1  22  2 n 1  22  2 n2
Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4  24  n 1  22  2 n 1 Tn  2 2 n1  22  2 n2
ii  If T2  7 and T4  49, find r
ii  If T2  7 and T4  49, find r ar  7
ii  If T2  7 and T4  49, find r ar  7 ar 3  49
ii  If T2  7 and T4  49, find r ar  7 ar 3  49 r2  7
ii  If T2  7 and T4  49, find r ar  7 ar 3  49 r2  7 r 7
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. ar 3  49 r2  7 r 7
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. ar 3  49 a  1, r  4 r2  7 r 7
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 r 7
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500 n  1  4.48 n  5.48
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500 n  1  4.48 n  5.48 T6  1024, is the first term  500
ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500 n  1  4.48 n  5.48 T6  1024, is the first term  500 Exercise 6E; 1be, 2cf, 3ad, 5ac, 6c, 8bd, 9ac, 10ac, 15, 17, 18ab, 20a

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11 x1 t01 03 factorising (2014)
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11 x1 t01 02 binomial products (2014)
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12 x1 t02 01 differentiating exponentials (2014)
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11 x1 t01 01 algebra & indices (2014)
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12 x1 t01 03 integrating derivative on function (2013)
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12 x1 t01 02 differentiating logs (2013)
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12 x1 t01 01 log laws (2013)
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X2 t02 04 forming polynomials (2013)
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X2 t02 03 roots & coefficients (2013)
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X2 t02 02 multiple roots (2013)
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X2 t02 01 factorising complex expressions (2013)
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11 x1 t16 07 approximations (2013)
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11 x1 t16 06 derivative times function (2013)
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11 x1 t16 05 volumes (2013)
11 x1 t16 05 volumes (2013)11 x1 t16 05 volumes (2013)
11 x1 t16 05 volumes (2013)
 
11 x1 t16 04 areas (2013)
11 x1 t16 04 areas (2013)11 x1 t16 04 areas (2013)
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11 x1 t16 03 indefinite integral (2013)
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11 x1 t16 02 definite integral (2013)
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11X1 T10 02 geometric series

  • 2. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term.
  • 3. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r.
  • 4. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T r 2 a
  • 5. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T r 2 a T  3 T2
  • 6. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T r 2 a T  3 T2 Tn r Tn1
  • 7. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T  3 T2 Tn r Tn1
  • 8. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar T  3 T2 Tn r Tn1
  • 9. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn r Tn1
  • 10. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1
  • 11. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32, 
  • 12. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  a  2, r  4
  • 13. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4
  • 14. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4  24  n 1
  • 15. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4  24  n 1  22  2 n 1  22  2 n2
  • 16. Geometric Series An geometric series is a sequence of numbers in which each term after the first is found by multiplying a constant amount to the previous term. The constant amount is called the common ratio, symbolised, r. T T1  a r 2 a T2  ar  T3 T3  ar 2 T2 Tn  ar n1 Tn r Tn1 e.g .i  Find r and the general term of 2, 8, 32,  Tn  ar n1 a  2, r  4  24  n 1  22  2 n 1 Tn  2 2 n1  22  2 n2
  • 17. ii  If T2  7 and T4  49, find r
  • 18. ii  If T2  7 and T4  49, find r ar  7
  • 19. ii  If T2  7 and T4  49, find r ar  7 ar 3  49
  • 20. ii  If T2  7 and T4  49, find r ar  7 ar 3  49 r2  7
  • 21. ii  If T2  7 and T4  49, find r ar  7 ar 3  49 r2  7 r 7
  • 22. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. ar 3  49 r2  7 r 7
  • 23. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. ar 3  49 a  1, r  4 r2  7 r 7
  • 24. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 r 7
  • 25. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7
  • 26. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500
  • 27. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500
  • 28. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500
  • 29. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500 n  1  4.48 n  5.48
  • 30. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500 n  1  4.48 n  5.48 T6  1024, is the first term  500
  • 31. ii  If T2  7 and T4  49, find r (iii) find the first term of 1, 4, 16, … to ar  7 be greater than 500. Tn  14  n 1 ar 3  49 a  1, r  4 r2  7 Tn  500 r 7 4 n1  500 log 4 n1  log 500 n  1 log 4  log 500 n  1  4.48 n  5.48 T6  1024, is the first term  500 Exercise 6E; 1be, 2cf, 3ad, 5ac, 6c, 8bd, 9ac, 10ac, 15, 17, 18ab, 20a