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Given a geometric progression whose

  1. The third, fifth and seventeenth terms of an arithmetic progression are in geometric progression. Find the common ratio of the
  2. The first three terms of a geometric progression are also the first ninth and eleventh terms respectic of an arithmetic
  3. The three real,distint and non-zero numbersa,b,c are such that a,b,c are in arithmetic progression and a,c,b are in geometric
  4. The second, third and ninth terms of an arithmetic progression forms the first, second and third terms of a geometric
  5. The first, second and third terms of a geometric progression are 2k+3, k+6 and k, respectively. Given that all the terms of
  6. 5 distinct positive reals form an arithmetic progression. The 1st, 2nd and 5th term form a geometric progression. If the product
  7. 5 distinct positive reals form an arithmetic progression. The 1st, 2nd and 5th term form a geometric progression. If the product
  8. The first term of an arithmetic progression is ,a , and the common difference is -4.the first term of a geometric progression is
  9. Geometric progression has 6 terms. If the 3rd and 4th term are 28-and 56 find the sum of the geometric progression
  10. The sum of the 3 terms in arithmetic sequence is 39.if these numbers is increased by 1,5 and 12 respectively the numbers would