Math

posted by .

The 16th term of an Arithmetric Progression is four times the 36th term, and exceeds it by 32. Finda the numbers.

Respond to this Question

First Name
School Subject
Your Answer

Similar Questions

  1. Math

    The fifth term of an arithmetic progression is three times the second term,and the third term is 10.a)What is the first term,b)the common difference and c)the 15th term?
  2. math

    the fourth term of an arithmetic progression is equal to 3 times the first term and the seventh term exceeds twice the third term by 1 find the first term and the common differrence
  3. math

    if 4th term of an arithmetic progression is 3 times the 1st term nd 7th term exceeds twice the third term by 1. find the first term and common difference
  4. maths

    The 12th term of exceeds the 3rd term by 36 of an a.p If it's 16th term is 64 find first term and common difference
  5. math

    The 3rd term of an Arithmetic Progression is 10 more than the first term while the fifth term is 15 more than the second term. Find the sum of the 8th and 15th terms of the Arithmetic Progression if the 7th term is seven times the …
  6. Math

    If the 16th term of an arithmetic sequence is three times the fourth term, find the ratio of the 23rd term to the third term.
  7. Maths

    The 5th term of an arithmetic progression is 3times of 2nd term and 12th term exceeds 2times of 6th term by 1. Find the 16th term
  8. Maths

    The 5th term of an arithmetic progression is 3times of 2nd term and 12th term exceeds 2times of 6th term by 1. Find the 16th term
  9. Maths

    The 5th term of an arithmetic progression is 3times of 2nd term and 12th term exceeds 2times of 6th term by 1. Find the 16th term
  10. Algebra

    Find four numbers that form a geometric progression such that the second term is less than the first by 36 and the third term is greater than the fourth term by 324. (Hint: There are two possible sets of four numbers)

More Similar Questions