SOLUTION: The 12th term of an arithmetic seqence progression is 5.the 7th term of this progression is 9 more than the 4th term. Determine the sum of 20 terms of this progression

Question 1069082: The 12th term of an arithmetic seqence progression is 5.the 7th term of this progression is 9 more than the 4th term. Determine the sum of 20 terms of this progression
Answer by ikleyn(52790) (Show Source): You can put this solution on YOUR website!
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The 12th term of an arithmetic sequence progression is 5. the 7th term of this progression is 9 more than the 4th term.
Determine the sum of 20 terms of this progression
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"the 7th term of this progression is 9 more than the 4th term." means

 = 9.   (1)

But, as you know,  = ,   = , therefore,

 = 6d - 3d = 3d = 9.

Hence,  d = 3.


Now you can determine the first term   using the condition
"The 12th term of an arithmetic seqence progression is 5.".

It gives you an equation

 = 5,

which implies  = 5 - 11*3 = 5 - 33 = -28.


Having  and d, you can calculate the sum of 20 terms of this progression using the formula 

 =  =  = 10.

Solved.

There is a bunch of lessons on arithmetic progressions in this site:
    - Arithmetic progressions
    - The proofs of the formulas for arithmetic progressions
    - Problems on arithmetic progressions
    - Word problems on arithmetic progressions
    - One characteristic property of arithmetic progressions
    - Solved problems on arithmetic progressions

Also, you have this free of charge online textbook in ALGEBRA-II in this site
    - ALGEBRA-II - YOUR ONLINE TEXTBOOK.

The referred lessons are the part of this online textbook under the topic "Arithmetic progressions".

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