.
The first term of an AP is 3. Given that the sum of the first 6 terms is 48
and that the sum of all the terms is 168, calculate the common difference,
the number of terms in the AP and the last term
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The sum of the first 6 terms is 48.
This sum is 6 times the average of the first 6 terms
and is 6 times the average of the 1st and 6th terms of this AP
= 48,
or
= 48*2
= 96
= 96 - 18 = 78
= 78/6 = 13.
Thus the 6th term of the AP is 13:
= = 13
3 + 5d = 13
5d = 13-3 = 10
d = 10/5 = 2.
Thus the common difference of the AP is d= 2.
Next, the sum of all the terms of the AP is 168
= = 168
or
(2*3+(n-1)*2)*n = 168*2
6n + 2*(n-1)*n = 336
2n^2 + 4n - 336 = 0
n^2 + 2n - 168 = 0
(n-12)*(n+14) = 0
The roots of this quadratic equation are 12 and -14; since we are looking for the number of terms n,
we see that the solution is the positive root n= 12.
ANSWER. The common difference of the AP is 2;
the number of terms is 12, and the last term is = 3 + 2*(12-1) = 25.
Solved.
All questions are answered.
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- Problems on arithmetic progressions
- Word problems on arithmetic progressions
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