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Question
If k + 3, 2k + 1, k + 7 are in A.P., then find this progression up to 5 terms.
Sum
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Solution
Given the three terms are in A.P.:
k + 3, 2k + 1, k + 7
For terms in AP.
(2k + 1) − (k + 3) = (k + 7) − (2k + 1)
k − 2 = 6 − k
2k = 8
k = `8/2`
k = 4
a1 = k + 3
a1 = 4 + 3
a1 = 7
a2 = 2k + 1
a2 = 2(4) + 1
a2 = 8 + 1
a2 = 9
a3 = k + 7
a3 = 4 + 7
a3 = 11
Common difference d = 9 − 7
= 2
a4 = a + (n − 1)d
= 7 + (4 − 1)2
= 7 + 3(2)
= 7 + 6
= 13
a5 = a + (n − 1)d
= 7 + (5 − 1)2
= 7 + 4(2)
= 7 + 8
= 15
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