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Question
Match the APs given in column A with suitable common differences given in column B.
| Column A | Column B |
| (A1) 2, –2, –6, –10,... | (B1) `2/3` |
| (A2) a = –18, n = 10, an = 0 | (B2) –5 |
| (A3) a = 0, a10 = 6 | (B3) 4 |
| (A4) a2 = 13, a4 = 3 | (B4) –4 |
| (B5) 2 | |
| (B6) `1/2` | |
| (B7) 5 |
Solution
| Column A | Column B |
| (A1) 2, –2, –6, –10,... | (B4) –4 |
| (A2) a = –18, n = 10, an = 0 | (B5) 2 |
| (A3) a = 0, a10 = 6 | (B1) `2/3` |
| (A4) a2 = 13, a4 = 3 | (B2) –5 |
Explanation:
(A1): 2, –2, –6, –10,...
Here, common difference, d = –2 – 2 = –4
(A2): an = a + (n – 1)d
⇒ 0 = –18 + (10 – 1)d
18 = 9d
∴ Common difference, d = 2
(A3): a10 = 6, a = 0
⇒ a + (10 – 1)d = 6 ...[∵ an = a + (n – 1)d]
⇒ 0 + 9d = 6 ...[∵ a = 0 (given)]
d = `6/9 = 2/3`
(A4): a2 = 13, a4 = 3
⇒ a + (2 – 1)d = 13 ...[∵ an = a + (n – 1)d]
⇒ a + d = 13 ...(i)
And a4 = 3
⇒ a + (4 – 1)d = 3
∴ a + 3d = 3 ...(ii)
On subtracting equation (i) from equation (ii), we get
2d = –10
⇒ d = 5
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