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प्रश्न
Verify that the following is an AP, and then write its next three terms.
a, 2a + 1, 3a + 2, 4a + 3,...
उत्तर
Here,
a1 = a
a2 = 2a + 1
a3 = 3a + 2
a4 = 4a + 3
a2 – a1 = 2a + 1 – a = a + 1
a3 – a2 = 3a + 2 – 2a – 1 = a + 1
a4 – a3 = 4a + 3 – 3a – 2 = a + 1
∵ a2 – a1 = a3 – a2 = a4 – a3 = a + 1
Since, difference of successive terms are equal,
Hence, a, 2a + 1, 3a + 2, 4a + 3,… is an AP with common difference a + 1
Therefore, the next three term will be,
a5 = a + 4d
= a + 4(a + 1)
= 5a + 4
a6 = a + 5d
= a + 5(a + 1)
= 6a + 5
a7 = a + 6d
= a + 6(a + 1)
= 7a + 6
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