If the first four terms of an arithmetic sequence are: a, 2a, b and a-6-b for some numbers “a” and “b”, then the value of the 100 term is : About the author Reagan
Answer: The value of the 100 term is – 100. Step-by-step explanation: Here we know that a, 2a, b and a-6-b are in arithmetic progression. First find out the common difference, d = a₂ – a₁ d = 2a – a d = a d = a₃ – a₂ d = b – 2a Substitute the value of d, a = b – 2a b = a + 2a b = 3a Now, a₄ = a + 3d We know, d = a a – 6 – b = a + 3a a – 6 – b = a + 3a a – 6 – b = 4a Substituting the value of b, a – 6 – 3a = 4a – 6 = 4a + 3a – a – 6 = 4a + 2a – 6 = 6a a = -6/6 a = – 1 Now, we know that d = a which is also equal to – 1. a₁₀₀ = a + 99d Again d = a a₁₀₀ = a + 99a a₁₀₀ = 100a Substituting the value of a, a₁₀₀ = 100 × – 1 a₁₀₀ = – 100 ∴ The value of the 100 term is – 100. ____________________________ Reply
Answer:
The value of the 100 term is – 100.
Step-by-step explanation:
Here we know that a, 2a, b and a-6-b are in arithmetic progression.
First find out the common difference,
Substitute the value of d,
Now,
We know, d = a
Substituting the value of b,
Now, we know that d = a which is also equal to – 1.
Again d = a
Substituting the value of a,
∴ The value of the 100 term is – 100.
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