TS EAMCET · Maths · Sequences and Series
The value of the greatest positive integer k, such that \(49^{\mathrm{k}}+1\) is a factor of \(48\left(49^{125}+49^{124}+\ldots+49^2+49+1\right)\) is
- A \(32\)
- B \(63\)
- C \(65\)
- D \(60\)
Answer & Solution
Correct Answer
(B) \(63\)
Step-by-step Solution
Detailed explanation
The sum \( S = 49^{125}+49^{124}+\ldots+49+1 = \frac{49^{126}-1}{49-1} = \frac{49^{126}-1}{48} \). The given expression is \( 48S = 48 \times \frac{49^{126}-1}{48} = 49^{126}-1 \). For \( (x^k+1) \) to be a factor of \( (x^N-1) \), it is required that \( k \) divides \( N \) and…
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