COMEDK · Maths · 6. Mathematical Induction
If \(49^n+16^n+k\) is divisible by 64 for \(n \in N\), then the least negative integral value of \(k\) is
- A -1
- B -2
- C -3
- D -4
Answer & Solution
Correct Answer
(A) -1
Step-by-step Solution
Detailed explanation
Let \(P(n)=49^n+16^n+k\) For \(n=1\), we get \(P(1)=49^{(1)}+16^{(1)}+k=65+k\) As \(P(1)\) is divisible by 64 , we take \(k=-1\) \(P(1)=65-1=64\), which is divisible by 64 . Thus, the least negative integral value of \(k\) be -1 .
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