\(\frac{11}{2^6\cdot 5^2}\) को \(\frac{N}{10^6}\) के रूप में लिखने पर (N) क्या होगा?
If \(\frac{11}{2^6\cdot 5^2}\) is written as \(\frac{N}{10^6}\), what is (N)?
Explanation opens after your attempt
Correct Answer
B. (1375)
Concept
Since \(10^6=2^6\cdot 5^6\), the denominator lacks \(5^4\). Thus \(N=11\cdot 5^4=6875\), so the correct option is (6875).
Why this answer is correct
The correct answer is B. (1375). Since \(10^6=2^6\cdot 5^6\), the denominator lacks \(5^4\). Thus \(N=11\cdot 5^4=6875\), so the correct option is (6875).
Exam Tip
\(10^6=2^6\cdot 5^6\), इसलिए हर में \(5^4\) की कमी है। \(N=11\cdot 5^4=6875\), इसलिए सही विकल्प (6875) है।
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