यदि \(\frac{29}{2^a5^b}\) का दशमलव ठीक (8) स्थानों पर समाप्त होता है और (a>b) है तो (a) का मान क्या होगा?
If \(\frac{29}{2^a5^b}\) terminates exactly after (8) decimal places and (a>b), what is the value of (a)?
Explanation opens after your attempt
C. (8)
Concept
When (a>b), the larger exponent is (a). For exactly (8) decimal places, (a=8).
Why this answer is correct
The correct answer is C. (8). When (a>b), the larger exponent is (a). For exactly (8) decimal places, (a=8).
Exam Tip
जब (a>b) है तो बड़ी घात (a) होगी। ठीक (8) दशमलव स्थानों के लिए (a=8) होना चाहिए।
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