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प्रश्न
Find the greatest number that will divide 43, 91 and 183 so as to leave the same remainder in each case.
संख्यात्मक
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उत्तर
Given: 43, 91 and 183.
Step-wise calculation:
1. If a number d leaves the same remainder r when dividing 43, 91 and 183, then d divides the pairwise differences 91 – 43, 183 – 91 and 183 – 43.
Hence, d = HCF(91 – 43, 183 – 91, 183 – 43).
2. Compute the differences:
91 – 43 = 48
183 – 91 = 92
183 – 43 = 140
3. So, d = HCF(48, 92, 140).
4. Find HCF(48, 92):
92 = 48 × 1 + 44
48 = 44 × 1 + 4
44 = 4 × 11 + 0
⇒ HCF(48, 92) = 4.
5. Now HCF(4, 140):
140 is divisible by 4
⇒ HCF = 4
6. Check remainder:
43 = 4 × 10 + 3
91 = 4 × 22 + 3
183 = 4 × 45 + 3
So, the common remainder is 3.
The greatest number is 4 (common remainder 3).
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