Three containers hold mixtures measured as 403 kg, 434 kg, and 465 kg. Find the greatest measuring capacity (in kg) that can exactly measure each quantity.
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A1 kg
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B7 kg
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C31 kg
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D41 kg
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E13 kg
Answer
Correct Answer: 31 kg
Explanation
Introduction / Context:This is a highest common factor (HCF) or greatest common divisor (GCD) question. The largest measure that fits exactly into each total is the GCD of the three weights.
Given Data / Assumptions:
- Quantities: 403 kg, 434 kg, 465 kg
- We seek the greatest capacity dividing all three exactly
Concept / Approach:Compute the GCD via prime factorization. The common prime factors with the smallest exponents across all numbers define the GCD.
Step-by-Step Solution:403 = 13 * 31434 = 2 * 217 = 2 * 7 * 31465 = 5 * 93 = 5 * 3 * 31Common factor across all three = 31 ⇒ GCD = 31 kg.
Verification / Alternative check:403/31 = 13, 434/31 = 14, 465/31 = 15, all integers; hence 31 kg measures each exactly.
Why Other Options Are Wrong:1 kg is trivial but not the greatest. 7 kg and 13 kg do not divide all three. 41 kg divides none of them exactly.
Common Pitfalls:Arithmetic mistakes in factorization; stopping at a smaller common factor and missing the larger prime 31.
Final Answer:31 kg