Is the number $52563744$ divisible by $24$?
Aptitude
Number System
Difficulty: Medium
Choose an option
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AYes, because it is divisible by both 3 and 8
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BNo, because it is not divisible by 8
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CNo, because it is not divisible by 3
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DYes, because it is divisible by both 4 and 6
Answer
Correct Answer: Yes, because it is divisible by both 3 and 8
Explanation
### Concept & Logic
To check the divisibility of a large number by a composite number (like $24$), break the divisor into co-prime factors. Two numbers are co-prime if their highest common factor (HCF) is $1$.
$$ 24 = 3 \times 8 $$
### Step-by-Step Solution
**Given:**
The number is $52563744$. We need to verify its divisibility by $24$.
**Calculation:**
Step 1: Verify divisibility by $3$.
Sum of digits = $5 + 2 + 5 + 6 + 3 + 7 + 4 + 4 = 36$.
Since $36$ is divisible by $3$, the number is divisible by $3$.
Step 2: Verify divisibility by $8$.
Check the last three digits: $744$.
$744 / 8 = 93$.
Since $744$ is divisible by $8$, the entire number is divisible by $8$.
Step 3: Conclusion.
Since $52563744$ is divisible by both $3$ and $8$ (which are co-prime), it is divisible by their product, $24$.
### Exam Strategy & Shortcut
Always select co-prime pairs for this rule. Once established, use the digital sum rule for $3$ (crossing out $3$s, $6$s, and $9$s to speed it up) and the last-three-digits rule for $8$.
### Common Pitfall
The most dangerous trap is splitting $24$ into factors that are not co-prime, such as $4$ and $6$. A number can be divisible by both $4$ and $6$ but not divisible by $24$ (for example, $12$). Factors must have an HCF of $1$.
### Final Answer
Therefore, the correct answer is **Yes, because it is divisible by both 3 and 8**.