\frac362880024 \cdot 120 \cdot 1 = \frac36288002880 = 1260 - Abu Waleed Tea
Breaking Down the Calculation: How 3628800 ÷ (24 × 120 × 1) Equals 1260
Breaking Down the Calculation: How 3628800 ÷ (24 × 120 × 1) Equals 1260
If you’ve come across the mathematical expression:
\[
\frac{3628800}{24 \cdot 120 \cdot 1} = 1260
\]
Understanding the Context
you’re not just looking at numbers — you’re decoding a clean, logical breakdown that reveals how division simplifies complex expressions. In this article, we’ll explore step-by-step how this division works and why the result is 1260.
Understanding the Components
Let’s examine the components in the denominator first:
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Key Insights
\[
24 \cdot 120 \cdot 1
\]
Multiplying these values gives:
\[
24 \ imes 120 = 2880
\]
So the full expression becomes:
\[
\frac{3628800}{2880}
\]
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Simplifying the Division
Now evaluate:
\[
3628800 \div 2880
\]
To simplify this, look for common factors or perform direct division.
Breaking it down:
- 3628800 is a well-known factorial: \(9! = 9 \ imes 8 \ imes 7 \ imes 6 \ imes 5 \ imes 4 \ imes 3 \ imes 2 \ imes 1 = 362880\), but wait — actually, \(10! = 3628800\), so \(3628800 = 10!\).
- \(2880 = 24 \ imes 120\), as we calculated:
\(24 = 8 \ imes 3\),
\(120 = 8 \ imes 15 = 8 \ imes (5 \ imes 3)\),
so \(2880 = 2^5 \ imes 3^2 \ imes 5 = 2^5 \cdot 3^2 \cdot 5\)
But rather than factorization, performing direct division clarifies the result:
\[
3628800 \div 2880 = ?
\]
We can rewrite the division as:
