To solve for \( X \) in the equation \( 64 \times 42 \times 48 \times X = 360 \), we can first calculate the product of the three known numbers and then solve for \( X \).
First, calculate \( 64 \times 42 \times 48 \):
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Calculate \( 64 \times 42 \): \[ 64 \times 42 = 2688 \]
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Now, multiply this result by \( 48 \): \[ 2688 \times 48 = 128256 \]
Now we have the equation: \[ 128256 \times X = 360 \]
To isolate \( X \), divide both sides by \( 128256 \): \[ X = \frac{360}{128256} \]
Now, simplify \( \frac{360}{128256} \):
- Calculate the value of \( \frac{360}{128256} \): \[ X \approx 0.0028 \]
So, the solution for \( X \) is approximately: \[ X \approx 0.0028 \]