Find the product of each of the following by suitable rearrangement:
`25xx263xx8`

To find the product of 25, 263, and 8 by suitable rearrangement, we can follow these steps: ### Step 1: Rearrange the Multiplication We can rearrange the multiplication using the commutative property. This property states that the order of multiplication does not change the product. So, we can group 25 and 8 together first: \[ (25 \times 8) \times 263 \] ### Step 2: Calculate \( 25 \times 8 \) Now, we will multiply 25 by 8: \[ 25 \times 8 = 200 \] ### Step 3: Multiply the Result with 263 Next, we take the result from the previous step (200) and multiply it by 263: \[ 200 \times 263 \] ### Step 4: Calculate \( 200 \times 263 \) To calculate \( 200 \times 263 \), we can break it down: \[ 200 \times 263 = 200 \times (200 + 63) = 200 \times 200 + 200 \times 63 \] Calculating each part: - \( 200 \times 200 = 40000 \) - \( 200 \times 63 = 12600 \) Now, add these two results together: \[ 40000 + 12600 = 52600 \] ### Final Answer Thus, the product of \( 25 \times 263 \times 8 \) is: \[ \text{Final Product} = 52600 \] ---