Multiply the following. One has been done for you.
1) 7,344 x 81 = 594,864
2) 5,807 x 87 =
3) 8,725 x 38 =
4) 5,069 x 27 =
5) 9,186 x 79 =
6) 4,477 x 68 =
Answer (2)
To multiply large numbers, you can use the standard algorithm for multiplication. Let's go through the process step-by-step for each problem.
Calculate 5,807 x 87
5807 × 87 = 505 , 209
This result is obtained by firstly multiplying 5807 by 7, then multiplying 5807 by 80, and finally adding these two products together.
Calculate 8,725 x 38
8725 × 38 = 331 , 550
Multiply 8725 by 8, then by 30, and sum up the products.
Calculate 5,069 x 27
5069 × 27 = 136 , 863
First, multiply 5069 by 7, then by 20, and sum up the resulting products.
Calculate 9,186 x 79
9186 × 79 = 725 , 694
Multiply 9186 by 9, and by 70, and then add those two numbers to get the total.
Calculate 4,477 x 68
4477 × 68 = 304 , 436
Start by multiplying 4477 by 8, then by 60, and add up the results to find the answer.
This method ensures that you systematically calculate the product and keep your work organized, which is especially helpful with large numbers. Each step of the multiplication is broken down to make the process simpler and easier to follow.
The products for the multiplications are: 5,807 x 87 = 504,609, 8,725 x 38 = 331,550, 5,069 x 27 = 136,863, 9,186 x 79 = 725,694, and 4,477 x 68 = 304,436. Each multiplication can be broken down into simpler parts to ensure accuracy. By following the standard multiplication algorithm, one can easily manage large numbers.
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