Final answer:
To find two decimals that have a product of 8, rounded to their greatest place, you can try different combinations. One possible solution is 2.1 and 3.8.
Step-by-step explanation:
To find two decimals that have a product of 8, rounded to their greatest place, we can start by trying different combinations. Let's try 1.2 and 6.7:
1.2 rounded to its greatest place is 1, and 6.7 rounded to its greatest place is 7. The product of these two numbers is 1 * 7 = 7, not 8.
Another combination we can try is 2.1 and 3.8:
2.1 rounded to its greatest place is 2, and 3.8 rounded to its greatest place is 4. The product of these two numbers is 2 * 4 = 8.
Therefore, two possible factors that have a product of 8, rounded to their greatest place, are 2.1 and 3.8.