My Math work instructions is place the numbers from least to greatest.
7 squared, 2, 8/2 squared = 2, seven squared, and 8/2 squared.
10 squared, pi, 3.5 = pi, 3.16, 3.5.
220 squared, -10, 100 squared, 11.5 =
-10, 220 squared, 100 squared, 11.5.
8 squared, -3.75, 3, 9/4 =
-3.75, 9/4, 3, 8 squared.
Online "^" is used to indicate an exponent, e.g., x^2 = x squared.
1. No. (8/2)^2 = 4^2
2. No, where is 10^2 = 100?
3. No. 220^2 > 100^2 > 11.5
4. Right
To arrange the numbers from least to greatest, you need to compare their values and order them accordingly. Here's how you can do it step by step:
1. Start by comparing the values of the numbers. In the first set, we have 7 squared (7^2), 2, and (8/2)^2.
- 7 squared = 49
- 2
- (8/2)^2 = 16
2. Next, you can compare these values and rewrite them from least to greatest.
- 2, 49, 16
So, the correct order is 2, seven squared (49), and (8/2)^2 (16).
3. Now let's move on to the second set: 10 squared (10^2), pi (approximately 3.14), and 3.5.
- 10 squared = 100
- pi = 3.14 (approximately)
- 3.5
4. Rewrite these values in order from least to greatest.
- π (approximately 3.14), 3.5, 100
So, the correct order is π (approximately 3.14), 3.5, and 10 squared (100).
5. In the third set, we have 220 squared (220^2), -10, 100 squared (100^2), and 11.5.
- 220 squared = 48,400
- -10
- 100 squared = 10,000
- 11.5
6. Arrange these values from least to greatest.
- -10, 48,400, 10,000, 11.5
So, the correct order is -10, 220 squared (48,400), 100 squared (10,000), and 11.5.
7. Finally, in the last set, we have 8 squared (8^2), -3.75, 3, and 9/4.
- 8 squared = 64
- -3.75
- 3
- 9/4 = 2.25
8. Organize these values from least to greatest.
- -3.75, 9/4 (2.25), 3, 8 squared (64)
So, the correct order is -3.75, 9/4 (2.25), 3, and 8 squared (64).
By following these steps, you can arrange the numbers from least to greatest by comparing their values and reordering them accordingly.