Asked by dee

To determine which statements are true, we can evaluate each one individually.

1. **211 < 572:** This statement is true, as 211 is less than 572.

2. **211 < 576:** This statement is also true, as 211 is less than 576.

3. **10 > 49:** This statement is false, as 10 is not greater than 49.

4. **tenths is greater than 4 ninths:** To evaluate this, we can interpret "tenths" as a specific fraction (like 1/10) but without specific value, let's drop this statement as it lacks context. However, if we denote tenths in a specific way, we can evaluate against 4/9.

5. **26 > 782:** This statement is false, as 26 is not greater than 782.

6. **sixths is greater than 7 eighths:** Similar to the previous, we need to ascertain what "sixths" refers to. If we interpret this as 1/6, this statement would not hold true since 1/6 is less than 7/8.

7. **49 > 112:** This statement is false, as 49 is not greater than 112.

8. **4 ninths is greater than 11 over 20:** To evaluate this, we compare 4/9 to 11/20. Calculating their decimal values gives 4/9 ≈ 0.444 and 11/20 = 0.55, so this statement is false.

9. **710 < 512:** This statement is false, as 710 is greater than 512.

Upon reviewing, the true statements are:

- 211 < 572
- 211 < 576

Therefore, the two true statements are:
- 211 < 572
- 211 < 576