Answer:

1. The nearest perfect square in 12 is 9.

√9 = 3

Therefore, 3 and 4 are the two integers wherein √12 lie.

2. The nearest perfect square in 62 is 49.

√49 = 7

Therefore, 7 and 8 are the two integers wherein √62 lie.

3. The nearest perfect square in 3 is 1.

√1 = 1

Therefore, 1 and 1 are the two integers wherein √3 lie.

4. The nearest perfect square in 33 is 25.

√25 = 5

Therefore, 5 and 6 are the two integers wherein √33 lie.

5. The nearest perfect square in 105 is 100.

√100 = 10

Therefore, 10 and 11 are the two integers wherein √105 lie.

6. The nearest perfect square in 74 is 64.

√64 = 8

Therefore, 8 and 9 are the two integers wherein √74 lie.

7. The nearest perfect square in 168 is 144.

√144 = 12

Therefore, 12 and 13 are the two integers wherein √168 lie.

8. The nearest perfect square in 39 is 36.

√36 = 6

Therefore, 6 and 7 are the two integers wherein √39 lie.

9. The nearest perfect square in 85 is 81.

√81 = 9

Therefore, 9 and 10 are the two integers wherein √85 lie.

10. The nearest perfect square in 24 is 16.

√16 = 4

Therefore, 4 and 5 are the two integers wherein √24 lie.