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To determine which points are solutions to the system of inequalities, we can substitute the x and y values into the original inequalities and see if they are true.

For the first inequality, y < 3x + 7:
- Substitute (1,10):
10 < 3(1) + 7
10 < 3 + 7
10 < 10

This is not true, so (1,10) is not a solution.

- Substitute (2,1):
1 < 3(2) + 7
1 < 6 + 7
1 < 13

This is true, so (2,1) is a solution.

- Substitute (4,3):
3 < 3(4) + 7
3 < 12 + 7
3 < 19

This is true, so (4,3) is a solution.

- Substitute (0,1):
1 < 3(0) + 7
1 < 0 + 7
1 < 7

This is true, so (0,1) is a solution.

- Substitute (-1,9):
9 < 3(-1) + 7
9 < -3 + 7
9 < 4

This is not true, so (-1,9) is not a solution.

- Substitute (1,3):
3 < 3(1) + 7
3 < 3 + 7
3 < 10

This is true, so (1,3) is a solution.

- Substitute (-2,1):
1 < 3(-2) + 7
1 < -6 + 7
1 < 1

This is not true, so (-2,1) is not a solution.

- Substitute (6,4):
4 < 3(6) + 7
4 < 18 + 7
4 < 25

This is true, so (6,4) is a solution.

Next, let's check the second inequality, y ≥ -2x + 5:

- Substitute (1,10):
10 ≥ -2(1) + 5
10 ≥ -2 + 5
10 ≥ 3

This is true, so (1,10) is a solution.

- Substitute (2,1):
1 ≥ -2(2) + 5
1 ≥ -4 + 5
1 ≥ 1

This is true, so (2,1) is a solution.

- Substitute (4,3):
3 ≥ -2(4) + 5
3 ≥ -8 + 5
3 ≥ -3

This is true, so (4,3) is a solution.

- Substitute (0,1):
1 ≥ -2(0) + 5
1 ≥ 0 + 5
1 ≥ 5

This is true, so (0,1) is a solution.

- Substitute (-1,9):
9 ≥ -2(-1) + 5
9 ≥ 2 + 5
9 ≥ 7

This is true, so (-1,9) is a solution.

- Substitute (1,3):
3 ≥ -2(1) + 5
3 ≥ -2 + 5
3 ≥ 3

This is true, so (1,3) is a solution.

- Substitute (-2,1):
1 ≥ -2(-2) + 5
1 ≥ 4 + 5
1 ≥ 9

This is not true, so (-2,1) is not a solution.

- Substitute (6,4):
4 ≥ -2(6) + 5
4 ≥ -12 + 5
4 ≥ -7

This is true, so (6,4) is a solution.

Based on these results, the points that are solutions to the system of inequalities are:

B) (2,1)
C) (4,3)
D) (0,1)
H) (6,4)