Ravi obtained 70 and 75 marks in first two unit test. Find the minimum marks he
should get in the third test to have an average of at least 60 marks
Solve the inequalities and show the graph of the solution in each
case on number line
17. 3x – 2 < 2x + 1 18. 5x – 3 > 3x – 5
19. 3 (1 – x) < 2 (x + 4) 20.
(5 – 2) (7 –3)
–
2 3 5
Solve the inequalities for real x
13. 2 (2x + 3) – 10 < 6 (x – 2) 14. 37 – (3x + 5) > 9x – 8 (x – 3)
15.
(5 2) (7 3)
4 3 5
x x x − −
< − 16.
(2 1) (3 2) (2 )
3 4 5
Solve the inequalities for real x
5. 4x + 3 < 5x + 7 6. 3x – 7 > 5x – 1
7. 3(x – 1) ≤ 2 (x – 3) 8. 3 (2 – x) ≥ 2 (1 – x)
9. 11
2 3
x x
x + + < 10. 1
3 2
x x
> +
11.
3( 2) 5(2 )
5 3
x − − x
≤ 12.
1 3 1 4 ( 6)
2 5 3
x
x
+ ≥ −
Find all pairs of consecutive odd natural numbers, both of which are larger
than 10, such that their sum is less than 40
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