Advertisements
Advertisements
Question
P is the solution set of 7x – 2 > 4x + 1 and Q is the solution set of 9x – 45 ≥ 5(x – 5); where x ∈ R. Represent:
- P ∩ Q
- P – Q
- P ∩ Q’ on the different number of lines.
Solution
P = {x : 7x – 2 > 4x + 1, x ∈ R}
7x – 2 > 4x + 1
7x – 4x > 1 + 2
3x > 3
x > 1
and
Q = {x : 9x – 45 ≥ 5(x – 5), x ∈ R}
9x – 45 ≥ 5x – 25
9x – 5x ≥ –25 + 45
4x ≥ 20
x ≥ 5
1. P ∩ Q = {x : x ≥ 5, x ∈ R}
2. P – Q = {x : 1 < x < 5, x ∈ R}
3. P ∩ Q' = {x : 1 > x < 5, x ∈ R}
APPEARS IN
RELATED QUESTIONS
Represent the solution of the following inequalities on the real number line:
x + 3 ≤ 2x + 9
Find the set of values of x, satisfying:
`7x + 3 >= 3x - 5` and `x/4 - 5 <= 5/4 -x`, where x ∈ N
Solve the following inequation and represent the solution set on the number line:
`4x - 19 < (3x)/5 - 2 <= (-2)/5 + x, x ∈ R`
Graph the solution set for each inequality:
-3< x <5
Solve the equation and represent the solution set on the number line.
`-3 + x ≤ (8x)/(3)+ 2 ≤ (14)/(3)+ 2x`, where x ∈ I
Solve the following inequalities and represent the solution on a number line:
4 - 2x ≥ 6 - 3x
If x ∈ W, find the solution set of `(3)/(5)x - (2x - 1)/(1) > 1` Also graph the solution set on the number line, if possible.
Find the solution set of the inequation x + 5 < 2 x + 3 ; x ∈ R Graph the solution set on the number line.
The following number line represents:
For the inequations A and B [as given above in part (d)], A ∪ B is:
