Advertisements
Advertisements
Question
Solve the inequation and represent the solution set on the number line. `-3 + x ≤ (8x)/(3) + 2 ≤ (14)/(3) + 2x, "Where" x ∈ "I"`
Solution
Given: `-3 + x ≤ (8x)/(3) + 2 ≤ (14)/(3) + 2x, "Where" x ∈ "I"`
(i) `-3 + x ≤ (8x)/(3) + 2`
`-3 - 2 ≤ (8x)/(3) - x`
⇒ `-5 ≤ (5x)/(3)`
⇒ `-1 ≤ x/(3)`
–3 ≤ x ....(i)
and
`(8x)/(3) - 2x ≤ (14)/(3)`
⇒ `(2x)/(3) ≤ (8)/(3)`
⇒ x ≤ 4 ....(ii)
From (i) and (ii),
⇒ `-5 ≤ (5x)/(3) and (2x)/(3) ≤ (8)/(3)`
⇒ x ≥ –3 and x ≤ 4
∴ –3 ≤ x ≤ 4
Solution set = {–3, -2, –1, 0, 1, 2, 3, 4}
Solution set on number line
APPEARS IN
RELATED QUESTIONS
If P = {x : 7x - 2 > 4x + 1, x ∈ R} and Q = {x : 9x - 45 ≥ 5 (x -5),x ∈ R} , represent the following solution set on different number lines:
P ∩ Q'
Solve: `(2x - 3)/(4) ≥ (1)/(2)`, x ∈ {0, 1, 2,…,8}
List the solution set of the inequation `(1)/(2) + 8x > 5x -(3)/(2)`, x ∈ Z
List the solution set of `(11 - 2x)/(5) ≥ (9 - 3x)/(8) + (3)/(4)`, x ∈ N
`x/(2) + 5 ≤ x/(3) + 6` where x is a positive odd integer.
`(2x + 3)/(3) ≥ (3x - 1)/(4)` where x is positive even integer.
If x ∈ { – 3, – 1, 0, 1, 3, 5}, then the solution set of the inequation 3x – 2 ≤ 8 is
If x∈R, solve `2x - 3 ≥ x + (1 - x)/(3) > (2)/(5)x`
Given, `x + 2 ≤ x/3 + 3` and x is a prime number. The solution set for x is ______.
For 7 – 3x < x – 5, the solution is ______.
