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प्रश्न
Solve : 5 – 4x > 2 – 3x, x ∈ W. Also represent its solution on the number line.
उत्तर
5 – 4x > 2 – 3x
– 4x + 3x > 2 – 5
⇒ – x > – 3
⇒ x < 3
x ∈ w,
solution set {0, 1, 2}
Solution set on Number Line :
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संबंधित प्रश्न
Given A = {x : –1 < x ≤ 5, x ∈ R} and B = {x : – 4 ≤ x < 3, x ∈ R}
Represent on different number lines:
A' ∩ B
Given that x ∈ I. solve the inequation and graph the solution on the number line:
`3 >= (x - 4)/2 + x/3 >= 2`
Solve the following linear in-equation and graph the solution set on a real number line :
`4 3/4 >= "x" + 5/6 > 1/3` , x ∈ R
Solve the following in equation, write the solution set and represent it on the number line:
`-"x"/3≤ "x"/2 -1 1/3<1/6, "x" in "R"`
Graph the solution set for each inequality:
5 ≤ x < 10
Find the values of x, which satisfy the inequation
`-2(5)/(6) <(1)/(2) - (2x)/(3) ≤ 2, x ∈ "W"`. Graph the solution set on the number line.
Solve the inequation = 12 + `1(5)/(6)` ≤ 5 + 3x, x ∈ R. Represent the solution on a number line.
Solve 2 ≤ 2x – 3 ≤ 5, x ∈ R and mark it on number line.
Solve the following inequation and represent the solution set on the number line : `4x - 19 < (3x)/(5) - 2 ≤ -(2)/(5) + x, x ∈ "R"`
For the inequations A and B [as given above in part (d)], A ∪ B is:
