Advertisements
Advertisements
प्रश्न
Solve each of the following system of equations in R.
2x + 5 ≤ 0, x − 3 ≤ 0
उत्तर
\[\text{ We have }, 2x + 5 \leq 0\]
\[ \Rightarrow 2x \leq - 5\]
\[ \Rightarrow x \leq \frac{- 5}{2}\]
\[ \Rightarrow x \in ( - \infty , \frac{- 5}{2}] . . . (i)\]
\[\text{ Also }, x - 3 \leq 0\]
\[ \Rightarrow x \leq 3\]
\[ \Rightarrow x \in ( - \infty , 3] . . . (ii)\]
\[\text{ Thus, the solution of the given set of inequalities is the intersection of } (i) \text{ and } (ii) . \]
\[( - \infty , \frac{- 5}{2}] \cap ( - \infty , 3] = ( - \infty , \frac{- 5}{2}]\]
\[\text{ Thus, the solution of the given set of inequalities is } ( - \infty , \frac{- 5}{2}] . \]
\[\]
APPEARS IN
संबंधित प्रश्न
Solve: 12x < 50, when x ∈ R
x + 5 > 4x − 10
\[\frac{3x - 2}{5} \leq \frac{4x - 3}{2}\]
\[\frac{2x + 3}{4} - 3 < \frac{x - 4}{3} - 2\]
\[\frac{4 + 2x}{3} \geq \frac{x}{2} - 3\]
\[\frac{2x + 3}{5} - 2 < \frac{3\left( x - 2 \right)}{5}\]
\[\frac{1}{x - 1} \leq 2\]
\[\frac{5x + 8}{4 - x} < 2\]
Solve each of the following system of equations in R.
1. x + 3 > 0, 2x < 14
Solve each of the following system of equations in R.
2x − 3 < 7, 2x > −4
Solve each of the following system of equations in R.
11 − 5x > −4, 4x + 13 ≤ −11
Solve each of the following system of equations in R.
4x − 1 ≤ 0, 3 − 4x < 0
Solve each of the following system of equations in R.
\[0 < \frac{- x}{2} < 3\]
Solve each of the following system of equations in R.
10 ≤ −5 (x − 2) < 20
Solve each of the following system of equations in R.
20. −5 < 2x − 3 < 5
Solve each of the following system of equations in R. \[\frac{4}{x + 1} \leq 3 \leq \frac{6}{x + 1}, x > 0\]
Solve
\[\left| x + \frac{1}{3} \right| > \frac{8}{3}\]
Solve \[\left| x + 1 \right| + \left| x \right| > 3\]
Solve \[1 \leq \left| x - 2 \right| \leq 3\]
Solve \[\left| 3 - 4x \right| \geq 9\]
Mark the correct alternative in each of the following:
Given that x, y and b are real numbers and x\[<\]y, b\[>\]0, then
Mark the correct alternative in each of the following:
The linear inequality representing the solution set given in 
Mark the correct alternative in each of the following:
If \[\frac{\left| x - 2 \right|}{x - 2}\]\[\geq\] then
Mark the correct alternative in each of the following:
If \[\left| x + 3 \right|\]\[\geq\]10, then
Solve the inequality, 3x – 5 < x + 7, when x is a whole number.
Solve 1 ≤ |x – 2| ≤ 3.
Solve for x, |x + 1| + |x| > 3.
Solve for x, `(|x + 3| + x)/(x + 2) > 1`.
If `|x - 2|/(x - 2) ≥ 0`, then ______.
The length of a rectangle is three times the breadth. If the minimum perimeter of the rectangle is 160 cm, then ______.
If |x + 3| ≥ 10, then ______.
If `1/(x - 2) < 0`, then x ______ 2.
If p > 0 and q < 0, then p + q ______ p.
Solve for x, the inequality given below.
|x − 1| ≤ 5, |x| ≥ 2
If x < 5, then ______.
If x is a real number and |x| < 3, then ______.
x and b are real numbers. If b > 0 and |x| > b, then ______.
If |x + 2| ≤ 9, then ______.
