Solve for $$ x $$, then represent your solution on a number line and in interval notation where possible: $$ \begin{array}{ll} ext { 1. }-2 \leq 2 x-4

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Solve for $$ x $$, then represent your solution on a number line and in interval notation where possible: $$ \begin{array}{ll} ext { 1. }-2 \leq 2 x-4<2 ; x \in \mathbb{N} & ext { 2. }-2<-x+3<10 ; x \in \mathbb{N}_{0} \ ext { 3. }-4 \leq 8-3 x<11 ; x \in \mathbb{Z} & ext { 4. } 2+3 x>4 x-7 ; x \in \mathbb{R} \ ext { 5. } 6-5 x \geq 4 x-9 ; x \in \mathbb{R} & ext { 6. } \frac{2}{3} x+2>2 ; x \in \mathbb{R} \ ext { 7. Solve for } m: \frac{3}{2}(2 m+3)-\frac{4 m}{3}<2-\frac{8 m-3}{6} ; m \in \mathbb{R}\end{array} $$

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Solve the inequality by following steps: - step0: Solve for $$x$$: $$-4\leq 8-3x$$ - step1: Swap the sides: $$8-3x\geq -4$$ - step2: Move the constant to the right side: $$-3x\geq -4-8$$ - step3: Subtract the numbers: $$-3x\geq -12$$ - step4: Change the signs: $$3x\leq 12$$ - step5: Divide both sides: $$\frac{3x}{3}\leq \frac{12}{3}$$ - step6: Divide the numbers: $$x\leq 4$$ Solve the equation $$ 2 x - 4 < 2 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$2x-4<2$$ - step1: Move the constant to the right side: $$2x<2+4$$ - step2: Add the numbers: $$2x<6$$ - step3: Divide both sides: $$\frac{2x}{2}<\frac{6}{2}$$ - step4: Divide the numbers: $$x<3$$ Solve the equation $$ -2 <= 2 x - 4 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$-2\leq 2x-4$$ - step1: Swap the sides: $$2x-4\geq -2$$ - step2: Move the constant to the right side: $$2x\geq -2+4$$ - step3: Add the numbers: $$2x\geq 2$$ - step4: Divide both sides: $$\frac{2x}{2}\geq \frac{2}{2}$$ - step5: Divide the numbers: $$x\geq 1$$ Solve the equation $$ -2 < -x + 3 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$-2<-x+3$$ - step1: Swap the sides: $$-x+3>-2$$ - step2: Move the constant to the right side: $$-x>-2-3$$ - step3: Subtract the numbers: $$-x>-5$$ - step4: Change the signs: $$x<5$$ Solve the equation $$ (3/2)(2 m + 3) - (4 m / 3) < 2 - (8 m - 3) / 6 $$. Solve the inequality by following steps: - step0: Solve for $$m$$: $$\frac{3}{2}\left(2m+3\right)-\frac{4m}{3}<2-\frac{\left(8m-3\right)}{6}$$ - step1: Remove the parentheses: $$\frac{3}{2}\left(2m+3\right)-\frac{4m}{3}<2-\frac{8m-3}{6}$$ - step2: Multiply the terms: $$3m+\frac{9}{2}-\frac{4m}{3}<2-\frac{8m-3}{6}$$ - step3: Multiply both sides: $$\left(3m+\frac{9}{2}-\frac{4m}{3}\right)\times 2\times 3<\left(2-\frac{8m-3}{6}\right)\times 2\times 3$$ - step4: Multiply the terms: $$18m+27-8m<12-8m+3$$ - step5: Cancel equal terms: $$18m+27<12+3$$ - step6: Simplify: $$18m+27<15$$ - step7: Move the constant to the right side: $$18m<15-27$$ - step8: Subtract the numbers: $$18m<-12$$ - step9: Divide both sides: $$\frac{18m}{18}<\frac{-12}{18}$$ - step10: Divide the numbers: $$m<-\frac{2}{3}$$ Solve the equation $$ -x + 3 < 10 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$-x+3<10$$ - step1: Move the constant to the right side: $$-x<10-3$$ - step2: Subtract the numbers: $$-x<7$$ - step3: Change the signs: $$x>-7$$ Solve the equation $$ 2 + 3 x > 4 x - 7 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$2+3x>4x-7$$ - step1: Move the expression to the left side: $$3x-4x>-7-2$$ - step2: Add and subtract: $$-x>-7-2$$ - step3: Add and subtract: $$-x>-9$$ - step4: Change the signs: $$x<9$$ Solve the equation $$ 8 - 3 x < 11 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$8-3x<11$$ - step1: Move the constant to the right side: $$-3x<11-8$$ - step2: Subtract the numbers: $$-3x<3$$ - step3: Change the signs: $$3x>-3$$ - step4: Divide both sides: $$\frac{3x}{3}>\frac{-3}{3}$$ - step5: Divide the numbers: $$x>-1$$ Solve the equation $$ 6 - 5 x >= 4 x - 9 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$6-5x\geq 4x-9$$ - step1: Move the expression to the left side: $$-5x-4x\geq -9-6$$ - step2: Add and subtract: $$-9x\geq -9-6$$ - step3: Add and subtract: $$-9x\geq -15$$ - step4: Change the signs: $$9x\leq 15$$ - step5: Divide both sides: $$\frac{9x}{9}\leq \frac{15}{9}$$ - step6: Divide the numbers: $$x\leq \frac{5}{3}$$ Solve the equation $$ (2/3) x + 2 > 2 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$\frac{2}{3}x+2>2$$ - step1: Cancel equal terms: $$\frac{2}{3}x>0$$ - step2: Rewrite the expression: $$x>0$$ Let's solve each inequality step by step and represent the solutions. ### 1. Solve $$ -2 \leq 2x - 4 < 2 $$ **Step 1:** Solve $$ -2 \leq 2x - 4 $$ $$ -2 + 4 \leq 2x \implies 2 \leq 2x \implies x \geq 1 $$ **Step 2:** Solve $$ 2x - 4 < 2 $$ $$ 2x < 2 + 4 \implies 2x < 6 \implies x < 3 $$ **Combined Solution:** $$ 1 \leq x < 3 \quad \text{(in interval notation: } [1, 3) \text{)} $$ ### 2. Solve $$ -2 < -x + 3 < 10 $$ **Step 1:** Solve $$ -2 < -x + 3 $$ $$ -2 - 3 < -x \implies -5 < -x \implies x < 5 $$ **Step 2:** Solve $$ -x + 3 < 10 $$ $$ -x < 10 - 3 \implies -x < 7 \implies x > -7 $$ **Combined Solution:** $$ -7 < x < 5 \quad \text{(in interval notation: } (-7, 5) \text{)} $$ ### 3. Solve $$ -4 \leq 8 - 3x < 11 $$ **Step 1:** Solve $$ -4 \leq 8 - 3x $$ $$ -4 - 8 \leq -3x \implies -12 \leq -3x \implies x \leq 4 $$ **Step 2:** Solve $$ 8 - 3x < 11 $$ $$ -3x < 11 - 8 \implies -3x < 3 \implies x > -1 $$ **Combined Solution:** $$ -1 < x \leq 4 \quad \text{(in interval notation: } (-1, 4] \text{)} $$ ### 4. Solve $$ 2 + 3x > 4x - 7 $$ $$ 2 + 3x > 4x - 7 \implies 2 + 7 > 4x - 3x \implies 9 > x \implies x < 9 $$ **Solution:** $$ x < 9 \quad \text{(in interval notation: } (-\infty, 9) \text{)} $$ ### 5. Solve $$ 6 - 5x \geq 4x - 9 $$ $$ 6 + 9 \geq 4x + 5x \implies 15 \geq 9x \implies x \leq \frac{15}{9} \implies x \leq \frac{5}{3} $$ **Solution:** $$ x \leq \frac{5}{3} \quad \text{(in interval notation: } (-\infty, \frac{5}{3}] \text{)} $$ ### 6. Solve $$ \frac{2}{3}x + 2 > 2 $$ $$ \frac{2}{3}x > 2 - 2 \implies \frac{2}{3}x > 0 \implies x > 0 $$ **Solution:** $$ x > 0 \quad \text{(in interval notation: } (0, \infty) \text{)} $$ ### 7. Solve for $$ m $$: $$ \frac{3}{2}(2m + 3) - \frac{4m}{3} < 2 - \frac{8m - 3}{6} $$ **Step 1:** Expand and simplify the inequality. $$ \frac{3}{2}(2m + 3) - \frac{4m}{3} < 2 - \frac{8m - 3}{6} $$ Calculating each term: $$ 3m + \frac{9}{2} - \frac{4m}{3} < 2 - \frac{8m}{6} + \frac{3}{6} $$ Combine like terms and solve for $$ m $$: $$ 3m - \frac{4m}{3} + \frac{8m}{6} < 2 - \frac{3}{6} - \frac{9}{2} $$ After simplification, we find: $$ m < -\frac{2}{3} $$ **Solution:** $$ m < -\frac{2}{3} \quad \text{(in interval notation: } (-\infty, -\frac{2}{3}) \text{)} $$ ### Summary of Solutions 1. $$ [1, 3) $$ 2. $$ (-7, 5) $$ 3. $$ (-1, 4] $$ 4. $$ (-\infty, 9) $$ 5. $$ (-\infty, \frac{5}{3}] $$ 6. $$ (0, \infty) $$ 7. $$ (-\infty, -\frac{2}{3}) $$ ### Number Line Representation - For each interval, you can represent them on a number line with open and closed circles indicating whether the endpoints are included or not. If you need a visual representation of the number line, please let me know! Here are the solutions for each inequality: 1. $$1 \leq x < 3$$ 2. $$-7 < x < 5$$ 3. $$-1 < x \leq 4$$ 4. $$x < 9$$ 5. $$x \leq \frac{5}{3}$$ 6. $$x > 0$$ 7. $$x < -\frac{2}{3}$$ These solutions are also provided in interval notation.

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