B. Resuelve y representa de manera gráfica: $$ \begin{array}{llll} ext { 1. }|x+2|2 \ ext { 3. }|x+7|

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B. Resuelve y representa de manera gráfica: $$ \begin{array}{llll} ext { 1. }|x+2|<3 & ext { 4. }|x-1|<\frac{1}{2} & ext { 7. }|1-x| \leq \sqrt{3} & ext { 10. }|x|>7 \ ext { 2. }|x-5| \leq 5 & ext { 5. }|x+0,45| \leq 3,45 & ext { 8. }|3-x| \leq \frac{8}{5} & ext { 11. }|x+1|>2 \ ext { 3. }|x+7|<\sqrt{2} & ext { 6. }\left|x-\frac{1}{2} ight|<\frac{4}{3} & ext { 9. }|x| \geq 5 & ext { 12. }|x-1| \geq \frac{1}{2}\end{array} $$

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Solve the inequality by following steps: - step0: Solve for $$x$$: $$\left|x+1\right|>2$$ - step1: Separate into possible cases: $$\begin{align}&x+1>2\&x+1<-2\end{align}$$ - step2: Solve the inequality: $$\begin{align}&x>1\&x<-3\end{align}$$ - step3: Find the union: $$x \in \left(-\infty,-3\right)\cup \left(1,+\infty\right)$$ Solve the equation $$ |x+0.45| \leq 3.45 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$\left|x+0.45\right|\leq 3.45$$ - step1: Simplify: $$\frac{1}{20}\left|20x+9\right|\leq 3.45$$ - step2: Rewrite the expression: $$\frac{\left|20x+9\right|}{20}\leq 3.45$$ - step3: Multiply both sides: $$\left|20x+9\right|\leq 69$$ - step4: Separate into possible cases: $$\left\{ \begin{array}{l}20x+9\leq 69\20x+9\geq -69\end{array}\right.$$ - step5: Solve the inequality: $$\left\{ \begin{array}{l}x\leq 3\x\geq -\frac{39}{10}\end{array}\right.$$ - step6: Find the intersection: $$-\frac{39}{10}\leq x\leq 3$$ Solve the equation $$ |1-x| \leq \sqrt{3} $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$\left|1-x\right|\leq \sqrt{3}$$ - step1: Separate into possible cases: $$\left\{ \begin{array}{l}1-x\leq \sqrt{3}\1-x\geq -\sqrt{3}\end{array}\right.$$ - step2: Solve the inequality: $$\left\{ \begin{array}{l}x\geq -\sqrt{3}+1\x\leq \sqrt{3}+1\end{array}\right.$$ - step3: Find the intersection: $$-\sqrt{3}+1\leq x\leq \sqrt{3}+1$$ Solve the equation $$ |x+7|<\sqrt{2} $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$\left|x+7\right|<\sqrt{2}$$ - step1: Separate into possible cases: $$\left\{ \begin{array}{l}x+7<\sqrt{2}\x+7>-\sqrt{2}\end{array}\right.$$ - step2: Solve the inequality: $$\left\{ \begin{array}{l}x<\sqrt{2}-7\x>-\sqrt{2}-7\end{array}\right.$$ - step3: Find the intersection: $$-\sqrt{2}-7-3\end{array}\right.$$ - step2: Solve the inequality: $$\left\{ \begin{array}{l}x<1\x>-5\end{array}\right.$$ - step3: Find the intersection: $$-5-3\end{array}\right.$$ - step2: Solve the inequality: $$\left\{ \begin{array}{l}x<1\x>-5\end{array}\right.$$ - step3: Find the intersection: $$-57 $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$\left|x\right|>7$$ - step1: Separate into possible cases: $$\begin{align}&x>7\&x<-7\end{align}$$ - step2: Find the union: $$x \in \left(-\infty,-7\right)\cup \left(7,+\infty\right)$$ Solve the equation $$ |3-x| \leq \frac{8}{5} $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$\left|3-x\right|\leq \frac{8}{5}$$ - step1: Separate into possible cases: $$\left\{ \begin{array}{l}3-x\leq \frac{8}{5}\3-x\geq -\frac{8}{5}\end{array}\right.$$ - step2: Solve the inequality: $$\left\{ \begin{array}{l}x\geq \frac{7}{5}\x\leq \frac{23}{5}\end{array}\right.$$ - step3: Find the intersection: $$\frac{7}{5}\leq x\leq \frac{23}{5}$$ Solve the equation $$ |x-1|<\frac{1}{2} $$. Solve the inequality by following steps: - step0: Solve for $$x$$: $$\left|x-1\right|<\frac{1}{2}$$ - step1: Separate into possible cases: $$\left\{ \begin{array}{l}x-1<\frac{1}{2}\x-1>-\frac{1}{2}\end{array}\right.$$ - step2: Solve the inequality: $$\left\{ \begin{array}{l}x<\frac{3}{2}\x>\frac{1}{2}\end{array}\right.$$ - step3: Find the intersection: $$\frac{1}{2} 7 $$** Solución: $$x \in (-\infty, -7) \cup (7, +\infty)$$ Gráfica: $$ \text{Intervalo: } (-\infty, -7) \cup (7, +\infty) $$ 7. **$$ |x| \geq 5 $$** Solución: $$x \in (-\infty, -5] \cup [5, +\infty)$$ Gráfica: $$ \text{Intervalo: } (-\infty, -5] \cup [5, +\infty) $$ 8. **$$ |x+0.45| \leq 3.45 $$** Solución: $$-\frac{39}{10} \leq x \leq 3$$ Gráfica: $$ \text{Intervalo: } \left[-\frac{39}{10}, 3\right] $$ 9. **$$ |3-x| \leq \frac{8}{5} $$** Solución: $$\frac{7}{5} \leq x \leq \frac{23}{5}$$ Gráfica: $$ \text{Intervalo: } \left[\frac{7}{5}, \frac{23}{5}\right] $$ 10. **$$ |x-1| \geq \frac{1}{2} $$** Solución: $$x \in (-\infty, \frac{1}{2}] \cup [\frac{3}{2}, +\infty)$$ Gráfica: $$ \text{Intervalo: } (-\infty, \frac{1}{2}] \cup [\frac{3}{2}, +\infty) $$ 11. **$$ |x+1| > 2 $$** Solución: $$x \in (-\infty, -3) \cup (1, +\infty)$$ Gráfica: $$ \text{Intervalo: } (-\infty, -3) \cup (1, +\infty) $$ Cada una de estas soluciones representa un intervalo en la recta numérica, donde se puede visualizar la solución de la desigualdad correspondiente. Aquí están las soluciones para cada desigualdad: 1. $$ |x+2| < 3 $$: $$-5 < x < 1$$ 2. $$ |x-5| \leq 5 $$: $$0 \leq x \leq 10$$ 3. $$ |x+7| < \sqrt{2} $$: $$-\sqrt{2}-7 < x < \sqrt{2}-7$$ 4. $$ |x-1| < \frac{1}{2} $$: $$\frac{1}{2} < x < \frac{3}{2}$$ 5. $$ |1-x| \leq \sqrt{3} $$: $$-\sqrt{3}+1 \leq x \leq \sqrt{3}+1$$ 6. $$ |x| > 7 $$: $$x < -7$$ o $$x > 7$$ 7. $$ |x| \geq 5 $$: $$x \leq -5$$ o $$x \geq 5$$ 8. $$ |x+0.45| \leq 3.45 $$: $$-3.9 \leq x \leq 3$$ 9. $$ |3-x| \leq \frac{8}{5} $$: $$\frac{7}{5} \leq x \leq \frac{23}{5}$$ 10. $$ |x-1| \geq \frac{1}{2} $$: $$x \leq \frac{1}{2}$$ o $$x \geq \frac{3}{2}$$ 11. $$ |x+1| > 2 $$: $$x < -3$$ o $$x > 1$$ Estas soluciones representan los intervalos en los que cada desigualdad se cumple.

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