\begin{tabular}{l|l}$$ \frac{x+2}{x+1} $$ & 2. Solve tho following equations \ a. $$ \frac{x}{4}-\frac{x}{3}=2 $$ \ b. $$ x+\frac{x+5}{3}=7 $$ \ c. $$ \frac{m+2}{4}-\frac{m-6}{3}=\frac{1}{2} $$ \ 3. Solve each of the following \ a. $$ (3 x-1)(x+2)=0 $$ \ b $$ \left(3 x^{2}-1 ight)(x+2)=10 $$ \ c. $$ 2 x^{2}-4 x $$ \ d. $$ 5 x^{2}+2 x^{2}=3 $$ \ e. $$ 3 x^{2}=48 $$ \ f $$ x^{2}=9 $$ \ $$ 9 . ~ $$ & $$ 9 x^{2}=x $$ \ h. $$ 2 x^{2}-x=10 $$ \ i. $$ 3 x^{2}-5 x-2=0 $$\end{tabular}

Question

\begin{tabular}{l|l}$$ \frac{x+2}{x+1} $$ & 2. Solve tho following equations \ a. $$ \frac{x}{4}-\frac{x}{3}=2 $$ \ b. $$ x+\frac{x+5}{3}=7 $$ \ c. $$ \frac{m+2}{4}-\frac{m-6}{3}=\frac{1}{2} $$ \ 3. Solve each of the following \ a. $$ (3 x-1)(x+2)=0 $$ \ b $$ \left(3 x^{2}-1ight)(x+2)=10 $$ \ c. $$ 2 x^{2}-4 x $$ \ d. $$ 5 x^{2}+2 x^{2}=3 $$ \ e. $$ 3 x^{2}=48 $$ \ f $$ x^{2}=9 $$ \ $$ 9 . ~ $$ & $$ 9 x^{2}=x $$ \ h. $$ 2 x^{2}-x=10 $$ \ i. $$ 3 x^{2}-5 x-2=0 $$\end{tabular}

UpStudy AI · Accepted Answer

Solve the quadratic equation by following steps:
- step0: Solve by factoring:
  $$2x^{2}-4x=0$$
- step1: Factor the expression:
  $$2x\left(x-2\right)=0$$
- step2: Separate into possible cases:
  $$\begin{align}&x-2=0\&2x=0\end{align}$$
- step3: Solve the equation:
  $$\begin{align}&x=2\&x=0\end{align}$$
- step4: Rewrite:
  $$x_{1}=0,x_{2}=2$$
Solve the equation $$ x^{2}=9 $$.
Solve the quadratic equation by following steps:
- step0: Solve using square roots:
  $$x^{2}=9$$
- step1: Simplify the expression:
  $$x=\pm \sqrt{9}$$
- step2: Simplify the expression:
  $$x=\pm 3$$
- step3: Separate into possible cases:
  $$\begin{align}&x=3\&x=-3\end{align}$$
- step4: Rewrite:
  $$x_{1}=-3,x_{2}=3$$
Solve the equation $$ 3 x^{2}-5 x-2=0 $$.
Solve the quadratic equation by following steps:
- step0: Solve by factoring:
  $$3x^{2}-5x-2=0$$
- step1: Factor the expression:
  $$\left(x-2\right)\left(3x+1\right)=0$$
- step2: Separate into possible cases:
  $$\begin{align}&x-2=0\&3x+1=0\end{align}$$
- step3: Solve the equation:
  $$\begin{align}&x=2\&x=-\frac{1}{3}\end{align}$$
- step4: Rewrite:
  $$x_{1}=-\frac{1}{3},x_{2}=2$$
Solve the equation $$ 5 x^{2}+2 x^{2}=3 $$.
Solve the quadratic equation by following steps:
- step0: Solve using square roots:
  $$5x^{2}+2x^{2}=3$$
- step1: Add the terms:
  $$7x^{2}=3$$
- step2: Divide both sides:
  $$\frac{7x^{2}}{7}=\frac{3}{7}$$
- step3: Divide the numbers:
  $$x^{2}=\frac{3}{7}$$
- step4: Simplify the expression:
  $$x=\pm \sqrt{\frac{3}{7}}$$
- step5: Simplify the expression:
  $$x=\pm \frac{\sqrt{21}}{7}$$
- step6: Separate into possible cases:
  $$\begin{align}&x=\frac{\sqrt{21}}{7}\&x=-\frac{\sqrt{21}}{7}\end{align}$$
- step7: Rewrite:
  $$x_{1}=-\frac{\sqrt{21}}{7},x_{2}=\frac{\sqrt{21}}{7}$$
Solve the equation $$ 9 x^{2}=x $$.
Solve the quadratic equation by following steps:
- step0: Solve by factoring:
  $$9x^{2}=x$$
- step1: Move the expression to the left side:
  $$9x^{2}-x=0$$
- step2: Factor the expression:
  $$x\left(9x-1\right)=0$$
- step3: Separate into possible cases:
  $$\begin{align}&9x-1=0\&x=0\end{align}$$
- step4: Solve the equation:
  $$\begin{align}&x=\frac{1}{9}\&x=0\end{align}$$
- step5: Rewrite:
  $$x_{1}=0,x_{2}=\frac{1}{9}$$
Solve the equation $$ 2 x^{2}-x=10 $$.
Solve the quadratic equation by following steps:
- step0: Solve by factoring:
  $$2x^{2}-x=10$$
- step1: Move the expression to the left side:
  $$2x^{2}-x-10=0$$
- step2: Factor the expression:
  $$\left(x+2\right)\left(2x-5\right)=0$$
- step3: Separate into possible cases:
  $$\begin{align}&2x-5=0\&x+2=0\end{align}$$
- step4: Solve the equation:
  $$\begin{align}&x=\frac{5}{2}\&x=-2\end{align}$$
- step5: Rewrite:
  $$x_{1}=-2,x_{2}=\frac{5}{2}$$
Solve the equation $$ \frac{m+2}{4}-\frac{m-6}{3}=\frac{1}{2} $$.
Solve the equation by following steps:
- step0: Solve for $$m$$:
  $$\frac{m+2}{4}-\frac{m-6}{3}=\frac{1}{2}$$
- step1: Multiply both sides of the equation by LCD:
  $$\left(\frac{m+2}{4}-\frac{m-6}{3}\right)\times 12=\frac{1}{2}\times 12$$
- step2: Simplify the equation:
  $$-m+30=6$$
- step3: Move the constant to the right side:
  $$-m=6-30$$
- step4: Subtract the numbers:
  $$-m=-24$$
- step5: Change the signs:
  $$m=24$$
Solve the equation $$ \frac{x}{4}-\frac{x}{3}=2 $$.
Solve the equation by following steps:
- step0: Solve for $$x$$:
  $$\frac{x}{4}-\frac{x}{3}=2$$
- step1: Multiply both sides of the equation by LCD:
  $$\left(\frac{x}{4}-\frac{x}{3}\right)\times 12=2\times 12$$
- step2: Simplify the equation:
  $$-x=24$$
- step3: Change the signs:
  $$x=-24$$
Solve the equation $$ 3 x^{2}=48 $$.
Solve the quadratic equation by following steps:
- step0: Solve using square roots:
  $$3x^{2}=48$$
- step1: Divide both sides:
  $$\frac{3x^{2}}{3}=\frac{48}{3}$$
- step2: Divide the numbers:
  $$x^{2}=16$$
- step3: Simplify the expression:
  $$x=\pm \sqrt{16}$$
- step4: Simplify the expression:
  $$x=\pm 4$$
- step5: Separate into possible cases:
  $$\begin{align}&x=4\&x=-4\end{align}$$
- step6: Rewrite:
  $$x_{1}=-4,x_{2}=4$$
Solve the equation $$ x+\frac{x+5}{3}=7 $$.
Solve the equation by following steps:
- step0: Solve for $$x$$:
  $$x+\frac{x+5}{3}=7$$
- step1: Multiply both sides of the equation by LCD:
  $$\left(x+\frac{x+5}{3}\right)\times 3=7\times 3$$
- step2: Simplify the equation:
  $$4x+5=21$$
- step3: Move the constant to the right side:
  $$4x=21-5$$
- step4: Subtract the numbers:
  $$4x=16$$
- step5: Divide both sides:
  $$\frac{4x}{4}=\frac{16}{4}$$
- step6: Divide the numbers:
  $$x=4$$
Solve the equation $$ (3 x^{2}-1)(x+2)=10 $$.
Solve the equation by following steps:
- step0: Solve for $$x$$:
  $$\left(3x^{2}-1\right)\left(x+2\right)=10$$
- step1: Expand the expression:
  $$3x^{3}+6x^{2}-x-2=10$$
- step2: Move the expression to the left side:
  $$3x^{3}+6x^{2}-x-2-10=0$$
- step3: Subtract the numbers:
  $$3x^{3}+6x^{2}-x-12=0$$
- step4: Calculate:
  $$x\approx 1.175961$$
Solve the equation $$ (3 x-1)(x+2)=0 $$.
Solve the quadratic equation by following steps:
- step0: Solve by factoring:
  $$\left(3x-1\right)\left(x+2\right)=0$$
- step1: Separate into possible cases:
  $$\begin{align}&3x-1=0\&x+2=0\end{align}$$
- step2: Solve the equation:
  $$\begin{align}&x=\frac{1}{3}\&x=-2\end{align}$$
- step3: Rewrite:
  $$x_{1}=-2,x_{2}=\frac{1}{3}$$
Here are the solutions to the equations provided:

### 2. Solve the following equations

**a.** $$ \frac{x}{4} - \frac{x}{3} = 2 $$

To solve this equation, we find a common denominator (which is 12) and rewrite the equation:

$$
\frac{3x}{12} - \frac{4x}{12} = 2 \implies -\frac{x}{12} = 2 \implies x = -24
$$

**Solution:** $$ x = -24 $$

---

**b.** $$ x + \frac{x+5}{3} = 7 $$

Multiply through by 3 to eliminate the fraction:

$$
3x + x + 5 = 21 \implies 4x + 5 = 21 \implies 4x = 16 \implies x = 4
$$

**Solution:** $$ x = 4 $$

---

**c.** $$ \frac{m+2}{4} - \frac{m-6}{3} = \frac{1}{2} $$

Multiply through by 12 to eliminate the fractions:

$$
3(m+2) - 4(m-6) = 6 \implies 3m + 6 - 4m + 24 = 6 \implies -m + 30 = 6 \implies -m = -24 \implies m = 24
$$

**Solution:** $$ m = 24 $$

---

### 3. Solve each of the following

**a.** $$ (3x - 1)(x + 2) = 0 $$

Setting each factor to zero gives:

1. $$ 3x - 1 = 0 \implies x = \frac{1}{3} $$
2. $$ x + 2 = 0 \implies x = -2 $$

**Solutions:** $$ x = -2, \frac{1}{3} $$

---

**b.** $$ (3x^{2} - 1)(x + 2) = 10 $$

Rearranging gives:

$$
(3x^{2} - 1)(x + 2) - 10 = 0
$$

This is a more complex equation, and the approximate solution is:

**Solution:** $$ x \approx 1.175961 $$

---

**c.** $$ 2x^{2} - 4x = 0 $$

Factoring out $$ 2x $$:

$$
2x(x - 2) = 0 \implies x = 0 \text{ or } x = 2
$$

**Solutions:** $$ x = 0, 2 $$

---

**d.** $$ 5x^{2} + 2x^{2} = 3 $$

Combining like terms gives:

$$
7x^{2} = 3 \implies x^{2} = \frac{3}{7} \implies x = \pm \frac{\sqrt{21}}{7}
$$

**Solutions:** $$ x = -\frac{\sqrt{21}}{7}, \frac{\sqrt{21}}{7} $$

---

**e.** $$ 3x^{2} = 48 $$

Dividing by 3 gives:

$$
x^{2} = 16 \implies x = \pm 4
$$

**Solutions:** $$ x = -4, 4 $$

---

**f.** $$ x^{2} = 9 $$

Taking the square root gives:

$$
x = \pm 3
$$

**Solutions:** $$ x = -3, 3 $$

---

**g.** $$ 9x^{2} = x $$

Rearranging gives:

$$
9x^{2} - x = 0 \implies x(9x - 1) = 0 \implies x = 0 \text{ or } x = \frac{1}{9}
$$

**Solutions:** $$ x = 0, \frac{1}{9} $$

---

**h.** $$ 2x^{2} - x = 10 $$

Rearranging gives:

$$
2x^{2} - x - 10 = 0
$$

Using the quadratic formula, we find:

$$
x = -2, \frac{5}{2}
$$

**Solutions:** $$ x = -2, 2.5 $$

---

**i.** $$ 3x^{2} - 5x - 2 = 0 $$

Using the quadratic formula gives:

$$
x = -\frac{1}{3}, 2
$$

**Solutions:** $$ x = -\frac{1}{3}, 2 $$

---

These are the solutions to all the equations provided. If you need further clarification or additional problems solved, feel free to ask!
Here are the solutions to the equations: 1. **a.** $$ x = -24 $$ 2. **b.** $$ x = 4 $$ 3. **c.** $$ m = 24 $$ 4. **a.** $$ x = -2, \frac{1}{3} $$ 5. **b.** $$ x \approx 1.175961 $$ 6. **c.** $$ x = 0, 2 $$ 7. **d.** $$ x = -\frac{\sqrt{21}}{7}, \frac{\sqrt{21}}{7} $$ 8. **e.** $$ x = -4, 4 $$ 9. **f.** $$ x = -3, 3 $$ 10. **g.** $$ x = 0, \frac{1}{9} $$ 11. **h.** $$ x = -2, 2.5 $$ 12. **i.** $$ x = -\frac{1}{3}, 2 $$ These are the answers to all the equations provided.

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