Practice 1 Solutions

2. $4x^2+8x–2=x^2–2x$

$$\begin{gathered} 3x^2+10x–2=0 \\ a=3, b=10, c=–2 \\ x=\frac{–\left(10\right)\pm \sqrt{{\left(10\right)}^2–4\left(3\right)\left(–2\right)}}{2\left(3\right)} \\ x=\frac{–10\pm \sqrt{100–\left(–24\right)}}{6} \\ x=\frac{–10\pm \sqrt{100+24}}{6} \\ x=\frac{–10\pm \sqrt{124}}{6} \\ x=\frac{–10\pm 2\sqrt{31}}{6} \\ x=\frac{\cancel{2}\left(–5\pm \sqrt{31}\right)}{\cancel{2}\left(3\right)} \end{gathered}$$

$x=\frac{–5\pm \sqrt{31}}{3}$

3. $x^2+6x=2$

$$\begin{gathered} x^2+6x–2=0 \\ a=1, b=6, c=–2 \\ x=\frac{–\left(6\right)\pm \sqrt{{\left(6\right)}^2–4\left(1\right)\left(–2\right)}}{2\left(1\right)} \\ x=\frac{–6\pm \sqrt{36–\left(–8\right)}}{2} \\ x=\frac{–6\pm \sqrt{36+8}}{2} \\ x=\frac{–6\pm \sqrt{44}}{2} \\ x=\frac{–6\pm 2\sqrt{11}}{2} \\ x=\frac{\cancel{2}\left(–3\pm \sqrt{11}\right)}{\cancel{2}} \end{gathered}$$

$x=–3\pm \sqrt{11}$

4. $x^2+3x+7=0$

$$\begin{gathered} a=1, b=3, c=7 \\ x=\frac{–\left(3\right)\pm \sqrt{{\left(3\right)}^2–4\left(1\right)\left(7\right)}}{2\left(1\right)} \\ x=\frac{–3\pm \sqrt{9–\left(28\right)}}{2} \\ x=\frac{–3\pm \sqrt{–19}}{2} \end{gathered}$$

$x=\frac{–3\pm i\sqrt{19}}{2}$

7. $7x^2–10x+2=0$

$$\begin{gathered} a=7, b=–10, c=2 \\ x=\frac{–\left(–10\right)\pm \sqrt{{\left(–10\right)}^2–4\left(7\right)\left(2\right)}}{2\left(7\right)} \\ x=\frac{10\pm \sqrt{100–\left(56\right)}}{14} \\ x=\frac{10\pm \sqrt{44}}{14} \\ x=\frac{10\pm 2\sqrt{11}}{14} \\ x=\frac{\cancel{2}\left(5\pm \sqrt{11}\right)}{\cancel{2}\left(7\right)} \end{gathered}$$

$x=\frac{5\pm \sqrt{11}}{7}$

8. $x^2–3x–2=–6$

$$\begin{gathered} x^2–3x+4=0 \\ a=1, b=–3, c=4 \\ x=\frac{–\left(–3\right)\pm \sqrt{{\left(–3\right)}^2–4\left(1\right)\left(4\right)}}{2\left(1\right)} \\ x=\frac{3\pm \sqrt{9–\left(16\right)}}{2} \\ x=\frac{3\pm \sqrt{–7}}{2} \end{gathered}$$

$x=\frac{3\pm i\sqrt{7}}{2}$

9. $5x^2+x+1=0$

$$\begin{gathered} a=5, b=1, c=1 \\ {b}^2–4ac \\ {\left(1\right)}^2–4\left(5\right)\left(1\right) \\ 1–20 \\ –19 \end{gathered}$$

This equation has two complex solutions.

10. $5x^2–7=3x^2+3x$

$$\begin{gathered} 2x^2–3x–7=0 \\ a=2, b=–3, c=–7 \\ {b}^2–4ac \\ {\left(–3\right)}^2–4\left(2\right)\left(–7\right) \\ 9–\left(–56\right) \\ 9+56 \\ 65 \end{gathered}$$

This equation has two real, irrational solutions.

11. $6x^2+13x+2=0$

$$\begin{gathered} a=6, b=13, c=2 \\ {b}^2–4ac \\ {\left(13\right)}^2–4\left(6\right)\left(2\right) \\ 169–48 \\ 121 \end{gathered}$$

This equation has two real, rational solutions.

12. $x^2+6x+12=0$

$$\begin{gathered} a=1, b=6, c=12 \\ {b}^2–4ac \\ {\left(6\right)}^2–4\left(1\right)\left(12\right) \\ 36–48 \\ –12 \end{gathered}$$

This equation has two complex solutions.

13. $3x^2+10x=2$

$$\begin{gathered} 3x^2+10x–2=0 \\ a=3, b=10, c=–2 \\ {b}^2–4ac \\ {\left(10\right)}^2–4\left(3\right)\left(–2\right) \\ 100–\left(–24\right) \\ 100+24 \\ 124 \end{gathered}$$

This equation has two real, irrational solutions.

15. $4x^2–7x=3x^2–4$

$$\begin{gathered} x^2–7x+4=0 \\ a=1, b=–7, c=4 \\ {b}^2–4ac \\ {\left(–7\right)}^2–4\left(1\right)\left(4\right) \\ 49–16 \\ 33 \end{gathered}$$

This equation has two real, irrational solutions.

16. $16x^2+8x+1=0$

$$\begin{gathered} a=16, b=8, c=1 \\ {b}^2–4ac \\ {\left(8\right)}^2–4\left(16\right)\left(1\right) \\ 64–64 \\ 0 \end{gathered}$$

This equation has one real, rational solution.

17. Cole threw a ball at an initial velocity of 35 feet per second from a starting height of 6 feet. Determine how long the ball will be in the air before it hits the ground. Round your answer to the nearest hundredth.

$$\begin{gathered} 0=\frac{1}{2}\left(–32\right)t^2+35t+6 \\ 0=–16t^2+35t+6 \\ a=–16, b=35, c=6 \\ t=\frac{–35\pm \sqrt{{35}^2–4\left(–16\right)\left(6\right)}}{2\left(–16\right)} \\ t=\frac{–35\pm \sqrt{1609}}{–32} \\ t=\frac{–35\pm 40.11}{–32} \\ t=\cancel{–0.16}, 2.34 \end{gathered}$$

The ball took 2.34 seconds to hit the ground.

18. Grant dropped a rock off a 20 meter cliff at an initial velocity of 0 meters per second. Find the time it takes to hit the ground in meters per second.

$\begin{array}{rcl}0& =& \frac{1}{2}\left(–9.8\right)t^2+0t+20\\ 0& =& –4.9t^2+20\\ 4.9t^2& =& 20\\ t^2& =& 4.08\\ t& =& \cancel{–2.02}, 2.02\end{array}$

It takes 2.02 seconds to hit the ground.

19. The referee tossed a coin prior to the game. It was flipped at a velocity of 12 feet per second at a height of 5.75 feet. How much time passed until the coin hit the ground?

$$\begin{gathered} \frac{1}{2}\left(–32\right)t^2+12t+5.75=0 \\ –16t^2+12t+5.75=0 \\ a=–16, b=12, c=5.75 \\ t=\frac{–12\pm \sqrt{{\left(12\right)}^2–4\left(–16\right)\left(5.75\right)}}{2\left(–16\right)} \\ t=\frac{–12\pm \sqrt{512}}{–32} \\ t=\frac{–12\pm 22.63}{–32} \\ t=\cancel{–0.33}, 1.08 \end{gathered}$$

The coin hit the ground at 1.08 seconds.

20. Two monkeys were tossing a banana back and forth. The first monkey threw the banana at a height of 2.5 feet and the other caught it at 2 feet. The initial velocity was 25 feet per second. How long was the banana in the air for one toss?

$$\begin{gathered} \frac{1}{2}\left(–32\right)t^2+25t+2.5=2 \\ –16t^2+25t+0.5=0 \\ a=–16, b=25, c=0.5 \\ t=\frac{–25\pm \sqrt{{\left(25\right)}^2–4\left(–16\right)\left(0.5\right)}}{2\left(–16\right)} \\ t=\frac{–25\pm \sqrt{641}}{2\left(–16\right)} \\ t=\frac{–25\pm 25.32}{–32} \\ t=\cancel{–0.01}, 1.57 \end{gathered}$$

The second monkey caught the banana at 1.57 seconds.