spiral review
8. determine the average rate of change for each interval on the graph of $g(r)$.
interval | average rate of change
$r=-2$ to $r=1$ |
$r=-2$ to $r=5$ |
$r=-2$ to $r=8$ |

9. functions $c(t)$ and $k(t)$ represent the distance of two cats from home after $t$ seconds. select all the true statements.
$square$ a. $k(5) c(5)$
$square$ b. $k(t)$ and $c(t)$ have the same domain and range
$square$ c. $k(t)$ keeps increasing from 0 to 13 seconds
$square$ d. $k(11) = c(11)$
$square$ e. both cats return home

10. tickets to the state fair cost $10 each. the function $c(x)=10x$ gives the total cost in dollars, $c(x)$, for the number of tickets purchased, $x$. select all the values that are possible outputs for $c(x)$.
$square$ a. 0
$square$ b. 70
$square$ c. 105
$square$ d. 680
$square$ e. 905

reflection
1. put a star next to a problem where you revised your thinking.
2. use the space to ask a question or share something youre proud of.

Question

spiral review
8. determine the average rate of change for each interval on the graph of $g(r)$.
interval | average rate of change
$r=-2$ to $r=1$ |
$r=-2$ to $r=5$ |
$r=-2$ to $r=8$ |

9. functions $c(t)$ and $k(t)$ represent the distance of two cats from home after $t$ seconds. select all the true statements.
$square$ a. $k(5) > c(5)$
$square$ b. $k(t)$ and $c(t)$ have the same domain and range
$square$ c. $k(t)$ keeps increasing from 0 to 13 seconds
$square$ d. $k(11) = c(11)$
$square$ e. both cats return home

10. tickets to the state fair cost $10 each. the function $c(x)=10x$ gives the total cost in dollars, $c(x)$, for the number of tickets purchased, $x$. select all the values that are possible outputs for $c(x)$.
$square$ a. 0
$square$ b. 70
$square$ c. 105
$square$ d. 680
$square$ e. 905

reflection
1. put a star next to a problem where you revised your thinking.
2. use the space to ask a question or share something youre proud of.

Accepted Answer

### Problem 8
# Explanation:
## Step1: Recall average rate formula
Average rate of change = $\frac{g(r_2)-g(r_1)}{r_2-r_1}$
## Step2: Get values for $r=-2$ to $r=1$
From graph: $g(-2)=6$, $g(1)=6$
$	ext{Rate} = \frac{6-6}{1-(-2)} = \frac{0}{3}=0$
## Step3: Get values for $r=-2$ to $r=5$
From graph: $g(-2)=6$, $g(5)=2$
$	ext{Rate} = \frac{2-6}{5-(-2)} = \frac{-4}{7}=-\frac{4}{7}$
## Step4: Get values for $r=-2$ to $r=8$
From graph: $g(-2)=6$, $g(8)=8$
$	ext{Rate} = \frac{8-6}{8-(-2)} = \frac{2}{10}=0.2$
# Answer:
- $r=-2$ to $r=1$: $0$
- $r=-2$ to $r=5$: $-\frac{4}{7}$
- $r=-2$ to $r=8$: $0.2$

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### Problem 9
# Brief Explanations:
- A. At $t=5$, $k(5)=40$, $c(5)=30$, so $k(5)>c(5)$ is true.
- B. Domain of both is $[0,25]$, but range of $k(t)$ is $[0,40]$, range of $c(t)$ is $[0,60]$: false.
- C. $k(t)$ decreases after $t=10$: false.
- D. At $t=11$, $k(11)=40$, $c(11)=40$, so $k(11)=c(11)$ is true.
- E. Both functions reach 0 at $t=25$: true.
# Answer:
A. $k(5) > c(5)$
D. $k(11) = c(11)$
E. Both cats return home.

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### Problem 10
# Brief Explanations:
The function $c(x)=10x$ has outputs that are multiples of 10 (since $x$ is a non-negative integer, number of tickets). 0,70,680 are multiples of 10; 105, 603 are not.
# Answer:
A. 0
B. 70
D. 680

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QUESTION IMAGE

Question

Explanation:

Problem 8

Step1: Recall average rate formula

Step2: Get values for $r=-2$ to $r=1$

Step3: Get values for $r=-2$ to $r=5$

Step4: Get values for $r=-2$ to $r=8$

Answer:

Problem 9