4. a line passes through the point (- 2, 5) and has a slope of $\frac{-1}{2}$. write the equation using the point slope form of this line. (2 pts)

5. sara took a taxi cab from the airport to her convention center for her job. she is presenting on ai usage in schools and paid $11.50. the equation for the taxi cab fare can be modeled by a linear relationship. the equation $y = 0.50x + 5$ models the total fare, $y$, of her trip for $x$ miles.

a. how much did it cost sara to get into the cab? explain. (2 pts)

b. according to the model, how much does it cost per mile? explain (2 pts)

6. write an equation in slope intercept form for the linear relationship shown on the graph. (2 pts)

(graph with points (-1, 10) and (3, 2))

Question

4. a line passes through the point (- 2, 5) and has a slope of $\frac{-1}{2}$. write the equation using the point slope form of this line. (2 pts)

5. sara took a taxi cab from the airport to her convention center for her job. she is presenting on ai usage in schools and paid $11.50. the equation for the taxi cab fare can be modeled by a linear relationship. the equation $y = 0.50x + 5$ models the total fare, $y$, of her trip for $x$ miles.

a. how much did it cost sara to get into the cab? explain. (2 pts)

b. according to the model, how much does it cost per mile? explain (2 pts)

6. write an equation in slope intercept form for the linear relationship shown on the graph. (2 pts)

(graph with points (-1, 10) and (3, 2))

Accepted Answer

### Question 4
# Explanation:
## Step1: Recall point - slope form
The point - slope form of a line is given by $y - y_1=m(x - x_1)$, where $(x_1,y_1)$ is a point on the line and $m$ is the slope of the line.
We are given that the line passes through the point $(- 2,5)$ (so $x_1=-2$ and $y_1 = 5$) and has a slope $m=-\frac{1}{2}$.

## Step2: Substitute values into point - slope form
Substitute $x_1=-2$, $y_1 = 5$ and $m =-\frac{1}{2}$ into the point - slope formula:
$y-5=-\frac{1}{2}(x - (-2))$
Simplify the right - hand side: $y - 5=-\frac{1}{2}(x + 2)$

# Answer:
$y - 5=-\frac{1}{2}(x + 2)$

### Question 5a
# Brief Explanations:
The cost to get into the cab is the fixed cost, which occurs when the number of miles $x = 0$ (since no miles have been traveled yet). In the linear equation $y=mx + b$ (where $y$ is the total cost, $m$ is the cost per mile, $x$ is the number of miles, and $b$ is the fixed cost), when $x = 0$, $y=b$. For the equation $y = 0.50x+5$, when $x = 0$, $y=5$. So the cost to get into the cab is the value of $y$ when $x = 0$, which is $\$5$.
# Answer:
It cost Sara $\$5$ to get into the cab. When $x = 0$ (no miles traveled), from the equation $y=0.50x + 5$, we substitute $x = 0$ and get $y=5$. This $y$ - value represents the fixed cost (cost to get into the cab).

### Question 5b
# Brief Explanations:
In the linear equation $y=mx + b$ (where $y$ is the total cost, $m$ is the cost per mile, $x$ is the number of miles, and $b$ is the fixed cost), the coefficient of $x$ is the cost per mile. For the equation $y = 0.50x+5$, the coefficient of $x$ is $0.50$. So the cost per mile is $\$0.50$.
# Answer:
It costs $\$0.50$ per mile. In the linear equation $y = mx + b$ (modeling the taxi fare), the coefficient of $x$ ($m$) represents the cost per mile. For $y=0.50x + 5$, $m = 0.50$, so the cost per mile is $\$0.50$.

### Question 6
# Explanation:
## Step1: Find the slope
The slope $m$ between two points $(x_1,y_1)$ and $(x_2,y_2)$ is given by the formula $m=\frac{y_2 - y_1}{x_2 - x_1}$. We have the points $(-1,10)$ and $(3,2)$. Let $x_1=-1$, $y_1 = 10$, $x_2=3$, $y_2=2$.
$m=\frac{2 - 10}{3-(-1)}=\frac{-8}{4}=-2$

## Step2: Use point - slope form to find the equation
We can use the point - slope form $y - y_1=m(x - x_1)$. Let's use the point $(3,2)$ (we could also use $(-1,10)$). Substitute $m=-2$, $x_1 = 3$, $y_1=2$ into the point - slope formula:
$y - 2=-2(x - 3)$

## Step3: Convert to slope - intercept form ($y=mx + b$)
Expand the right - hand side: $y-2=-2x + 6$
Add 2 to both sides: $y=-2x+8$

# Answer:
$y=-2x + 8$

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QUESTION IMAGE

Question

Explanation:

Question 4

Step1: Recall point - slope form

Step2: Substitute values into point - slope form

Answer:

Question 5a