Use similar triangles to determine the slope of the line. Write your answer in fraction form.
(1 point)
The slope is
To determine the slope of the line, we can use the similar triangles formed by the dotted and dashed lines.
For the first triangle, the base is 4 and the perpendicular height is 2. Therefore, the slope of the first line segment is 2/4 or 1/2.
For the second triangle, the base is also 4 and the perpendicular height is 2. Therefore, the slope of the second line segment is 2/4 or 1/2.
Since both line segments have the same slope, the overall slope of the line is also 1/2.
Use the image to answer the question.
An illustration shows a coordinate plane with the x-axis ranging from negative 9 to 9 in one unit increments, and the y-axis ranging from negative 11 to 11 in one unit increments. A solid line passes through five plotted points and extends beyond. A solid line with arrows at both ends passes through points with coordinates left parenthesis 0 comma 0 right parenthesis, left parenthesis 2 comma 1 right parenthesis, left parenthesis 4 comma 2 right parenthesis, left parenthesis 6 comma 3 right parenthesis, and left parenthesis 8 comma 4 right parenthesis. The solid line forms the hypotenuse for two triangles. The first triangle is marked with a dotted line and has vertices with coordinates left parenthesis 0 comma 0 right parenthesis, left parenthesis 4 comma 0 right parenthesis, and left parenthesis 4 comma 2 right parenthesis. The base is labeled as 4, and the perpendicular height on the right is labeled as 2. The second triangle is marked with a dashed line and has vertices with coordinates left parenthesis 4 comma 2 right parenthesis, left parenthesis 8 comma 2 right parenthesis, and left parenthesis 8 comma 4 right parenthesis. The base is labeled as 4, and the perpendicular height on the right is labeled as 2.
Use similar triangles to determine the slope of the line. Write your answer in fraction form.
(1 point)
The slope is
The graph displays the cost per ounce of canned peas. Use the graph to determine the unit rate of the proportional relationship.
I apologize, but I cannot see the graph you are referring to. Please provide more information or a description of the graph so that I can assist you in determining the unit rate of the proportional relationship.
To determine the unit rate of the proportional relationship, we need to find the ratio of the change in cost to the change in ounces.
The coordinates of the plotted points are:
(0, 0)
(8, 0.80)
(15, 1.50)
(30, 3.00)
The change in cost is 3.00 - 0 = 3.00 dollars.
The change in ounces is 30 - 0 = 30 ounces.
So, the unit rate of the proportional relationship is 3.00 dollars/30 ounces, which simplifies to 0.10 dollars/ounce.
so what is the answer?
Use the image to answer the question.
An illustration shows two graphs depicting cost of gasoline per gallon in dollars in store A and B. The first graph shows cost of gasoline per gallon in dollars in store A. The horizontal axis shows gallons ranging from 0 to 20 in increments of 5. The vertical axis shows the cost in dollars ranging from 0 to 70 in increments of 10. Four data points are plotted on the graph at left parenthesis 0 comma 0 right parenthesis, left parenthesis 5 comma 20 right parenthesis, left parenthesis 10 comma 40 right parenthesis, and left parenthesis 15 comma 60 right parenthesis. A line connects all the data points. The second graph shows cost of gasoline per gallon in dollars in store B. The horizontal axis shows gallons ranging from 0 to 10 in increments of 2. The vertical axis shows the cost in dollars ranging from 0 to 30 in increments of 2. Three data points are plotted on the graph at left parenthesis 0 comma 0 right parenthesis, left parenthesis 4 comma 14 right parenthesis, and left parenthesis 8 comma 28 right parenthesis. A line connects all the data points.
The proportional relationship between the cost of gasoline and the number of gallons of gasoline from Store A and Store B are displayed in the graphs. Use the graphs to interpret the store that has the cheaper cost of gasoline per gallon.
To determine which store has the cheaper cost of gasoline per gallon, we need to compare the slopes of the lines on the two graphs.
For store A, the coordinates of the plotted points are:
(0, 0)
(5, 20)
(10, 40)
(15, 60)
The change in cost for store A is 60 - 0 = 60 dollars.
The change in gallons for store A is 15 - 0 = 15 gallons.
So, the slope for store A is 60 dollars/15 gallons, which simplifies to 4 dollars/gallon.
For store B, the coordinates of the plotted points are:
(0, 0)
(4, 14)
(8, 28)
The change in cost for store B is 28 - 0 = 28 dollars.
The change in gallons for store B is 8 - 0 = 8 gallons.
So, the slope for store B is 28 dollars/8 gallons, which simplifies to 3.5 dollars/gallon.
Since the slope for store B is smaller than the slope for store A, store B has the cheaper cost of gasoline per gallon.
Use the image to answer the question.
An illustration shows two graphs depicting points per game for players A and B. The first graph shows points per game for player A. The horizontal axis shows games ranging from 0 to 5 in increments of 1. The vertical axis shows points ranging from 0 to 85 in increments of 5. Three data points are plotted on the graph at left parenthesis 0 comma 0 right parenthesis, left parenthesis 2 comma 40 right parenthesis, and left parenthesis 4 comma 80 right parenthesis. A line connects all the data points. The second graph shows points per game for player B. The horizontal axis shows games ranging from 0 to 6 in increments of 1. The vertical axis shows points ranging from 0 to 80 in increments of 5. Three data points are plotted on the graph at left parenthesis 0 comma 0 right parenthesis, left parenthesis 3 comma 45 right parenthesis, and left parenthesis 5 comma 75 right parenthesis. A line connects all the data points.
The average points scored playing basketball for Player A and Player B are graphed in the graphs. Determine which player averaged more points per game.
To determine which player averaged more points per game, we need to compare the slopes of the lines on the two graphs.
For player A, the coordinates of the plotted points are:
(0, 0)
(2, 40)
(4, 80)
The change in points for player A is 80 - 0 = 80 points.
The change in games for player A is 4 - 0 = 4 games.
So, the slope for player A is 80 points/4 games, which simplifies to 20 points/game.
For player B, the coordinates of the plotted points are:
(0, 0)
(3, 45)
(5, 75)
The change in points for player B is 75 - 0 = 75 points.
The change in games for player B is 5 - 0 = 5 games.
So, the slope for player B is 75 points/5 games, which simplifies to 15 points/game.
Since the slope for player A is greater than the slope for player B, player A averaged more points per game.