Use the image to answer the question.
An illustration shows a set of seven adjacent rectangles labeled as Shots. Another set of two adjacent rectangles is labeled as Scores and is placed below Shots. All rectangles have the same dimensions. A downward-facing bracket is placed below the set of two rectangles and points to the number 8.
Ruthie plays on a travel soccer league. For every 7 shots she takes on goal, she scores twice. If she scores 8 times, how many shots on goal did she take?
(1 point)
Responses
36 shots
36 shots
56 shots
56 shots
8 shots
8 shots
28 shots
To solve this problem, we can use the information given in the image.
According to the image, for every 7 shots Ruthie takes, she scores twice. We are told that she scores 8 times.
If she scores twice for every 7 shots, and she scores 8 times, we can set up the proportion:
(2 scores) / (7 shots) = (8 scores) / (x shots)
Cross-multiplying gives us:
2 * x shots = 7 * 8 scores
2x = 56
x = 56 / 2
x = 28
Therefore, Ruthie took 28 shots on goal.
The correct answer is:
28 shots
To solve this question, we can analyze the information provided in the image.
First, we are given that there are seven rectangles labeled as "Shots." We can assume that each rectangle represents one shot on goal.
Next, we are told that for every 7 shots Ruthie takes, she scores twice. This means that the ratio of shots to scores is 7:2.
Then, we are given that Ruthie scores 8 times. Therefore, we can set up a proportion to determine the number of shots on goal she took:
7 shots / 2 scores = X shots / 8 scores
To solve this proportion, we can cross-multiply:
(7 shots)(8 scores) = (2 scores)(X shots)
56 shots = 2 scores * X shots
Now, we can solve for X by dividing both sides of the equation by 2 scores:
56 shots / 2 scores = X shots
28 shots = X shots
Therefore, Ruthie took 28 shots on goal. So the correct answer is 28 shots.
Use the image to answer the question.
An illustration shows a set of five adjacent rectangles labeled as Adults. Another set of six adjacent rectangles is labeled as Kids and is placed below Adults. All rectangles have the same dimensions. A bracket on the right side encompasses both sets and points to the number 132.
It’s opening day at an amusement park. There are 132 people in line before it officially opens. If the ratio of adults to kids waiting to get in is 5:6, how many kids are waiting in line?
(1 point)
72 kids
72 kids
66 kids
66 kids
12 kids
12 kids
60 kids
To solve this problem, we can use the information given in the image.
According to the image, the ratio of adults to kids waiting in line is 5:6. This means that for every 5 adults, there are 6 kids.
We are told that there are a total of 132 people in line.
To determine how many kids are waiting in line, we can set up the proportion:
5 adults / 6 kids = X adults / 132 people
Cross-multiplying gives us:
5 * 132 = 6 * X
660 = 6X
Dividing both sides of the equation by 6 gives us:
X = 660 / 6
X = 110
Therefore, there are 110 adults waiting in line.
To find the number of kids waiting in line, we can subtract the number of adults from the total number of people:
132 - 110 = 22
Therefore, there are 22 kids waiting in line.
The correct answer is:
22 kids
pick one of the listed answers. Pick the correct one.
Apologies for not providing a specific answer from the listed options. The correct answer is:
72 kids
Use the image to answer the question.
An illustration shows a set of three adjacent rectangles labeled as Eggs. Another set of two adjacent rectangles is labeled as Sausages and is placed below eggs. All rectangles have the same dimensions. An upward-facing bracket above the center rectangle in Eggs points to the number 12.
Edgar is making an egg casserole for brunch. He needs eggs and sausages in the ratio of 3:2 . If he is going to use 12 eggs, how many sausages does he need?
(1 point)
5 sausages
5 sausages
12 sausages
12 sausages
20 sausages
20 sausages
8 sausages
To solve this problem, we can use the information given in the image.
According to the image, the ratio of eggs to sausages needed for Edgar's egg casserole is 3:2. This means that for every 3 eggs, Edgar needs 2 sausages.
We are told that Edgar is going to use 12 eggs.
To determine how many sausages Edgar needs, we can set up the proportion:
3 eggs / 2 sausages = 12 eggs / X sausages
Cross-multiplying gives us:
3 * X = 12 * 2
3X = 24
Dividing both sides of the equation by 3 gives us:
X = 24 / 3
X = 8
Therefore, Edgar needs 8 sausages.
The correct answer is:
8 sausages
Use the image to answer the question.
An illustration shows a set of three adjacent boxes labeled as Shorts. Another set of four adjacent rectangles is labeled as Pants and is placed below Shorts. All rectangles have the same dimensions. A bracket on the right side encompasses both sets and points to the number 70.
A clothing store has pants and shorts for sale in a ratio of 4:3 . If there are a total of 70 pants and shorts available for sale, how many of those are shorts?
(1 point)
30 shorts
30 shorts
40 shorts
40 shorts
10 shorts
10 shorts
21 shorts
To solve this problem, we can use the information given in the image.
According to the image, the ratio of pants to shorts available for sale is 4:3. This means that for every 4 pants, there are 3 shorts.
We are told that there is a total of 70 pants and shorts available for sale.
To determine how many of those are shorts, we can set up the proportion:
4 pants / 3 shorts = 70 pants and shorts / X shorts
Cross-multiplying gives us:
4 * X = 3 * 70
4X = 210
Dividing both sides of the equation by 4 gives us:
X = 210 / 4
X = 52.5
Since we cannot have a fraction of a shorts, we round down to the nearest whole number.
Therefore, there are 52 shorts available for sale.
The correct answer is:
52 shorts