Add a school subway for out of the first 10. Students were wearing spirit wear based on this information if 500 students were at the assemblies and how many students could it be expected to have on Spirit wear?
17 answers
I'm sorry, I do not have enough information to answer this question accurately.
Joey can choose to ride the bus the subway or take a taxi to travel to work on Monday and Tuesday which list shows all the possible outcomes of one day and one method of travel
A. Monday, but Tuesday taxing Monday subway Tuesday bus Monday subway Tuesday taxi
B. Monday past Monday subway Monday, taxi Tuesday bus Tuesday subway and Tuesday bus.
C. Bus, taxi, bus, subway, taxi, bus, taxi, subway, subway, bus, subway, taxi.
D. Monday bus Monday, Subway Monday, Tuesday Tuesday bus Tuesday subway Tuesday Monday.
A. Monday, but Tuesday taxing Monday subway Tuesday bus Monday subway Tuesday taxi
B. Monday past Monday subway Monday, taxi Tuesday bus Tuesday subway and Tuesday bus.
C. Bus, taxi, bus, subway, taxi, bus, taxi, subway, subway, bus, subway, taxi.
D. Monday bus Monday, Subway Monday, Tuesday Tuesday bus Tuesday subway Tuesday Monday.
C. Bus, taxi, bus, subway, taxi, bus, taxi, subway, subway, bus, subway, taxi.
The airport security
Randomly selected a 24 suitcases from inside the security line of these bags they screen to seven suitcases based on this information what is the most reasonable percentage for the number of suitcases they will screen in a group of 144
Randomly selected a 24 suitcases from inside the security line of these bags they screen to seven suitcases based on this information what is the most reasonable percentage for the number of suitcases they will screen in a group of 144
If 7 suitcases were screened out of 24, the percentage of suitcases screened is:
(7/24) x 100% = 29.17%
To find the most reasonable percentage for the number of suitcases they will screen in a group of 144, we can use proportions:
(7/24) = (x/144)
Cross-multiplying, we get:
24x = 1008
x = 42
Therefore, the most reasonable percentage for the number of suitcases they will screen in a group of 144 is:
(42/144) x 100% = 29.17% (rounded to two decimal places)
(7/24) x 100% = 29.17%
To find the most reasonable percentage for the number of suitcases they will screen in a group of 144, we can use proportions:
(7/24) = (x/144)
Cross-multiplying, we get:
24x = 1008
x = 42
Therefore, the most reasonable percentage for the number of suitcases they will screen in a group of 144 is:
(42/144) x 100% = 29.17% (rounded to two decimal places)
What is the volume of a triangular prism?
4.2 x 3 x 7 x 3
4.2 x 3 x 7 x 3
It's not clear which of the values you have provided is the height, base, or length of the triangular prism. However, the formula for finding the volume of a triangular prism is:
Volume = (base x height x length) / 2
So, if we assume that the first two values 4.2 and 3 are the base and height of one of the triangles that make up the prism, and 7 is the length of the prism, then the volume would be:
Volume = (4.2 x 3 x 7) / 2
Volume = 44.1 cubic units
Therefore, the volume of the triangular prism is 44.1 cubic units (assuming the values represent the base, height, and length, respectively).
Volume = (base x height x length) / 2
So, if we assume that the first two values 4.2 and 3 are the base and height of one of the triangles that make up the prism, and 7 is the length of the prism, then the volume would be:
Volume = (4.2 x 3 x 7) / 2
Volume = 44.1 cubic units
Therefore, the volume of the triangular prism is 44.1 cubic units (assuming the values represent the base, height, and length, respectively).
What is the volume of the rectangular prism?
5 x 7 x 7.5
5 x 7 x 7.5
The volume of a rectangular prism is given by the formula:
Volume = Length x Width x Height
Substituting the given values, we get:
Volume = 5 x 7 x 7.5
Volume = 262.5 cubic units
Therefore, the volume of the rectangular prism is 262.5 cubic units.
Volume = Length x Width x Height
Substituting the given values, we get:
Volume = 5 x 7 x 7.5
Volume = 262.5 cubic units
Therefore, the volume of the rectangular prism is 262.5 cubic units.
Which is larger 3 x 5 x 8.41 or 3 x 5 x 8.41
The two expressions provided are exactly the same, so they are equal in value. Therefore, neither is larger than the other.
What is the volume of the composite figure bigger rectangle, 11 x 4 x 3 with a smaller rectangle on top 3 x 3
To find the volume of a composite figure made up of two rectangular prisms, we need to find the volume of each individual prism and then add them together.
Volume of the larger prism = length x width x height = 11 x 4 x 3 = 132 cubic units
Volume of the smaller prism = length x width x height = 3 x 3 x 3 = 27 cubic units
Total volume of the composite figure = sum of the volumes of the individual prisms = 132 + 27 = 159 cubic units
Therefore, the volume of the composite figure (a bigger rectangle with a smaller rectangle on top) is 159 cubic units.
Volume of the larger prism = length x width x height = 11 x 4 x 3 = 132 cubic units
Volume of the smaller prism = length x width x height = 3 x 3 x 3 = 27 cubic units
Total volume of the composite figure = sum of the volumes of the individual prisms = 132 + 27 = 159 cubic units
Therefore, the volume of the composite figure (a bigger rectangle with a smaller rectangle on top) is 159 cubic units.
What is the volume of the cone pose sat composite figure 7 x 7 x 16 x 7 x 10 x 8
It's not entirely clear what the "cone pose sat composite figure" means from the given information. However, assuming that the composite figure is made up of a rectangular prism of dimensions 7 x 7 x 16 and a cone with a base radius of 7, a height of 10, and a slant height of 8, we can find the volume as follows:
The volume of the rectangular prism is:
V1 = 7 x 7 x 16 = 784 cubic units
The volume of the cone is given by the formula:
V2 = (1/3) x π x r^2 x h
where r is the radius of the base of the cone and h is its height. Substituting the given values, we get:
V2 = (1/3) x π x 7^2 x 10 = 490.87 cubic units
Therefore, the total volume of the composite figure is:
V1 + V2 = 784 + 490.87 = 1274.87 cubic units
Therefore, the volume of the composite figure is approximately 1275 cubic units (rounded to the nearest whole number).
The volume of the rectangular prism is:
V1 = 7 x 7 x 16 = 784 cubic units
The volume of the cone is given by the formula:
V2 = (1/3) x π x r^2 x h
where r is the radius of the base of the cone and h is its height. Substituting the given values, we get:
V2 = (1/3) x π x 7^2 x 10 = 490.87 cubic units
Therefore, the total volume of the composite figure is:
V1 + V2 = 784 + 490.87 = 1274.87 cubic units
Therefore, the volume of the composite figure is approximately 1275 cubic units (rounded to the nearest whole number).
What is the volume 24 x 8 x 17
The volume of a rectangular prism is given by the formula:
Volume = Length x Width x Height
Substituting the given values, we get:
Volume = 24 x 8 x 17
Volume = 3264 cubic units
Therefore, the volume of the rectangular prism is 3264 cubic units.
Volume = Length x Width x Height
Substituting the given values, we get:
Volume = 24 x 8 x 17
Volume = 3264 cubic units
Therefore, the volume of the rectangular prism is 3264 cubic units.