Question 1
A)What units would express the volume of a right rectangular prism with a length of 8 meters, a width of 10 meters, and a height of 5 meters?(1 point)
Responses
square meters
square meters
square feet
square feet
meters
meters
cubic meters
cubic meters
Question 2
A)
Use the image to answer the question.
An illustration shows a rectangular prism. The top, front, and right faces are visible. The edges that are not visible are indicated by a dashed line. The base is labeled upper B equals 21 centimeters squared. A vertical edge is labeled h equals 3 centimeters.
Find the volume of the right rectangular prism.
(1 point)
Responses
1,323 cm3
1 comma 323 cm cubed
441 cm3
441 cm cubed
63 cm3
63 cm cubed
189 cm3
189 cm cubed
Question 3
A)Bertie is taking measurements for a new bookshelf. The one she is looking at is 147 cm long, 15 cm deep, and 112 cm tall. What is the volume of the bookshelf?(1 point)
Responses
40,698 cm3
40,698 cm cubed
274 cm3
274 cm cubed
16,464 cm3
16,464 cm cubed
246,960 cm3
246,960 cm cubed
Question 4
A)Anwar’s fish tank measures 10 in.× 12 in.× 20 in. What is its volume?(1 point)
Responses
2,400 in.3
2,400 in. cubed
1,120 in.3
1,120 in. cubed
120 in.3
120 in. cubed
240 in.3
240 in. cubed
Question 5
A)Mrs. Davis keeps a first-aid kit on her school bus. The first-aid kit is 10 in. wide, 7 in. long, and 3 in. deep. What is the volume of the first-aid kit?(1 point)
Responses
242 in.3
242 in. cubed
70 in.3
70 in. cubed
210 in.3
210 in. cubed
2,100 in.3
2,100 in. cubed
Question 1
D) cubic meters
Question 2
C) 63 cm3
Question 3
A) 40,698 cm3
Question 4
A) 2,400 in.3
Question 5
B) 70 in.3
Question 1
A)
Use the image to answer the question.
An illustration shows a rectangular prism. The top, front, and right faces are visible. The edges that are not visible are indicated by a dashed line. The bottom front edge measures 12 inches. The bottom right edge measures 5 inches. A vertical edge measures 3 inches.
Find the volume of the right rectangular prism.
(1 point)
$$ in.3
Question 2
A)The area of the base of a right rectangular prism is 18 square inches and the height is 10 inches. What is the volume?(1 point)
$$ cubic inches
Question 3
A)Apply the appropriate formula to find out how much space is taken up by a right rectangular prism with a length of 4 yards, a width of 6 yards, and a height of 7 yards.(1 point)
$$ cubic yards
Question 4
A)Harriet’s locker measures 12 in.×12 in.×36 in. What is its volume?(1 point)
$$ in.3
Question 5
A)George bought a decorative cover for his tissue boxes. The cover is 5 in. long, 10 in. wide, and 3 in. deep. What is the volume of the tissue box cover?(1 point)
$$ in.3
Question 1
The volume of the right rectangular prism with the dimensions given is:
Volume = 12 inches x 5 inches x 3 inches = 180 in^3
Therefore, the volume of the right rectangular prism is 180 in^3.
Question 2
Given that the area of the base of the right rectangular prism is 18 square inches and the height is 10 inches, the volume can be calculated as:
Volume = Base Area x Height = 18 in^2 x 10 in = 180 in^3
Therefore, the volume of the right rectangular prism is 180 in^3.
Question 3
The volume of the right rectangular prism with a length of 4 yards, a width of 6 yards, and a height of 7 yards can be calculated as:
Volume = Length x Width x Height = 4 yards x 6 yards x 7 yards = 168 cubic yards
Therefore, the volume of the right rectangular prism is 168 cubic yards.
Question 4
Given that Harriet's locker measures 12 in. x 12 in. x 36 in., the volume can be calculated as:
Volume = 12 in x 12 in x 36 in = 5,184 in^3
Therefore, the volume of Harriet's locker is 5,184 in^3.
Question 5
The volume of the tissue box cover with dimensions 5 inches long, 10 inches wide, and 3 inches deep can be calculated as:
Volume = Length x Width x Depth = 5 in x 10 in x 3 in = 150 in^3
Therefore, the volume of the tissue box cover is 150 in^3.
Question 1
A)What is the volume of a rectangular prism measuring 1 m × 3 m × 5 m?(1 point)
$$ m3
Question 2
A)What is the volume of a picture frame, whose dimensions are 8 in. long, 3 in. deep, and 10 inches high?(1 point)
$$ in.3
Question 3
A)What is the volume of the rectangular prism whose length is 16 mm, width is 3 mm, and height is 8 mm?(1 point)
$$ mm3
Question 4
A)
Use the image to answer the question.
An illustration shows a shipping container in the shape of a rectangular prism. The length measures 40 feet, the width measures 8 feet, and the height measures 9 feet.
What is the volume of the shipping container shown?
(1 point)
$$ ft.3
Question 5
A)Use the volume formula to find the volume of a rectangular slice of cake: 4 in. × 3 in. × 2 in.(1 point)
$$ in.3
Question 1
The volume of a rectangular prism measuring 1 m × 3 m × 5 m is calculated as:
Volume = Length x Width x Height = 1 m x 3 m x 5 m = 15 m^3
Therefore, the volume of the rectangular prism is 15 m^3.
Question 2
The volume of a picture frame with dimensions 8 in. long, 3 in. deep, and 10 inches high is calculated as:
Volume = Length x Depth x Height = 8 in x 3 in x 10 in = 240 in^3
Therefore, the volume of the picture frame is 240 in^3.
Question 3
The volume of the rectangular prism with a length of 16 mm, width of 3 mm, and height of 8 mm is calculated as:
Volume = Length x Width x Height = 16 mm x 3 mm x 8 mm = 384 mm^3
Therefore, the volume of the rectangular prism is 384 mm^3.
Question 4
Given that the shipping container shown has a length of 40 feet, width of 8 feet, and height of 9 feet, the volume can be calculated as:
Volume = Length x Width x Height = 40 ft x 8 ft x 9 ft = 2,880 ft^3
Therefore, the volume of the shipping container is 2,880 ft^3.
Question 5
Using the volume formula, the volume of a rectangular slice of cake with dimensions 4 in. × 3 in. × 2 in. is calculated as:
Volume = Length x Width x Height = 4 in x 3 in x 2 in = 24 in^3
Therefore, the volume of the rectangular slice of cake is 24 in^3.
Question 1
A)Find the volume of a kitchen cabinet measuring 12 inches deep, 36 inches long, and 40 inches tall.(1 point)
Responses
1,440 in.3
1,440 in. cubed
88 in.3
88 in. cubed
17,280 in.3
17,280 in. cubed
432 in.3
432 in. cubed
Question 2
A)Find the volume of the rectangular prism, measuring 9 mm × 4 mm × 19 mm.(1 point)
Responses
36 mm3
36 mm cubed
684 mm3
684 mm cubed
32 mm3
32 mm cubed
171 mm3
171 mm cubed
Question 3
A)
Use the image to answer the question.
An illustration shows a bench in the shape of a rectangular prism. The length measures 54 inches, the width measures 17 inches, and the height measures 18 inches.
Find the volume of the storage bench whose dimensions are 17 in. × 54 in. × 18 in.
(1 point)
Responses
89 in.3
89 in. cubed
16,524 in.3
16,524 in. cubed
15,606 in.3
15,606 in. cubed
918 in.3
918 in. cubed
Question 4
A)Use the volume formula to find the volume of an alphabet block that resembles a cube having a side length of 2 in.(1 point)
Responses
16 in.3
16 in. cubed
6 in.3
6 in. cubed
4 in.3
4 in. cubed
8 in.3
8 in. cubed
Question 5
A)
Use the image to answer the question.
An illustration shows a gift box in the shape of a rectangular prism. The length measures 15 centimeters, the width measures 14 centimeters, and the height measures 14 centimeters.
What is the volume of a wrapped present that has the dimensions 14 cm × 14 cm × 15 cm?
(1 point)
Responses
2,940 cm3
2,940 cm cubed
1,204 cm3
1,204 cm cubed
210 cm3
210 cm cubed
2,744 cm3
2,744 cm cubed
Question 1
The volume of a kitchen cabinet measuring 12 inches deep, 36 inches long, and 40 inches tall is calculated as:
Volume = Depth x Length x Height = 12 in x 36 in x 40 in = 17,280 in^3
Therefore, the volume of the kitchen cabinet is 17,280 in^3.
Question 2
The volume of the rectangular prism with dimensions 9 mm x 4 mm x 19 mm is calculated as:
Volume = Length x Width x Height = 9 mm x 4 mm x 19 mm = 684 mm^3
Therefore, the volume of the rectangular prism is 684 mm^3.
Question 3
The volume of the storage bench with dimensions 17 in. x 54 in. x 18 in. is calculated as:
Volume = Length x Width x Height = 17 in x 54 in x 18 in = 16,524 in^3
Therefore, the volume of the storage bench is 16,524 in^3.
Question 4
Using the volume formula, the volume of an alphabet block cube with a side length of 2 in. is calculated as:
Volume = Side Length^3 = 2 in^3 = 8 in^3
Therefore, the volume of the alphabet block cube is 8 in^3.
Question 5
The volume of the wrapped present with dimensions 14 cm x 14 cm x 15 cm is calculated as:
Volume = Length x Width x Height = 14 cm x 14 cm x 15 cm = 2,940 cm^3
Therefore, the volume of the wrapped present is 2,940 cm^3.