Reading...
Play button
Play button
Use LEFT and RIGHT arrow keys to navigate between flashcards;
Use UP and DOWN arrow keys to flip the card;
H to show hint;
A reads text to speech;
18 Cards in this Set
- Front
- Back
|
A cube with side length 1 unit, called a _____ ______ is said to have one cubic unit of volume.
|
A cube with a side length 1 unit, called a unit cube is said to have one cubic unit of volume.
|
|
|
What is the use of a unit cube?
|
A unit cube is used to measure volume of a 3-dimensional shape.
|
|
|
A solid figure which can be packed without gaps or overlaps using n unit cubes is said to have a volume of ______ cubic units.
|
A solid figure can be packed without gaps or overlaps using n unit cubes is said to have a volume of n cubic units.
|
|
Using the formula V= l x w x h, where l=length, w=width and h=height, find the area of the rectangular prism.
|
V = l x w x h
V = 6ft x 3ft x 2ft V=36 cubic ft |
|
Using the formula V= l x w x h, where l=length, w=width and h=height, find the area of the rectangular prism.
|
V = l x w x h
V = 4cm x 6cm x 5cm V=120 cubic cm |
|
Using the formula V= l x w x h, where l=length, w=width and h=height, find the area of the rectangular prism.
|
V = l x w x h
V = 5m x 4m x 3m V = 60 cubic m |
|
Using the formula V= b x h where b=area of base and h=height, find the area of the rectangular prism.
|
V = b x h
V = (l x w) x h V = (9cm x 16cm) x 6cm V= 144 square cm x 6 cm V = 864 cubic cm |
|
Using the formula V= b x h where b=area of base and h=height, find the area of the rectangular prism.
|
V = b x h
V = (l x w) x h V = (2ft x 2ft) x 2ft V = 4 square ft x 2ft V = 8 cubic ft |
|
Using the formula V= b x h where b=area of base and h=height, find the area of the rectangular prism.
|
V = b x h
V = (l x w) x h V = (7in x 30in) x 6 in V= 210 square in x 6 in V = 1260 cubic in |
|
To find the area of this entire figure, we can split the figure into two non-overlapping rectangular prisms, find each prism's area, and _____________.
|
To find the area of this entire figure, we can split the figure into two non-overlapping rectangular prisms, find each prism's area, and add them together.
|
|
Find the volume of this entire figure by adding together the volumes of two smaller figures.
|
V= l x w x h
V= 9cm x 2cm x 5cm V= 90 cubic cm V = l x w x h V = 1cm x 2cm x 5cm V= 10 cubic cm V= 90 cubic cm + 10 cubic cm V= 100 cubic cm |
|
Find the volume of this entire figure by adding together the volumes of two smaller figures.
|
V= l x w x h
V = 4in x 5in x 3in V = 60 cubic in V = l x w x h V = 2in x 5in x 6in V = 60 cubic in V = 60 cubic in + 60 cubic in V = 120 cubic in |
|
Count the unit cubes to find the volume of the figure.
|
V= 4 cubic units
|
|
Count the unit cubes to find the volume of the figure.
|
V = 5 cubic units
|
|
Count the unit cubes to find the volume of the figure.
|
V= 4 cubic units
|
|
How many of the smaller cubes can fit into this rectangular prism?
|
72 cubes
|
|
How many of the smaller cubes can fit into the larger rectangular prism?
|
32 cubes
|
|
How many of the smaller cubes can fit into the larger rectangular prism?
|
90 cubes
|
