Given an cuboid whose dimensions are 5,8,2
Indicate whether it is true or false:
To calculate the surface of the cuboid it is not necessary to know which are the sides of the base and which is the height.
Given an cuboid whose dimensions are 5,8,2
Indicate whether it is true or false:
To calculate the surface of the cuboid it is not necessary to know which are the sides of the base and which is the height.
Which dimensions may represent a cuboid?
Given an cuboid whose dimensions are 5,8,2
Indicate whether it is true or false:
To calculate the surface of the cuboid it is not necessary to know which are the sides of the base and which is the height.
To solve this problem, we begin by calculating the surface area of the cuboid using its dimensions. The surface area formula for a cuboid is:
Substituting the dimensions 5, 8, and 2 into the formula, we calculate:
Regardless of the assignment of dimensions as length, width, or height (due to the commutative nature of multiplication), the computed surface area remains the same at 132 square units.
Thus, it is indeed true that determining which dimensions are the base or height is unnecessary for calculating a cuboid's surface area. The computation yields consistent results irrespective of the assignment.
Therefore, the statement is true.
True
Which dimensions may represent a cuboid?
There is no limitation or rule regarding the dimensions that a cuboid can have.
Therefore the correct answer is D.
All of the above.