例句與造句

1. The megalith has an oblate rectangular cuboid shape.
2. :: Sorry, my bad, it's just rectangular cuboids instead of general cuboids.
3. "' Park Towne Place Apartment Homes "'is a historic apartment complex located in the rectangular cuboids.
4. The number of different simple cube is 11, however this number increases significantly to 54 for a rectangular cuboid of 3 different lengths.
5. How do you calculate the length, width, and height of a rectangular cuboid when given the coordinates of two diagonally opposite corners?
6. It's difficult to find rectangular cuboid in a sentence. 用rectangular cuboid造句挺難的
7. Clearly the area of two similar rectangles varies by the square of their scaling factor and the volume of two similar rectangular cuboids varies by the cube of their scaling factor.
8. Along with the rectangular cuboids, any parallelepiped is a cuboid of this type, as is a square frustum ( the shape formed by truncation of the apex of a square pyramid ).
9. A rectangular cuboid, also called a " rectangular parallelepiped " or sometimes simply a " cuboid ", is a parallelepiped of which all faces are rectangular; a cube is a cuboid with square faces.
10. Unlike the case of squaring the square, a hard but solvable problem, there is no perfect cubed cube and, more generally, no dissection of a rectangular cuboid " C " into a finite number of unequal cubes.
11. If we don't assume the edges are parallel to the axes, then we would need to know what they are parallel to, in order to solve it . ( An interesting problem would be if you also knew the volume, and from that and the opposite corner points, had to figure out the dimensions of a rectangular cuboid . ) talk ) 21 : 59, 30 May 2015 ( UTC)
12. Any proof that a particular subset " P " of  ! 3 has a given volume will use constructions which can eventually be traced back to rectangular cuboids, and so a parallel proof for the volume of a subset " Q " which is similar to " S " but scaled by a factor of " s " can be made using rectangular cuboids similar to those used in demonstrating the volume of " S ", scaled by the same factor " s ".
13. Any proof that a particular subset " P " of  ! 3 has a given volume will use constructions which can eventually be traced back to rectangular cuboids, and so a parallel proof for the volume of a subset " Q " which is similar to " S " but scaled by a factor of " s " can be made using rectangular cuboids similar to those used in demonstrating the volume of " S ", scaled by the same factor " s ".
14. Note that most of this describes the general behavior that the area ( or volume ) concept must obey, but that it also includes the stipulation that the area ( or volume ) of a rectangle ( or rectangular cuboid ) is what we expect; that is, a rectangle of dimensions " a " and " b " has area " ab " and a rectangular cuboid of dimensions " a ", " b " and " c " has volume " abc ".
15. Note that most of this describes the general behavior that the area ( or volume ) concept must obey, but that it also includes the stipulation that the area ( or volume ) of a rectangle ( or rectangular cuboid ) is what we expect; that is, a rectangle of dimensions " a " and " b " has area " ab " and a rectangular cuboid of dimensions " a ", " b " and " c " has volume " abc ".