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Short answer, yes. Long answer, a triangular prism has two triangular faces, its bases, and three rectangular faces, its sides, which connect the two faces. Unfolding the prism into a net reveals a rectangle divided into three rectangular sections (these are the three rectangular faces) and two congruent triangles attached along a common edge to one of these rectangles (these are the two triangular faces).
Long and rectangular.
The volume of the prism (not prisim) depends on its shape. Information about the dimensions (not demensions) is not enough without knowing the shape of the cross section: circular, triangular, rectangular etc.
The perimeter is not sufficient information to determine the area. First of all, there is no reason to suppose that the shape is rectangular as opposed to circular or triangular or some other simple or complicated shape. Furthermore, even if it were rectangular, there are infinitely many possible answers: ranging from a nearly square area to an extremely long, very thin strip.
it is long and rectangular and it is only 4 inches wide!
Square sails are not truly square but rectangular with a longer long side on the bottom perimeter of the sail. They were and are referred to as "four-cornered" sails.
this is called a pennant.
The general shape of onion cells are usually: A long / thing oval.
56
1 acre = 43,560 square feet = 4,840 square yardsAn acre of land can be round, oval, square, rectangular, triangular, hexagonal, or irregular. Knowing the area doesn't tell what the shape is. In fact, it can be any shape; so long as it has a total area of 43,560 square feet, it is one acre.
Assuming that the shape is rectangular, he perimeter is 2*(45 + 41) = 172 m.Incidentally, conventionally the longer side is called the lengths.
First of all, there is no reason to suppose that the area is rectangular as opposed to circular or triangular or some other simple or complicated shape. Even if you assume that it is a rectangle, there are infinitely many possible answers: ranging from nearly square areas to extremely long very thin strips.