paper
Improved Answer:-
It has line symmetry
Yes. They have equal halves when bisected.
a square or rhombus
Yes, a prism and its net are congruent figures in the sense that the net represents a two-dimensional layout of the prism's faces, and when folded, it will form the three-dimensional shape of the prism. The net includes all the faces of the prism, maintaining the same dimensions and areas. Therefore, while they exist in different dimensions (2D for the net and 3D for the prism), they are congruent in terms of their geometric properties.
Three halves in numeric form is represented as 3/2. This can also be expressed as a decimal, which is 1.5.
To draw a net for a wedge, start by visualizing the wedge as a triangular prism. Begin with a rectangle representing the base of the wedge, and then add two congruent right triangles on each end of the rectangle to represent the slanted sides. Finally, ensure that the triangles are oriented correctly to form the wedge shape when the net is folded. This will create a flat layout that can be folded into the 3D form of the wedge.
Show that, if you have two triangles, two of the sides and the angle in between are congruent.
The plural of half is halves.
The plural of half is halves.
In some cases, the folded crust can be pushed up high enough to form mountains.
Yes. They have equal halves when bisected.
Halves is a noun. It's the plural form of half.
The singular form of the plural noun halves is half.The singular possessive form is half's.example: This half's crust is burned but that half's crust is fine.
congruent congruent
a square or rhombus
china.
The singular form of halves is "half." For example, "I ate half of the pizza."
Yes, a prism and its net are congruent figures in the sense that the net represents a two-dimensional layout of the prism's faces, and when folded, it will form the three-dimensional shape of the prism. The net includes all the faces of the prism, maintaining the same dimensions and areas. Therefore, while they exist in different dimensions (2D for the net and 3D for the prism), they are congruent in terms of their geometric properties.