Question

A tessellation, like a mosaic, covers a plane with the same shapes over and over again without any overlaps or gaps. Study the tessellation shown here and answer the questions.

A tesellation, like a mosaic, covers a plane with the same shapes over again and again without any overlaps and gaps.

Six pairs of figures are marked in the tessellation. Identify which of these pairs of figures are reflections of each other.

Answer 1

You can create figure A′ by flipping figure A over its leftmost side. So A and A′ are reflections of each other.

You cannot create figure B′ by flipping figure B over any of its sides. So B and B′ are not reflections of each other.

You can create figure C′ by flipping figure C over its rightmost side. So C and C′ are reflections of each other.

You can create figure D′ by flipping figure D over its leftmost side. So D and D′ are reflections of each other.

You cannot create figure E′ by flipping figure E over any of its sides. So E and E′ are not reflections of each other.

You cannot create figure F′ by flipping figure F over any of its sides. So F and F′ are not reflections of each other.

Explanation:

thats the ¨sample answer¨ from plato

Answer 2

Figure A, C, and D

Explanation:

Reflection is the mirror image of a shape. Every point in a figure is at equidistant from each corresponding point in another figure from the line of reflection.