Mike says the shape shown has 1 line of symmetry. Russell says the shape shown has no lines of symmetry. Who is correct?
Answers
Answer:
You can find if a shape has a Line of Symmetry by folding it. When the folded part sits perfectly on top (all edges matching), then the fold line is a Line of Symmetry.
The four main types of this symmetry are translation, rotation, reflection, and glide
Step-by-step explanation:
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Answer:
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.Example:
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.Example:When we divide the figure with Line \greenD{A}Astart color #1fab54, A, end color #1fab54, the resulting two parts are mirror images of each other:
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.Example:When we divide the figure with Line \greenD{A}Astart color #1fab54, A, end color #1fab54, the resulting two parts are mirror images of each other:An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.Example:When we divide the figure with Line \greenD{A}Astart color #1fab54, A, end color #1fab54, the resulting two parts are mirror images of each other:An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.Example:When we divide the figure with Line \greenD{A}Astart color #1fab54, A, end color #1fab54, the resulting two parts are mirror images of each other:An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.Line \greenD{A}Astart color #1fab54, A, end color #1fab54 is a line of symmetry.
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.Example:When we divide the figure with Line \greenD{A}Astart color #1fab54, A, end color #1fab54, the resulting two parts are mirror images of each other:An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.Line \greenD{A}Astart color #1fab54, A, end color #1fab54 is a line of symmetry.Want to learn more about lines of symmetry? Check out this video.
A \greenD{\text{line of symmetry}}line of symmetrystart color #1fab54, start text, l, i, n, e, space, o, f, space, s, y, m, m, e, t, r, y, end text, end color #1fab54 is a line where we can fold the image and have both halves match exactly.Example:When we divide the figure with Line \greenD{A}Astart color #1fab54, A, end color #1fab54, the resulting two parts are mirror images of each other:An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.An isosceles triangle with a line labeled A that passes through the vertex joining the equal length sides to the center of the third side.Line \greenD{A}Astart color #1fab54, A, end color #1fab54 is a line of symmetry.Want to learn more about lines of symmetry? Check out this video.Symmetrical figures
Step-by-step explanation:
Russell says the shape shown has no lines of symmetry. Who is correct? ... folded part sits perfectly on top (all edges matching), then the fold line is a Line of Symmetry.
6 votes
Answer:You can find if a shape has a Line of Symmetry by folding it. When the folded part sits perfectly on top (all edges matching), then the fold line .
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