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Refléter la lettre C sur les axes x et y

Apprends à tracer un C en bloc, à étiqueter ses coordonnées et à le réfléchir sur l’axe x et l’axe y à l’aide des règles de coordonnées.

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Problem

Reflect a block letter CC on the Cartesian plane. Use the original points of the letter CC, then find its reflection across the xx-axis and across the yy-axis.

Step 1: Choose Points for the Original Figure

To begin the reflection task, the letter CC needs fixed points on the Cartesian plane before any flipping can happen.

A neat block letter CC can use the following points:

A(4,4), B(2,4), C(2,2), D(2,2), E(2,2), F(2,2), G(2,4), H(4,4)A(-4,4),\ B(2,4),\ C(2,2),\ D(-2,2),\ E(-2,-2),\ F(2,-2),\ G(2,-4),\ H(-4,-4)

Step 2: Connect the Points into Letter C

With the original coordinates chosen, the points are connected in order to form a block letter CC instead of a loose set of dots.

Connect the points as follows:

ABCDEFGHA \to B \to C \to D \to E \to F \to G \to H

This creates the original block letter CC.

Step 3: Use the xx-Axis Reflection Rule

Reflecting across the xx-axis keeps each xx-coordinate the same and changes each yy-coordinate to its opposite.

The rule is:

(x,y)(x,y)(x,y) \to (x,-y)

Step 4: Reflect the Letter Across the xx-Axis

Using the xx-axis reflection rule, each point keeps its horizontal position but flips to the opposite vertical position.

The reflected points are:

A(4,4), B(2,4), C(2,2), D(2,2)A'(-4,-4),\ B'(2,-4),\ C'(2,-2),\ D'(-2,-2) E(2,2), F(2,2), G(2,4), H(4,4)E'(-2,2),\ F'(2,2),\ G'(2,4),\ H'(-4,4)

Step 5: Use the yy-Axis Reflection Rule

Reflecting across the yy-axis changes each xx-coordinate to its opposite and keeps each yy-coordinate the same.

The rule is:

(x,y)(x,y)(x,y) \to (-x,y)

Step 6: Reflect the Letter Across the yy-Axis

Using the yy-axis reflection rule, each point keeps its vertical position but moves to the opposite horizontal position.

The reflected points are:

A(4,4), B(2,4), C(2,2), D(2,2)A''(4,4),\ B''(-2,4),\ C''(-2,2),\ D''(2,2) E(2,2), F(2,2), G(2,4), H(4,4)E''(2,-2),\ F''(-2,-2),\ G''(-2,-4),\ H''(4,-4)

Step 7: Final Answer

The original letter CC has coordinates:

A(4,4), B(2,4), C(2,2), D(2,2), E(2,2), F(2,2), G(2,4), H(4,4)A(-4,4),\ B(2,4),\ C(2,2),\ D(-2,2),\ E(-2,-2),\ F(2,-2),\ G(2,-4),\ H(-4,-4)

The reflection across the xx-axis is:

A(4,4), B(2,4), C(2,2), D(2,2), E(2,2), F(2,2), G(2,4), H(4,4)A'(-4,-4),\ B'(2,-4),\ C'(2,-2),\ D'(-2,-2),\ E'(-2,2),\ F'(2,2),\ G'(2,4),\ H'(-4,4)

The reflection across the yy-axis is:

A(4,4), B(2,4), C(2,2), D(2,2), E(2,2), F(2,2), G(2,4), H(4,4)A''(4,4),\ B''(-2,4),\ C''(-2,2),\ D''(2,2),\ E''(2,-2),\ F''(-2,-2),\ G''(-2,-4),\ H''(4,-4)

Concepts

Rigid Motions

Translations, reflections, and rotations on the coordinate plane, described by coordinate rules. These transformations preserve distances and angle measures, so the image is congruent to the original. Includes compositions of multiple transformations.

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