![]() How do you reflect shapes in the axis? To reflect shapes in an axis, apply the appropriate reflection rule (e.g., x-axis or y-axis) to all the points of the shape. What is the Reflectional symmetry of a triangle? A triangle can have 0, 1, 2, or 3 lines of reflectional symmetry, depending on its shape. How many reflections does a triangle have? A triangle can have multiple reflections, depending on the axes or lines chosen for reflection. What is the reflection of (-3, 0) over the x-axis? The reflection of (-3, 0) over the x-axis is (-3, 0). What is the reflection about the line x = -3? The reflection about the line x = -3 involves swapping x-coordinates and then possibly shifting the shape based on the distance from the line. What is 3/4 reflected across the x-axis? The reflection of 3/4 across the x-axis is -3/4. How do you reflect over x = 4? To reflect over x = 4, apply the reflection rule (x, y) → (8 – x, y) to mirror the shape with respect to the line x = 4. How do you translate over the x-axis? To translate over the x-axis, keep the y-coordinates the same and change the x-coordinates according to the desired shift. What are the two rules of reflection? The two common rules of reflection are over the x-axis and y-axis. What are the four rules of reflection? There are four common reflection rules: over the x-axis, y-axis, a vertical line (x = a), and a horizontal line (y = b). What is the formula for the triangle puzzle? There isn’t a specific formula for a triangle puzzle, as it depends on the puzzle’s rules and design. ![]() Reflection typically involves changing the signs of coordinates or swapping them based on the line or axis of reflection. What is the rule 3 of reflection? There isn’t a universally recognized “rule 3” of reflection in geometry. How do you reflect a shape over an equation? To reflect a shape over an equation (e.g., a line), follow the appropriate reflection rule for that line. How do you calculate reflection? Reflection involves changing the signs of coordinates based on the axis or line of reflection and possibly shifting the shape. How do you reflect a shape over Y = -2? To reflect over Y = -2, apply the reflection rule (x, y) → (x, -y) and then shift the resulting shape 2 units downward. ![]() What is the reflection of a triangle? The reflection of a triangle is a transformation that creates a mirror image of the original triangle by changing the sign of one or both coordinates. How do you reflect a triangle over the origin? To reflect a triangle over the origin, apply the reflection rules for both x-axis and y-axis: (x, y) → (-x, -y). What is the reflection of (2, 3) in the x-axis? The reflection of (2, 3) in the x-axis is (2, -3). How do you reflect over x = -1? To reflect over x = -1, apply the reflection over the y-axis (x, y) → (-x, y) first, and then shift the resulting shape 1 unit to the left. What are the rules for reflections over axes? The rules for reflections over the axes involve changing the sign of one coordinate while keeping the other coordinate the same. How to do reflections with triangles? To reflect a triangle, apply the appropriate reflection rule (e.g., over x-axis, y-axis, or a specific line) to each vertex of the triangle. How do you reflect a shape over Y = -X? To reflect a shape over the line Y = -X, swap the x and y coordinates: (x, y) → (y, x). What is the formula for reflection over X? The formula for reflection over the x-axis is (x, y) → (x, -y). How do you reflect a triangle over x = -2? To reflect a triangle over the line x = -2, apply the rule for reflection over the y-axis (x, y) → (-x, y) first, and then shift the resulting triangle 2 units to the left. What is the rule for a reflection over the x-axis (X Y →)? The rule is to change the sign of the y-coordinate while keeping the x-coordinate the same: (x, y) → (x, -y). How do I reflect a triangle over the x-axis? To reflect a triangle over the x-axis, you can simply change the sign of the y-coordinates of its vertices. ![]() Triangle Reflection over X-Axis X1: Y1: X2: Y2: X3: Y3: Reflect X1′ Y1′ X2′ Y2′ X3′ Y3′ FAQs It’s a simple geometric operation commonly used in geometry and mathematics. This transformation creates a mirror image of the original triangle with respect to the x-axis. To reflect a triangle over the x-axis, invert the signs of its y-coordinates while keeping the x-coordinates unchanged.
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