Triangle ABC is reflected across the x-axis. If the coordinates of the original shape are A (-4, -1), B (-5, -2) and C (-10, -1), what are the coordinates of A, B and C

Question

Triangle ABC is reflected across the x-axis. If the coordinates of the original shape are A (-4, -1), B (-5, -2) and C (-10, -1),  what are the coordinates of A, B and C

GPT-4o mini · Answer

When a point $(x, y)$ is reflected across the x-axis, the new coordinates become $(x, -y)$. Let's reflect each point of triangle ABC across the x-axis: 1. For point A $(-4, -1)$: $$ A' = (-4, -(-1)) = (-4, 1) $$ 2. For point B $(-5, -2)$: $$ B' = (-5, -(-2)) = (-5, 2) $$ 3. For point C $(-10, -1)$: $$ C' = (-10, -(-1)) = (-10, 1) $$ Thus, the coordinates of the reflected points are: - A' = $(-4, 1)$ - B' = $(-5, 2)$ - C' = $(-10, 1)$ So the coordinates of points A, B, and C after reflection are: - A' = $(-4, 1)$ - B' = $(-5, 2)$ - C' = $(-10, 1)$