Question

Which transformation will map figure L onto figure L'? (1 point)

Two congruent triangles figure L and figure L prime are drawn on a coordinate grid. Figure L has vertices at negative 4, 2, neg

Horizontal translation of 8 units
Horizontal translation of 6 units
Reflection across x-axis
Reflection across y-axis

Answer 1

please help

Answer 2

ℌ𝔬𝔯𝔦𝔷𝔬𝔫𝔱𝔞𝔩 𝔱𝔯𝔞𝔫𝔰𝔩𝔞𝔱𝔦𝔬𝔫 𝔬𝔣 6 𝔲𝔫𝔦𝔱𝔰 𝔟𝔢𝔠𝔞𝔲𝔰𝔢 𝔄 𝔥𝔬𝔯𝔦𝔷𝔬𝔫𝔱𝔞𝔩 𝔱𝔯𝔞𝔫𝔰𝔩𝔞𝔱𝔦𝔬𝔫 𝔬𝔣 𝔣𝔲𝔫𝔠𝔱𝔦𝔬𝔫 𝔶=𝔣(𝔵) 𝔟𝔶 𝔥 𝔲𝔫𝔦𝔱𝔰 𝔦𝔰 𝔴𝔯𝔦𝔱𝔱𝔢𝔫 𝔶=𝔣(𝔵-𝔥). ​ℑ𝔣 𝔥>0, 𝔱𝔥𝔢𝔫 𝔱𝔥𝔢 𝔤𝔯𝔞𝔭𝔥 𝔪𝔬𝔳𝔢𝔰 𝔯𝔦𝔤𝔥𝔱. ​𝔶=𝔣(𝔵-6), 𝔱𝔥𝔢 𝔤𝔯𝔞𝔭𝔥 𝔢𝔫𝔡𝔰 𝔲𝔭 𝔪𝔬𝔳𝔦𝔫𝔤 6 𝔲𝔫𝔦𝔱𝔰 𝔱𝔬 𝔱𝔥𝔢 𝔯𝔦𝔤𝔥𝔱.

Answer 3

Ok so it said L and L' are congruent so,

L contains vertices at -4, 2 -2, 4 and -3, 7
L''s vertices are at 2, 2, 4, 4, and 3, .....

Comparing vertices that corresponding with vertices we find, y coordinate stays the same for every vertices,

However, x coordinate vertices we find the y coordinate -4 changes to 2, -2 which becomes 4, and -3 which becomes 3

This means the starting x coordinate is getting bigger by 6 units to get L'

there's a horizontal translation of 6 units.

this would create (-4,2) to (2,2), (-2,4) to (4,4) and (-3,7) to (3,7) as you know

So what is the correct answer?

Sorry I took long I was multi tasking doing this my own work talking in the 10 chats and my DM's