Question

Can someone please help me!

Triangle STU is located at S (2, 1), T (2, 3), and U (0, -1). The triangle is then transformed using the rule (x-4, y+3) to form the image S'T'U'. What are the new coordinates of S', T,' and U'? Describe what characteristics you would find if the corresponding vertices were connected with line segments.

Answer 1

@milbes919180 @ankit042

Answer 2

@kayleejones0697 @bubbles-are-cool.

Answer 3

@helpme1.2 @RatzLover95

Answer 4

@Avonniculleyy @annipuppi @anonymous97 @Batlehro13 @Compassionate @emok9893

Answer 5

i would love to help but im so bad at this i hate geometry

Answer 6

ugh ok :( @anonymous97

Answer 7

@math&ing001 @Mchilds15 @Mashy @mathmale @nylearns @NateRobinson @nightjay47 @NaomiBell1997 @Captain_Page_Turner

Answer 8

ill try

Answer 9

oh this is easy you plug in the coordinates of S T and U in the formula

Answer 10

so S' would be (-2,4)

Answer 11

does that help?

Answer 12

somewhat . thanks. @anonymous97

Answer 13

have you graphed it yet

Answer 14

To find the new coordinates for S,T, and U
just plug in the the original given coordinates for S,T, and U in the given coordinate expression
for example, let me do one for S
S = (2, 1)... 2 = x, and 1 = y,
so the given expression =
(x-4, y+3), plug the x and y for the given S coordinate
(2-4, 1+3) which equals
(-2, 4)

Now try to do T and U, using the same method