triangle mnp is dilated according to the rule $d_{o,1.5}(x,y)\to(1.5x, 1.5y)$ to create the image triangle…

triangle mnp is dilated according to the rule $d_{o,1.5}(x,y)\to(1.5x, 1.5y)$ to create the image triangle mnp, which is not shown. what are the coordinates of the endpoints of segment mn? m(-6, 9) and n(4, 9) m(-6, 9) and n(3, 9) m(-2, 3) and n(7, 9) m(-2, 3) and n(1, 3)

triangle mnp is dilated according to the rule $d_{o,1.5}(x,y)\to(1.5x, 1.5y)$ to create the image triangle mnp, which is not shown. what are the coordinates of the endpoints of segment mn? m(-6, 9) and n(4, 9) m(-6, 9) and n(3, 9) m(-2, 3) and n(7, 9) m(-2, 3) and n(1, 3)

Answer

Explanation:

Step1: Identify coordinates of M and N

From the graph, M(-4, 6) and N(2, 6).

Step2: Apply dilation rule

For point M, $x=-4,y = 6$. New - coordinates: $x'=1.5\times(-4)=-6,y'=1.5\times6 = 9$, so $M'(-6,9)$. For point N, $x = 2,y = 6$. New - coordinates: $x'=1.5\times2=3,y'=1.5\times6 = 9$, so $N'(3,9)$.

Answer:

M'(-6, 9) and N'(3, 9)