Answer:
The equation of M is [tex]y=-(x+3)^2+6[/tex]
Step-by-step explanation:
we have that
The translation of M to N is
(-1,2) ----> (4,2)
The rule of the translation M to N is
(-1,2) ----> (x+a,y+b)
(-1,2) ----> (-1+a,2+b)
so
[tex]-1+a=4[/tex] ----> [tex]a=4+1=5[/tex]
[tex]2+b=2[/tex] ----> [tex]b=0[/tex]
The rule of the translation M to N is
(x,y) ----> (x+5,y)
The translation is 5 units right
I can say that the rule of the translation N to M is
(x,y) ----> (x-5,y)
we have the equation of N
[tex]y=-(x-2)^2+6[/tex]
Is a quadratic equation open downward
The vertex is (2,6)
Find the vertex of M
Applying the rule of the translation N to M to the vertex
(2,6) ----> (2-5,6)
(2,6) ----> (-3,6)
therefore
The equation of M is
[tex]y=-(x+3)^2+6[/tex]
