Answer:
J'= (-7,-4)
Step-by-step explanation:
A reflection over the y axis goes by the rule (x,y) --> (-x,y)
In triangle IJK reflected coordinates of the J' after the reflection over the y-axis is (-10, -8)
The reflection of a plane or shape is flipping the original figure with respect to a reference line.
Following steps are used to for reflecting a shape-
Given information-
The coordinates point of the triangle IJK is I(5,-8) J(10,-8) k(7,-4).
The triangle needs to be reflected over the y- axis.
As the given triangle need to be reflected over the y axis. Thus the points of x axis changed in the opposite direction and the point of y axis remain same.
The coordinates point of the triangle IJK is I(5,-8) J(10,-8) k(7,-4). Thus the reflected coordinates of I should be,
[tex]I'=I((-5),-8)\\I'=I(-5,-8)[/tex]
Thus the reflect coordinates of I is (-5, -8)
Similarly reflected coordinates of J should be,
[tex]J'=J((-10),-8)\\J'=J(-10,-8)[/tex]
Thus the reflect coordinates of J is (-10, -8)
Similarly reflected coordinates of K should be,
[tex]K'=K((-7),-4)\\I'=I(-7,-8)[/tex]
Thus the reflect coordinates of K is (-7, -4)
Thus in triangle I'J'K' reflected coordinates of the J' after the reflection over the y-axis.
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