Use the image to answer the question.
A coordinate plane shows two pentagons in quadrants 2 and 4. The horizontal axis ranges from negatives 5 to 5 in unit increments. The vertical axis ranges from negative 4 to 4 in unit increments. Five points labeled upper A upper B upper C upper D upper E form a solid line pentagon. The unmarked approximate coordinates are as follows: upper A is at left parenthesis negative 3 comma 4 right parenthesis, upper B is at left parenthesis negative 5 comma 3 right parenthesis, upper C is at left parenthesis negative 4 comma 1 right parenthesis, upper D is at left parenthesis negative 2 comma 2 right parenthesis, and upper E is at left parenthesis negative 2 comma 3 right parenthesis. The pentagon forms an angle upper A of 108.4 degrees between upper A B and upper A E, an angle upper B of 90 degrees between upper A B and upper B C, an angle upper C 90 degrees between upper B C and upper C D, an angle upper D of 116.6 degrees between upper C D and upper D E, and an angle upper E of 135 degrees between upper A E and upper E D. Five points labeled upper F upper G upper H upper I upper J form a dotted line pentagon. The unmarked approximate coordinates are as follows: upper F is at left parenthesis 3 comma negative 1 right parenthesis, upper G is at left parenthesis 0.9 comma negative 1.9 right parenthesis, upper H is at left parenthesis 1.9 comma negative 3.9 right parenthesis, upper I is at left parenthesis 4 comma negative 3 right parenthesis, upper J is at left parenthesis 4 comma negative 2 right parenthesis. The pentagon forms an angle upper F of 112.8 degrees between upper F G and upper F J, an angle upper G of 84.7 degrees between upper F G and upper G H, an angle upper H of 95.2 degrees between upper G H and upper H I, an angle upper I of 112.3 degrees between upper H I and upper I J, and an angle upper J of 135 degrees between upper I J and upper J F.
What type of transformation is shown?
(1 point)
Responses
This is not a transformation.
This is not a transformation.
This is a reflection.
This is a reflection.
This is a rotation.
This is a rotation.
This is a translation.