Answer:
i) A. 180º rotation about the origin, ii) [tex]Q' = (4, 5)[/tex].
Step-by-step explanation:
i) In this case, we understand that vertex [tex]P = (-5,-3)[/tex] changed to [tex]P' = (5,3)[/tex] after doing an operation. At first we must calculate the distance of each point regarding origin by Pythagorean Theorem:
Point P:
[tex]OP = \sqrt{(x_{P}-x_{O})^{2}+(y_{P}-y_{O})^{2}}[/tex]
If we know that [tex]x_{P} = -5[/tex], [tex]y_{P} = -3[/tex], [tex]x_{O} = 0[/tex] and [tex]y_{O} = 0[/tex], the distance [tex]OP[/tex] is:
[tex]OP = \sqrt{(-5-0)^{2}+(-3-0)^{2}}[/tex]
[tex]OP \approx 5.831[/tex]
Point P':
[tex]OP' = \sqrt{(x_{P'}-x_{O})^{2}+(y_{P'}-y_{O})^{2}}[/tex]
If we know that [tex]x_{P'} = 5[/tex], [tex]y_{P'} = 3[/tex], [tex]x_{O} = 0[/tex] and [tex]y_{O} = 0[/tex], the distance [tex]OP'[/tex] is:
[tex]OP' = \sqrt{(5-0)^{2}+(3-0)^{2}}[/tex]
[tex]OP' \approx 5.831[/tex]
As [tex]OP = OP'[/tex], origin is the center of rotation.
Besides, [tex]P'[/tex] is a multiple of [tex]P[/tex], that is:
1) [tex](-5, -3)[/tex] Given
2) [tex]((-1)\cdot 5, (-1)\cdot 3)[/tex] [tex](-a)\cdot b = -a\cdot b[/tex]
3) [tex](-1)\cdot (5, 3)[/tex] Scalar multiplication of a vector/Result.
The value of the scalar proves that P experimented a 180º rotation about the origin. Hence, the correct answer is A.
ii) If [tex]Q = (-4, -5)[/tex] and the same operation described in item i) is used, then, the location of [tex]Q'[/tex] is:
[tex]Q' = (-1)\cdot Q[/tex]
[tex]Q' = (-1) \cdot (-4,-5)[/tex]
[tex]Q' = ((-1)\cdot (-4), (-1)\cdot (-5))[/tex]
[tex]Q' = (4, 5)[/tex]
Which corresponds to option C.
