Answer:
Using your answer choices, (3, 0) satisfies the resulting equation.
Explanation:
Even if we did not know the choices, we can still use algebra to find the coordinate point(s). We can use the distance formula.
d = √[(x1 - x2)2 + (y1 - y2)2]
where:
d = distance
(x1 , y1) and (x2 , y2) are given points.
Since we need to find the point that has he same distance between the points, we will use the distance formula and equated them.
Let (x3, y3) be the point we need to find. So by using the distance formula, we have
√[(0 - x3)2 + (-4 - y3)2] = √[(-2 - x3)2 + (0 - y3)2]
Squaring both sides of the equation leaves us with
x32 + (-4 - y3)2 = (-2 - x3)2 + y32
x32 + (-4 - y3)(-4 - y3) = (-2 - x3)(-2 - x3) + y32
x32 + 16 + 8y3 + y32 = 4 + 4x3 + x32 + y32
Eliminating x32 and y32
16 + 8y3 = 4 + 4x3
Move all the terms to the left side of equation to make the right side equal to zero.
16 + 8y3 - 4 - 4x3 = 0
12 + 8y3 - 4x3 = 0
Factoring, we get
4(3 + 2y3 - x3) = 0
3 + 2y3 - x3 = 0
2y3 - x3 = -3
Using your answer choices, (3, 0) satisfies the resulting equation.