If $(- 4, 3)$ and $(4, 3)$ are two vertices of an equilateral triangle, find the coordinates of the third vertex, given that the origin lies in the interior of the triangle.

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Solution

Step 1: Solve for the $x -$ coordinate of third vertex:
Given two vertices of an equilateral triangle are $A (- 4, 3)$ and $B (4, 3)$
Let the third vertex be $C (x, y)$
We know that the distance between two points $(x_{1}, y_{1}), (x_{2}, y_{2}) = \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}}$
Therefore,
Distance between $(x, y), (4, 3)$ is $= \sqrt{{(x - 4)}^{2} + {(y - 3)}^{2}}$ … $[1]$
Distance between $(x, y), (- 4, 3)$ is $= \sqrt{{(x + 4)}^{2} + {(y - 3)}^{2}}$ … $[2]$
Distance between $(4, 3), (- 4, 3)$ is $\sqrt{{(4 + 4)}^{2} + {(3 - 3)}^{2}} = \sqrt{{(8)}^{2}} = 8$
Given that the triangle is equilateral $\Rightarrow A B = B C = C A$
Consider $A C = B C$
$\sqrt{{(x + 4)}^{2} + {(y - 3)}^{2}}$ $= \sqrt{{(x - 4)}^{2} + {(y - 3)}^{2}}$
Squaring on both sides, we get,
${(x + 4)}^{2} + {(y - 3)}^{2}$ $= {(x - 4)}^{2} + {(y - 3)}^{2}$
$\Rightarrow {(x - 4)}^{2} = {(x + 4)}^{2} \Rightarrow x^{2} - 8 x + 16 = x^{2} + 8 x + 16 \Rightarrow 16 x = 0 \Rightarrow x = 0$
Step 2: Solve for the y-coordinate of third vertex:
Consider $B C = A B$
$\sqrt{{(x - 4)}^{2} + {(y - 3)}^{2}} = 8$
$\Rightarrow$ ${(x - 4)}^{2} + {(y - 3)}^{2} = 64$ … $[3]$
Substituting the value of $x$ in $[3]$
$\Rightarrow {(0 - 4)}^{2} + {(y - 3)}^{2} = 64 \Rightarrow {(y - 3)}^{2} = 64 - 16 \Rightarrow {(y - 3)}^{2} = 48 \Rightarrow (y - 3) = \pm 4 \sqrt{3} \Rightarrow y = 3 + 4 \sqrt{3}, 3 - 4 \sqrt{3}$
Consider $y = 3 - 4 \sqrt{3}$ because it is given that origin is interior of triangle.
Hence the co-ordinates of the third vertex is $(0, 3 - 4 \sqrt{3})$ .

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