Find the perimeter of the triangles whose vertices have the following coordinates $(3, 10), (5, 2), (14, 12)$ .

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Solution

We know that the distance between the two points $(x_{1}, y_{1})$ and $(x_{2}, y_{2})$ is
$d = \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}}$

Let the given vertices be $A = (3, 10)$ , $B = (5, 2)$ and $C = (14, 12)$

We first find the distance between $A = (3, 10)$ and $B = (5, 2)$ as follows:

$A B = \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}} = \sqrt{{(5 - 3)}^{2} + {(2 - 10)}^{2}} = \sqrt{2^{2} + {(- 8)}^{2}} = \sqrt{4 + 64} = \sqrt{68}$

Similarly, the distance between $B = (5, 2)$ and $C = (14, 12)$ is:

$B C = \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}} = \sqrt{{(14 - 5)}^{2} + {(12 - 2)}^{2}} = \sqrt{9^{2} + 10^{2}} = \sqrt{81 + 100} = \sqrt{181}$

Now, the distance between $C = (14, 12)$ and $A = (3, 10)$ is:

$C A = \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}} = \sqrt{{(14 - 3)}^{2} + {(12 - 10)}^{2}} = \sqrt{11^{2} + 2^{2}} = \sqrt{121 + 4} = \sqrt{125}$

Since the perimeter $P$ of a triangle $A B C$ is $A B + B C + C A$ , therefore,

$P = \sqrt{68} + \sqrt{181} + \sqrt{125}$

Hence, the perimeter of the triangle is $\sqrt{68} + \sqrt{181} + \sqrt{125}$ units.

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