The vertices of a triangle are $A(1,1),B(4,5)$ and $C(6,13)$ . Find $cosA$ .

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Solution

Step 1: Use distance formula and find the length of each sides of the triangle
First we find the value of $a,b,c$ .
In $△ ABC$ we know that $a=BC,b=CA,c=AB$
We find $a,b,c$ by using distance formula
Distance formula : We find the distance of two points ${A(x}_{1} {,y}_{1})$ and point ${B(x}_{2} {,y}_{2})$ like this
$AB= \sqrt{{{(x_{2} {-x}_{1})}^{2} {+(y}_{2} {-y}_{1})}^{2}}$
$a=BC= \sqrt{{(6 - 4)}^{2} + {(13 - 5)}^{2}} = \sqrt{2^{2} + 8^{2}} = \sqrt{4 + 64} = \sqrt{68}$
$b=CA= \sqrt{{(6 - 1)}^{2} + {(13 - 1)}^{2}} = \sqrt{5^{2} + 12^{2}} = \sqrt{25 + 144} = \sqrt{169} =13$
$c=AB= \sqrt{{(4 - 1)}^{2} + {(5 - 1)}^{2}} = \sqrt{3^{2} + 4^{2}} = \sqrt{9 + 16} = \sqrt{25} =5$
Step 2: Use cosine rule
We have a formula to find $cosA= \frac{b^{2} {+c}^{2} {-a}^{2}}{2 bc}$
Now we put the values of $a, b$ and $c$ in the above formula
$\begin{array}{rcl} \cos A & = & \frac{13^{2} + 5^{2} - {(\sqrt{68})}^{2}}{2 \times 13 \times 5} \\ = & \frac{169 + 25 - 68}{130} \\ = & \frac{126}{130} \end{array}$
$= \frac{63}{65}$
Hence, $\cos A = \frac{63}{65}$

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