1 Answer

Milissa · Answer 1 · 2023-08-10T01:29:57+0000

The Solution.

By applying Pythagoras Theorem on the right-angled triangle ODB, we can find length OD.

$\begin{gathered} |\text{OB}|^2=|OD|^2+|DB|^2 \\ 7.1^2=|OD|^2+6^2 \end{gathered}$
50.41-36=|OD|^2

$\begin{gathered} |OD|^2=14.41 \\ \text{Taking the square root of both sides, we get} \\ |OD|=\sqrt[]{14.41}=3.796 \end{gathered}$

Similarly, considering the right-angled triangle ODA, we can find the value of x as below:

$\begin{gathered} |OA|^2=|AD|^2+|OD|^2 \\ 7.1^2=x^2+3.796^2 \end{gathered}$
50.41=x^2+14.41

$\begin{gathered} 50.41-14.41=x^2 \\ x^2=36 \\ \text{Taking the square root of both sides, we get} \\ x=\sqrt[]{36}=6 \end{gathered}$

Hence, the correct answer is 6.

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