Answer: the correct option is (B) 8.5.
Step-by-step explanation: Given that AK= 14, EK=17 and BK= 7 in the figure shown.
We are to find the length of DK.
From the figure, we note that
AD and BE are two chords of a circle intersecting at the point K.
We will be using the following theorem :
Intersecting Chord Theorem : When two chords intersect each other inside a circle, then the products of their segments are equal.
Applying the above theorem in the given circle, we get
[tex]AK\times DK=BK\times EK\\\\\\\Rightarrow DK=\dfrac{BK\times EK}{AK}\\\\\\\Rightarrow DK=\dfrac{7\times 17}{14}\\\\\\\Rightarrow DK=\dfrac{17}{2}\\\\\Rightarrow DK=8.5.[/tex]
Thus, the length of DK is 8.5 units.
Option (B) is CORRECT.
