Hello there. To solve this question, we have to remember some properties about circles and theorems relating chords.
Given the following diagram:
And the lengths of AP = 3.5, PD = 6 and PC = 4, we want to determine BP and BC.
Okay. First, we'll need the following theorem:
The theorem says that for the chords AC and BD, intersecting at E, it is true that
[tex]AE\cdot EC=BE\cdot ED[/tex]
In this case, we have the lengths of three of the factors, therefore:
[tex]BP\cdot PC=AP\cdot PD[/tex]
Plugging the values, we get
[tex]BP\cdot4=3.5\cdot6[/tex]
Divide both sides of the equation by a factor of 4
[tex]BP=3.5\cdot\dfrac{6}{4}=3.5\cdot1.5=5.25[/tex]
Finally, we know that
[tex]BC=BP+PC[/tex]
Hence we get
[tex]BC=5.25+4=9.25[/tex]
These are the answers to this question.
