Chapter 10.7, Problem 31HP

To determine

To explain:

The relationship shared by segments when two secants inside a circle intersect

Answer to Problem 31HP

The relationship shared by segments formed by intersecting chords is product of the parts on one intersecting chord equals the product of the parts of the other chord

Explanation of Solution

When two secants or chords intersects inside a circle, then measures of the segments of each chord multiplied with each other is equal to the product from the other chord.

Or the product of the segments on one side of intersecting chord equals the product of the parts of another side chord.

Use the following figure for more understanding:

  

Here, chord $AB$ and $CD$ intersects at point $E$ insides a circle. So, the relationship shared by segments formed by intersecting chords is given by the following expression:

  $AB\cdot EB=CE\cdot ED$