6. Each of the three vertices of a triangle is connected by n line segments to n distinct points on the opposite side (none of which is another vertex). Assuming that no three segments intersect in the same point, into how many regions do these 3n line segments divide the interior of the triangle? For example, when n= 1 there are 7 regions, as pictured below.

6. Each of the three vertices of a triangle is connected by n line segments to n distinct points on the opposite side (none of which is another vertex). Assuming that no three segments intersect in the same point, into how many regions do these 3n line segments divide the interior of the triangle? For example, when n= 1 there are 7 regions, as pictured below.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section: Chapter Questions

Problem 63RE

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(10) 6. Each of the three vertices of a triangle is connected by n line segments to n distinct points on the opposite
side (none of which is another vertex). Assuming that no three segments intersect in the same point,
into how many regions do these 3n line segments divide the interior of the triangle? For example, when
n= 1 there are 7 regions, as pictured below.

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