Answer:
Statement of triangle proportionality:
If a line parallel to one side of a triangle intersects the other two sides of the triangle, then that line divides these two sides proportionally.
From the statement: If [tex]FG || BC[/tex] then,
Show that: [tex]\frac{FB}{FA} = \frac{GC}{AG}[/tex]
Consider [tex]\triangle ABC[/tex] and [tex]\triangle GFA[/tex]
Reflexive property states that the value is equal to itself.
[tex]\angle BAC \cong \angle GAF[/tex] [Angle] {Reflexive property of equality}
Corresponding angles theorem states that if the two parallel lines are cut by a transversal, then the pairs of corresponding angles are congruent(i., e equal).
[tex]\angle ABC \cong \angle GFA[/tex] [Angle]
[tex]\angle ACB \cong \angle AGF[/tex] [Angle]
AA Similarity states that the two triangles have their corresponding angles equal if and only if their corresponding sides are proportional.
then, by AA similarity theorem:
[tex]\triangle ABC \sim \triangle GFA[/tex]
By segment addition postulates:
AB = FA +FB and AC = AG + GC
Corresponding sides in similar triangles are proportional
[tex]\frac{AB}{FA} = \frac{AC}{AG}[/tex] .....[1]
Substitute AB = FA +FB and AC = AG + GC in [1]
we have;
[tex]\frac{FA+FB}{FA} = \frac{AG+GC}{AG}[/tex]
Separate the fraction:
[tex]\frac{FA}{FA} + \frac{FB}{FA} = \frac{AG}{AG} + \frac{GC}{AG}[/tex]
Simplify:
[tex]1 + \frac{FB}{FA} =1+ \frac{GC}{AG}[/tex]
Subtract 1 from both sides we get;
[tex]\frac{FB}{FA} =\frac{GC}{AG}[/tex] hence proved
