Answer:
FH = 16 units.
Step-by-step explanation:
Consider the below figure attached with this question.
Given information: In triangle FGH, GJ is an angle bisector of ∠G and perpendicular to FH.
In triangle FGJ and HGJ,
[tex]\angle FJG\cong \angle HJG[/tex] (Right angle)
[tex]GJ\cong GJ[/tex] (Reflexive property)
[tex]\angle JGF\cong \angle JGH[/tex] (Angle bisector)
Two angles and included side of one triangle is congruent to corresponding angles and side.
[tex]\triangle FGJ\cong \triangle HGJ[/tex] (By ASA)
Corresponding parts of congruent triangles are congruent.
[tex]FG\cong HG[/tex] (CPCTC)
[tex]FG=HG[/tex] (Definition of congruent segment)
[tex]3x-8=16[/tex]
[tex]3x=16+8[/tex]
[tex]3x=24[/tex]
[tex]x=8[/tex]
The value of x is 8.
[tex]FJ\cong HJ[/tex] (CPCTC)
[tex]FJ=HJ=x[/tex] (Definition of congruent segment)
We need to find the value FH.
[tex]FH=FJ+JH[/tex] (Segment addition property)
[tex]FH=x+x[/tex]
[tex]FH=2x[/tex]
[tex]FH=2(8)[/tex]
[tex]FH=16[/tex]
Therefore, the length of FH is 16 units.
