Question

if $ef = fg = 98$ and $gh = 81$, what is $eh$?
$eh = \square$

Explanation:

Step1: Identify triangle properties

Since \( EF = FG = 98 \), triangle \( EFG \) is isosceles with \( EF = FG \). The line \( FH \) is perpendicular to \( EG \) (right angle at \( H \)), so by the perpendicular bisector theorem, \( EH = GH \) if \( FH \) bisects \( EG \), but wait, actually, in an isosceles triangle, the altitude from the apex ( \( F \)) to the base ( \( EG \)) bisects the base. Wait, no, here \( EF = FG \), so the apex is \( F \), and the base is \( EG \). Wait, but the diagram shows \( FH \) perpendicular to \( EG \) at \( H \), so \( H \) is the midpoint? Wait, no, wait the problem: \( EF = FG = 98 \), \( GH = 81 \). Wait, maybe \( EH = GH \)? Wait, no, maybe I misread. Wait, \( EF = FG \), so triangle \( EFG \) is isosceles with \( EF = FG \), so the sides \( EF \) and \( FG \) are equal. Then \( FH \) is perpendicular to \( EG \), so triangle \( FHE \) and \( FHG \) are right triangles. Since \( EF = FG \) and \( FH \) is common, by HL congruence, \( \triangle FHE \cong \triangle FHG \), so \( EH = GH \)? Wait, but \( GH = 81 \), so \( EH = 81 \)? Wait, no, that can't be. Wait, maybe I made a mistake. Wait, the problem says \( EF = FG = 98 \), \( GH = 81 \), find \( EH \). Wait, maybe \( EG \) is a line, and \( F \) is a point such that \( EF = FG = 98 \), and \( FH \) is perpendicular to \( EG \) at \( H \). Then in right triangle \( FHG \), \( FG = 98 \), \( GH = 81 \), so we can find \( FH \), but wait, no, we need \( EH \). Wait, but if \( \triangle FHE \cong \triangle FHG \), then \( EH = GH \). Wait, but that would mean \( EH = 81 \). Wait, maybe that's the case. Wait, let's check: \( EF = FG \), \( FH \perp EG \), so \( \angle FHE = \angle FHG = 90^\circ \), \( FH = FH \), \( EF = FG \), so by HL, \( \triangle FHE \cong \triangle FHG \), so \( EH = GH = 81 \). So \( EH = 81 \).

Wait, but maybe I misread the problem. Wait, the problem says \( EF = FG = 98 \), \( GH = 81 \), what is \( EH \). So according to the congruence, \( EH = GH = 81 \).

Step1: Recognize congruent triangles

Since \( EF = FG \), \( \angle FHE = \angle FHG = 90^\circ \), and \( FH \) is common, \( \triangle FHE \cong \triangle FHG \) (HL).

Step2: Conclude \( EH = GH \)

From congruence, corresponding sides \( EH = GH \). Given \( GH = 81 \), so \( EH = 81 \).

Answer:

\( 81 \)