FH=? FG=?

To find the values of \( FH \) and \( FG \) in the right triangle \( FHG \), we can use the Pythagorean theorem. Given that angle \( H \) is a right angle, the sides \( FH \) and \( FG \) form the legs, and \( 22.2 \) is the hypotenuse \( FG \). For right triangle \( KTS \), \( 5h \) is one leg and we can assume \( 22.2 \) is the hypotenuse based on its matching description. However, if we are focusing solely on triangle \( FHG \): Given: - \( FG = 22.2 \) (hypotenuse) The Pythagorean theorem states: \[ FG^2 = FH^2 + HG^2 \] Assuming \( H = G \) based on shared notation, from \( FHG \): We can logically deduce based on constraints that \( FH = FG = 22.2 \). Kindly provide further data or context if specifics deviate, as geometrical assumptions rely on given configurations and values.