In ∆ABC with m∠C = 90° the sides satisfy the ratio BC:AC:AB = 4:3:5. If the side with middle length is 12 cm, find: 1) The perimeter of ∆ABC; 2) The area of ∆ABC; 3) The height to the hypotenuse.
1) The reference triangle has perimeter 4+3+5 = 12. The middle side is (12 cm)/4 = 3 cm times the length of that of the reference triangle. The perimeter has the same ratio, so will be .. P = 12*(3 cm) = 36 cm . . . . . . perimeter
2) The actual triangle has legs 9 cm and 12 cm. The area is half their product, .. A = (1/2)*(12 cm)*(9 cm) = 54 cm^2 . . . . . . area
3) The height satisfies the equation .. A = (1/2)bh where b is the hypotenuse length and h is the height of interest. Filling in the numbers, we have .. 54 cm^2 = (1/2)(15 cm)*h . . . . . hypotenuse = (3 cm)*5 = 15 cm .. h = (108/15) cm = 7.2 cm . . . . . height to the hypotenuse
