[img]data:image/png;base64,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[/img][br]Find LK and ML
LK ≈ 3.6 and ML ≈ 8.8[br][br]tan24 = x/8[br]8tan24 = x[br]x ≈ 3.6[br][br]cos24 = 8/y[br]ycos24 = 8[br]y = 8/cos24[br]y ≈ 8.8