(x, y) is equal [where we set It is known that the area of a polygon with vertices (x1.₁), (x2.2). (Xn+1-Ju+1) = (x₁.₁)] to Σ(x+1-X+18) Compute the areas of the polygons shown in the figure. (-3,3) (1,3) (5,3) (3,2) (-1.1) (A) (B) The triangle in (A) has vertices A = (2,5), B=(2, 1), C = (7, 1). First, calculate all summands (x+1-X+1) for the triangle in (A), then find its area. Check your result for the area of the triangle in (A) using geometry. (Give your answers as whole numbers.) XAYB-XRYA = хаус-хсув= ХСУА-ХАУС - area of the polygon in (A): Find the area of the polygon in figure (B). (Give your answer as a whole number.) area of the polygon in (B): 3

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---. It is known that the area of a polygon with vertices (x₁, ₁), (x2,2), (x, y) is equal [where we set (Xn+1+Ya+1) = (x1,₁)] to Σ(x+1-X1+19) Compute the areas of the polygons shown in the figure. (-3,5) 5 (1,3) (5,3) 3 2, (3,2) (A) (B) The triangle in (A) has vertices A = (2,5), B = (2, 1), C = (7,1). First, calculate all summands (x+1-X+1) for the triangle in (A), then find its area. Check your result for the area of the triangle in (A) using geometry. (Give your answers as whole numbers.) XAVBXBYA = хвус-хсув = хсул - хлус = area of the polygon in (A): Find the area of the polygon in figure (B). (Give your answer as a whole number.) area of the polygon in (B):