Given the points
A(0,-6), B(1,2), C(3,-3),D(-3,2) and E(-4,-2)
Area of the pentagon = Area formed by a polygon =
∣∣∣(x1y2−y1x2)+(x2y3−y2x3)...+(xny1−ynx1)2∣∣∣
where a1 is the coordinate of vertex 1 and yn is the y-coordinate of the nth vertex etc.
Area ∣∣
∣
∣
∣∣[(−3×2)−(2×1)]+[(1×−3)−(3×2)]+[(3×−6)−(−3×0)]+[(−4×−2)−(−2×−3)]+[(0×−2)−(−6×−4)]2∣∣
∣
∣
∣∣=∣∣∣−732∣∣∣=732
Area of triangle formed by points below $x-axis,
Area=12bh=×−6=242=12 square unit
Angle subtended by BD at A=tan−1(8261)