CHAPTER 11 Areas of Plane Figures
SECTION 11-1 Areas of Rectangles
The area of a square is the square of the length of a side. POSTULATE 17 The area of a square is the square of the length of a side. A = s2
If two figures are congruent, then they have the same area. POSTULATE 18 If two figures are congruent, then they have the same area.
POSTULATE 19 The area of a region is the sum of the areas of its non-overlapping parts.
The area of a rectangle equals the product of its base and height THEOREM 11-1 The area of a rectangle equals the product of its base and height A = bh
Areas of Parallelograms, Triangles, and Rhombuses SECTION 11-2 Areas of Parallelograms, Triangles, and Rhombuses
THEOREM 11-2 The area of a parallelogram equals the product of a base and the height to that base. A = bh
THEOREM 11-3 The area of a triangle equals half the product of a base and the height to that base. A = ½bh
The area of a rhombus equals half the product of its diagonals. THEOREM 11-4 The area of a rhombus equals half the product of its diagonals. A = ½d1d2
SECTION 11-3 Areas of Trapezoids
THEOREM 11-5 The area of a trapezoid equals half the product of the height and the sum of the bases A = ½h(b1 + b2)
Median of a Trapezoid The segment that joins the midpoints of the legs Median = b1 + b2 2
Areas of Regular Polygons SECTION 11-4 Areas of Regular Polygons
Center of a Regular Polygon Is the center of the circumscribed circle
Radius of a Regular Polygon Is the distance from the center to a vertex.
Central Angle of a Regular Polygon Is an angle formed by two radii drawn to consecutive vertices
Measure of Central Angle of a Regular Polygon Is 360/n where n is the number of sides
Apothem of a Regular Polygon Is the perpendicular distance from the center of the polygon to a side
THEOREM 11-6 The area of a regular polygon is equal to half the product of the apothem and the perimeter. A = ½ap
Circumferences and Areas of Circles SECTION 11-5 Circumferences and Areas of Circles
Circumference Is the distance around a circle C = 2r or d
Area A = r2
Arc Lengths and Areas of Sectors SECTION 11-6 Arc Lengths and Areas of Sectors
Sector of a Circle Is a region bounded by two radii and an arc of the circle
Length of a Sector In general, if mAB = x: Length of AB = x/360(2r)
Area of a Sector Area of sector AOB = x/360(r2)
SECTION 11-7 Ratios of Areas
Comparing Areas of Triangles If two triangles have equal heights, then the ratio of their areas equals the ratio of their bases.
Comparing Areas of Triangles 2. If two triangles have equal bases, then the ratio of their areas equals the ratio of their heights
Comparing Areas of Triangles 3. If two triangles are similar, then the ratio of their areas equals the square of their scale factor.
If the scale factor of two similar figures is a:b, then THEOREM 11-7 If the scale factor of two similar figures is a:b, then The ratio of the perimeters is a:b The ratio of the areas is a2:b2
Geometric Probability SECTION 11-8 Geometric Probability
Probability Suppose a point P of AB is picked at random. Then: Probability that P is on AC = (length of AC)/(length of AB) Suppose a point P of region S is picked at random. Then: Probability that P is in region R = (area of R)/(area of S)
END