ABCD is a trapezoid.What is the area of trapezoid?
Accepted Solution
A:
Let h represent the height of the trapezoid, the perpendicular distance between AB and DC. Then the area of the trapezoid is Area = (1/2)(AB + DC)·h We are given a relationship between AB and DC, so we can write Area = (1/2)(AB + AB/4)·h = (5/8)AB·h
The given dimensions let us determine the area of ∆BCE to be Area ∆BCE = (1/2)(5 cm)(12 cm) = 30 cm²
The total area of the trapezoid is also the sum of the areas ... Area = Area ∆BCE + Area ∆ABE + Area ∆DCE Since AE = 1/3(AD), the perpendicular distance from E to AB will be h/3. The areas of the two smaller triangles can be computed as Area ∆ABE = (1/2)(AB)·h/3 = (1/6)AB·h Area ∆DCE = (1/2)(DC)·(2/3)h = (1/2)(AB/4)·(2/3)h = (1/12)AB·h
Putting all of the above into the equation for the total area of the trapezoid, we have Area = (5/8)AB·h = 30 cm² + (1/6)AB·h + (1/12)AB·h (5/8 -1/6 -1/12)AB·h = 30 cm² AB·h = (30 cm²)/(3/8) = 80 cm²
Then the area of the trapezoid is Area = (5/8)AB·h = (5/8)·80 cm² = 50 cm²