Why Triangle EBC and ACF must have the same area ?

The formula for the area of a triangle is 1/2 × base × height. Hence, the areas of triangles AEC, ACF, and ABC are

The area of ∆AEC = (1/2)(x)(BC) = (1/2)(x)(4) = 2x
The area of ∆ACF = (1/2)(3)(AD)
= (1/2)(3)(BC)

AD = BC, since opposite sides a rectangle are equal
= (3/2)BC = (3/2)(4) = 6

The area of ∆ABC = (1/2)(AB)(AD)
= (1/2)(CD)(BC)

AB = CD and AD = BC since opposite sides in a
rectangle are equal

= (1/2)(DF + FC)(BC)
= (1/2)(5 + 3)(4)
= (1/2)(8)(4)
= 16

Now, the area of the quadrilateral AECF equals (the area of ∆AEC) + (the area of ∆ACF) = 2x + 6, and the area of ∆ABC = 16. Since we are given that the area of the triangle ABC equals the area of the quadrilateral AFCE, 2x + 6 = 16. Solving for x in this equation yields x = 5. The answer is (A).

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