Four points A, B, C, D are given on circle. Line segment AB and CD are parallel. Find the area of the figure formed by these points (in ${c m}^{2}$ ).

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Solution

The correct option is B
49

Apply Pythagoras theorem to find the perpendicular distance of the two lines.

In $Δ$ OEB

${O E}^{2}$ + ${B E}^{2}$ = ${O B}^{2}$

${O E}^{2}$ = 25 - 9 (perpendicular drawn from Centre to a chord bisects the chord therefore BE = 3cm)

OE = 4cm

Similarly In $Δ$ OFD

${O F}^{2}$ + ${F D}^{2}$ = ${O D}^{2}$

${O F}^{2}$ = 25 - 16

$\Rightarrow$ OF = 3cm

Area of trapezium

= $\frac{1}{2}$ (perpendicular distance between two parallel sides)(sum of the length of the parallel sides)

= $\frac{1}{2}$ (4+3)(8+6)

= 49 ${c m}^{2}$

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