Find area of a trapezium whose parallel sides measure 58 cm and 42 cm, and the two equal sides measure 17 cm.
750

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Solution

The correct option is A 750
Let ABCD be the given trapezium in which AB = 58 cm, DC = 42 cm, BC = 17 cm and AD = 17 cm.
Through C, draw CE parallel to AD, meeting AB at E.

Also, draw CF ⟘ AB.

Now, EB = (AB - AE) = (AB - DC)
= (58 - 42) cm = 16 cm

CE = AD = 17 cm and AE = DC = 42 cm.

Now, in triangle EBC, we have CE = BC = 17 cm.

Also, CF ⟂ AB

$\Rightarrow$ EF = ¹/₂ × EB = 8 cm

$\Rightarrow$ CE = 17 cm and EF = 8 cm

$\Rightarrow C F = \sqrt{C E^{2} - E F^{2}} = \sqrt{17^{2} - 8^{2}} = \sqrt{225} = 15 c m$

Thus, the distance between the parallel sides is 15 cm.

Area of trapezium ABCD

= ¹/₂ × (sum of parallel sides) × (distance between them)

$= \frac{1}{2} \times (58 + 42) \times 15$

$= 750 c m^{2}$

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Find area of a trapezium whose parallel sides measure 58 cm and 42 cm, and the two equal sides measure 17 cm.750

Find area of a trapezium whose parallel sides measure 58 cm and 42 cm, and the two equal sides measure 17 cm.
750