Question

In rectangle ABCD, ZC is trisected by CE and CF
where E lies on AB and F on AD. If BE = 6 cm and AF
= 2 cm, which of the following integers is nearest to
the area of the rectangle ABCD in sq.cm. :​

Answer 1

Given :   In rectangle ABCD,  ∠C is trisected by CE and CF  where E lies on AB and F on AD. If BE = 6 cm and AF  = 2 cm

To find :  area of the rectangle ABCD in sq.cm. nearest to  integers

Solution:

∠C = 90°  trisected by CE & CF

∠BCE = ∠ECF - ∠FCD =  90°/3 = 30°

in ΔCBE

tan30° = BE/BC

=> 1/√3 = 6/BC

=> BC = 6√3

AD = BC  ( opposite sides of rectangle)

=>  AD = 6√3

DF = AD - AF

=> DF =  6√3 - 2    

in  ΔCDF

Tan30° = DF/DC

=> 1/√3  = (6√3 - 2)/DC

=> DC = 18  - 2√3

Area of rectangle = BC * CD

= 6√3 (18 - 2√3)

= 108√3 - 36

= 151

area of the rectangle ABCD = 151 cm²

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