Math, asked by vedant6may, 8 months ago

In quadrilateral ABCD, B = D = 90, C = 120◦ . If AB = 4, AD = 3 find BC and CD.

Answers

Answered by amitnrw
7

Given  : In Quadrilateral ABCD, ∠B = ∠D = 90°, ∠C = 120° .  

If AB = 4, AD = 3

To  find  : BC and CD.  

Solution:

In Quadrilateral ABCD, ∠B = ∠D = 90°,

∠B + ∠D = 180°

  ∠C = 120°.  

=>   ∠A = 60°

Extend  DC to cut Extended AB  at E

in ΔADE  , ∠D = 90°  

AD = 3    ∠A = 60°

=>  AE = 6   AE = AB + BE  = 4 + BE  => BE =  2

    DE = 3√3

Now in Δ CBE   ∠B = 90°  

BE = 2    ∠E = 30°

BC = 2/√3  = 2√3/3  = 1.155

CE = 4/√3  = 4√3/3

CD = DE - CE

=> CD = 3√3 - 4√3/3  =  5√3/3 = 2.887

BC = 2√3/3  = 1.155

CD = 5√3/3  = 2.887

Learn More:

in triangle abc ad is perpendicular to BC and AD square is equal to ...

brainly.in/question/8992597

In ABC, CD is an altitude, such that AD = BC. Find AC, if AB = 3 cm ...

brainly.in/question/12454685

Attachments:
Similar questions