Correct answer is: distance from D to AB is 6cm
Solution:-
Let us assume E is the altitude drawn from D to AB.
Given that m∠ACB=120° and ABC is isosceles which means
m∠ABC=m∠BAC = [tex]\frac{180-120}{2}=30[/tex]
And AC= BC
Let AC=BC=x
Then from ΔACD , cos(∠ACD) = [tex]\frac{DC}{AC} =\frac{4}{x}[/tex]
Since DCB is a straight line m∠ACD+m∠ACB =180
m∠ACD = 180-m∠ACB = 60
Hence [tex]cos(60)=\frac{4}{x}[/tex]
[tex]x=\frac{4}{cos60}= 8[/tex]
Now let us consider ΔBDE, sin(∠DBE) = [tex]\frac{DE}{DB} =\frac{DE}{DA+AB} = \frac{DE}{4+8}[/tex]
[tex]DE = 12sin(30) = 6cm[/tex]
