Answer:
[tex]a=-3\\ \\b=\dfrac{9}{2}\\ \\c=216[/tex]
Step-by-step explanation:
Use formula
[tex](u+v)^3=u^3+3u^2v+3uv^2+v^3.[/tex]
Hence,
[tex](x+2a)^3=x^3+3x^2\cdot 2a+3x\cdot (2a)^2+(2a)^3=x^3+6ax^2+12a^2x+8a^3.[/tex]
This expression is equal to
[tex]x^3-18x^2+24bx-c,[/tex]
so we can equate the coefficients at powers of x:
[tex]x^3:\ 1=1\\ \\x^2:\ 6a=-18\Rightarrow a=-3\\ \\x:\ 12a^2=24b\Rightarrow b=\dfrac{9}{2}\\ \\1=x^0:\ 8a^3=-c\Rightarrow c=-8\cdot (-3)^3=216.[/tex]
