A polynomial is given as$24a^{3}b+6a^2{b}^2-18a{b}^3$.

First we have to find the GCF (group common factor). Now, rewrite the given polynomial using GCF and apply the distributive property to factor the expression.   

A polynomial is given as $24a^{3}b+6a^2{b}^2-18a{b}^3$

GCF of the polynomial,

$$\begin{gathered} 24a^{3}b=2\times 2\times 2\times 3\times a\times a\times a\times b \\ 6a^2{b}^2=2\times 3\times a\times a\times b\times b \\ 18a{b}^3=2\times 3\times 3\times a\times b\times b\times b \\ GCF=6ab \end{gathered}$$

$$\begin{gathered} 24a^{3}b+6a^2{b}^2-18a{b}^3 \\ 6ab(4a^2+4ab-3b^2) \end{gathered}$$ 

Check by multiplying the factors.

$6ab(4a^2+4ab-3b^2)=24a^{3}b+6a^2{b}^2-18a{b}^3$

Which holds true.