[f(x)=|[a,-1,0],[ax,a,-1],[ax^(2),ax,a]|" then using "],[" determinants find "f(2x)-f(x)]

If f(x)=|[a,-1 ,0],[ax,a,-1],[a x^2,a x, a]|, using properties of determinants, find the value of f(2x)-f(x)dot

If f(x)=|[a,-1 ,0],[ax,a,-1],[a x^2,a x, a]|, using properties of determinants, find the value of f(2x)-f(x)dot

If f(x)=|{:(a,-1,0),(ax,a,-1),(ax^2,ax,a):}| then using properties of determinants, find the value of f(2x)-f(x)

If f(x)=|a-10axa-1ax^(2)axa|, using properties of determinants,find the value of f(2x)-f(x)

If f(x) = {:|(a,-1,0),(ax,a,-1),(ax^2,ax,a)| , using properties of determinants, find the value of f(2x)-f(x)

If f(x)=|(a,-1,0),(ax,a,-1),(ax^(2),ax,a)| then f(3x)-f(2x)=

If f(x)=|(a,-1,0),(ax,a,-1),(ax^2,ax,a)|, then f(2x)-f(x) equals

If f(x)=|(a,-1,0), (ax,1,-1), (ax^2,ax,9)|, then f(2x)-f(x) equals

If f(x)=|(a,-1,0),(ax,a,-1),(ax^(2),ax,a)| , then f(2x) - f(x) is not divisible a)x b)a c) 2a+3x d) x^2