The answer is [tex]a=6k(k+6)[/tex]
Step-by-step explanation: use Square of Sum [tex](a+b)^2=a^2+2ab+b^2[/tex] and use Difference of Squares [tex]a^2-b^2=(a+b)(a-b)[/tex].
[tex]\frac{6k^2-36k}{a}*\frac{k^2+12k+36}{k^2-36} =1[/tex] factor out the common term 6k
[tex]\frac{6k(k-6)}{a}*\frac{k^2+12k+36}{k^2-36}=1\\\\\frac{6k(k-6)}{a}*\frac{k^2+2(k)(6)+6^2}{k^2-36}=1[/tex] use Square of Sum then Difference of Squares
[tex]\frac{6k(k-6)}{a}+\frac{(k+6)^2}{(k^2-36)} =1\\\\\frac{6k(k-6)}{a}+\frac{(k+6)^2}{(k+6)(k-6)} =1\\\\[/tex] cancel k-6 then use the rule a/b*c/d=ac/bd
[tex]\frac{6k}{a}*\frac{(k+6)^2}{k+6} =1\\\\\frac{6k(k+6)^2}{a(k+6)} =1\\\\\frac{6k(k+6)}{a}=1\\\\6k(k+a)=a\\\\a=6k(k+6)[/tex]
Hope this helps, now you know the answer and how to do it. HAVE A BLESSED AND WONDERFUL DAY! As well as a great rest of Black History Month! :-)
- Cutiepatutie ☺❀❤
