A^2+ 12а^2+ 36 a= 0

To solve the equation $a^2 + 12a^2 + 36a = 0$, you can start by combining like terms:

$a^2 + 12a^2 + 36a = 0$

Combine the $a^2$ terms:

$13a^2 + 36a = 0$

Now, you can factor out common terms, which in this case is $a$:

$a(13a + 36) = 0$

Now, you have a product of two factors equal to zero. This equation can be solved by setting each factor equal to zero:

1. $a = 0$
2. $13a + 36 = 0$

For the second equation:

$13a + 36 = 0$

Subtract 36 from both sides:

$13a = -36$

Divide both sides by 13 to solve for $a$:

$a = \frac{-36}{13}$

So, the solutions to the equation are:

1. $a = 0$
2. $a = \frac{-36}{13}$

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