4x^{2}+6x + 1 4x^{2}+6x + 1 5x^{2}-2x - 1

$4x^{2}+6x + 1 4x^{2}+6x + 1 5x^{2}-2x - 1$

4x^{2}+6x + 1
4x^{2}+6x + 1
5x^{2}-2x - 1

Response

Step1: Recall the perimeter formula for a triangle
The perimeter $P$ of a triangle is the sum of the lengths of its three - sides. If the side lengths of the triangle are $a = 4x^{2}+6x + 1$, $b = 4x^{2}+6x + 1$, and $c=5x^{2}-2x - 1$, then $P=a + b + c$.
Step2: Substitute the side - length expressions into the perimeter formula
$P=(4x^{2}+6x + 1)+(4x^{2}+6x + 1)+(5x^{2}-2x - 1)$.
Step3: Combine like terms
Combine the $x^{2}$ terms: $4x^{2}+4x^{2}+5x^{2}=(4 + 4+5)x^{2}=13x^{2}$.
Combine the $x$ terms: $6x+6x-2x=(6 + 6 - 2)x = 10x$.
Combine the constant terms: $1 + 1-1=1$.
So, $P = 13x^{2}+10x + 1$.

$13x^{2}+10x + 1$

Step1: Recall the perimeter formula for a triangle
The perimeter $P$ of a triangle is the sum of the lengths of its three - sides. If the side lengths of the triangle are $a = 4x^{2}+6x + 1$, $b = 4x^{2}+6x + 1$, and $c=5x^{2}-2x - 1$, then $P=a + b + c$.
Step2: Substitute the side - length expressions into the perimeter formula
$P=(4x^{2}+6x + 1)+(4x^{2}+6x + 1)+(5x^{2}-2x - 1)$.
Step3: Combine like terms
Combine the $x^{2}$ terms: $4x^{2}+4x^{2}+5x^{2}=(4 + 4+5)x^{2}=13x^{2}$.
Combine the $x$ terms: $6x+6x-2x=(6 + 6 - 2)x = 10x$.
Combine the constant terms: $1 + 1-1=1$.
So, $P = 13x^{2}+10x + 1$.

$13x^{2}+10x + 1$