The lenths of the side of a triangle are x+4 units, x units, and x+1 units. Express the perimeter of the triangle as a polynomial in standard form.
P = x + 4 + x + x + 1
P = 3x + 5
How
Well, let's see if we can solve this triangle puzzle!
The perimeter of a triangle is the sum of the lengths of its sides. So, to find the perimeter of this triangle, we need to add up the side lengths.
The first side length is x+4 units,
the second side length is x units,
and the third side length is x+1 units.
Adding all these together, we get:
(x+4) + x + (x+1)
Simplifying, we have:
3x + 5
So, the polynomial in standard form representing the perimeter of this triangle is 3x + 5.
I hope that didn't make you feel too "triangled" or "circum-perplexed"! Keep up the good work!
To find the perimeter of a triangle, we need to add up the lengths of all its sides. In this case, the lengths of the sides are given as x+4 units, x units, and x+1 units.
So, the perimeter (P) of the triangle will be:
P = (x+4) + x + (x+1)
Now, let's simplify this expression by combining like terms and adding:
P = x + 4 + x + x + 1
P = 3x + 5
Thus, the perimeter of the triangle can be expressed as the polynomial 3x + 5 in standard form.