Given that C(l) = 3l + 2
represents the cost of purchasing l
lip glosses, including the flat rate shipping charge, what is the cost per lip gloss? (1 point)
Responses
$5
$5
$2
$2
$3
$3
C(l)
To find the cost per lip gloss, we need to divide the total cost of purchasing l lip glosses by the number of lip glosses.
C(l) = 3l + 2
To find the cost per lip gloss, we divide both sides of the equation by l:
C(l)/l = (3l + 2)/l
The l on the right side of the equation cancels out:
C(l)/l = 3 + 2/l
So the cost per lip gloss is 3 + 2/l.
To find the cost per lip gloss, we need to divide the total cost C(l) by the number of lip glosses purchased, which is represented by l. The formula for C(l) is given as 3l + 2.
So, the cost per lip gloss is (3l + 2) / l.
To find the cost per lip gloss, we need to divide the total cost (C(l)) by the number of lip glosses (l).
In this case, we are given that C(l) = 3l + 2. It means that the cost of purchasing l lip glosses is calculated using the formula 3l + 2.
To find the cost per lip gloss, we divide the total cost by the number of lip glosses:
Cost per lip gloss = Total cost / Number of lip glosses
In this case, the total cost is given by C(l), and the number of lip glosses is represented by l.
Therefore, the cost per lip gloss is:
Cost per lip gloss = (3l + 2) / l
Simplifying the expression, we get:
Cost per lip gloss = (3l / l) + (2 / l)
Cost per lip gloss = 3 + (2 / l)
So, the cost per lip gloss is 3 + (2 / l), where l represents the number of lip glosses.