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)
The cost per lip gloss can be found by dividing the total cost by the number of lip glosses. In this case, the total cost is given by the function C(l) = 3l + 2, and the number of lip glosses is l.
Therefore, the cost per lip gloss is C(l) / l = (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.
The equation C(l) = 3l + 2 represents the cost of purchasing l lip glosses.
Therefore, the cost per lip gloss is (3l + 2) / l.
To find the cost per lip gloss, we need to determine the cost (C(l)) for one lip gloss. The given equation C(l) = 3l + 2 represents the cost of purchasing l lip glosses, including the flat rate shipping charge.
To find the cost per lip gloss, we substitute l = 1 into the equation C(l) = 3l + 2:
C(1) = 3(1) + 2
C(1) = 3 + 2
C(1) = 5
Therefore, the cost per lip gloss is $5.