.6f = 15
f = 25
.75n = 15
n = 20
.8t = 15
t = 18.75, or just 18 whole truffles
If he buys n of each,
(.6 + .75 + .8)n <= 15
2.15n <= 15
n <= 6.97
so, he can only buy 6 of each
buying 6, he will spend 6*2.15 = 12.90
Michel wants to buy his mother handmade chocolates for Mothers Day. He has $15.oo to spend. The price of each chocolate is given below.
Fudge $0.60 NutClusters $0.75 Truffles $0.80
a)create and solve an equation for each type of chocolate to determine how many Michel can buy with $15.00, if he buys one type.
B) Michel decides to buy all 3 types, instead of choosing just one.
a)If Michel buys the same number of all three types, how many can he buy and stay within his budget?
b)Exactly how much will Michel spend?
c)Write an algebraic expression that represents the total amount Michel will spend. Then substitute the variable ad evaluate your expression. How does this amount compare with your amount in part(b)?
6 answers
Thank you : )
Michel’s final choice costs $14.80. It is a combination of all three types of chocolates.
Determine four possible combinations of chocolates he could have selected.
Create and evaluate an algebraic expression to show that each of your combinations works.
Determine four possible combinations of chocolates he could have selected.
Create and evaluate an algebraic expression to show that each of your combinations works.
1fudge 4 nuts 13 truffles
2 fudge, 16 nuts, 1 truffles
3 fudge, 12 nuts, 4 truffles
4 fudge, 8 nuts, 7 truffles
Create and evaluate an algebraic expression to show that each of your combinations works.
2 fudge, 16 nuts, 1 truffles
3 fudge, 12 nuts, 4 truffles
4 fudge, 8 nuts, 7 truffles
Create and evaluate an algebraic expression to show that each of your combinations works.
why did you put (n) is it considered as an (x) value
If he buys n of each,
(.6 + .75 + .8)n <=
also, how did you get 6.97
did you subtract a number
If he buys n of each,
(.6 + .75 + .8)n <=
also, how did you get 6.97
did you subtract a number
How do you do letter c
2 answers