Suzanne is shopping for items to put inside goody bags to thank her guests for attending her party. She plans to buy candy that costs $0.75 each and toys that cost $1.75 each. She must buy at least 15 toys, and she can spend no more than $40. Suzanne also wants to ensure she has more than 30 total goodies. Let c= amount of candy bought. Let t= number of toys bought. Complete the following inequalities by filling in the missing values. (2 points)

Question

Suzanne is shopping for items to put inside goody bags to thank her guests for attending her party. She plans to buy candy that costs $0.75 each and toys that cost $1.75 each. She must buy at least 15 toys, and she can spend no more than $40. Suzanne also wants to ensure she has more than 30 total goodies. Let c= amount of candy bought. Let t= number of toys bought. Complete the following inequalities by filling in the missing values. (2 points) 
c+t>
 0.75c+1.75t≤
 t≥

GPT-4o mini · Answer

To complete the inequalities based on the information provided:

Total goodies: Since Suzanne wants to ensure she has more than 30 total goodies (candy and toys), the first inequality is:
$ c + t > 30 $
Budget constraint: She can spend no more than $40 on candy and toys. The cost of candy is $0.75 times the number of candies (c), and the cost of toys is $1.75 times the number of toys (t). Therefore, the second inequality is:
$ 0.75c + 1.75t \leq 40 $
Minimum toys: Suzanne must buy at least 15 toys, so the third inequality is:
$ t \geq 15 $

Putting it all together, the completed inequalities are:

$ c + t > 30 $
$ 0.75c + 1.75t \leq 40 $
$ t \geq 15 $