Let's start by representing the number of cans collected in the first week as "C1" and the number of cans collected in the second week as "C2". We know that C1 = 135 and C2 = 89.
To represent the number of cans that must be collected by the end of the third week to meet or surpass the goal, let's use the variable "C3".
Since the goal is to collect at least 325 cans, we can write the following inequality:
C1 + C2 + C3 ≥ 325
Now, let's substitute the known values:
135 + 89 + C3 ≥ 325
Simplifying the equation, we have:
224 + C3 ≥ 325
To find the amount of cans needed to meet or surpass the goal, we subtract 224 from both sides of the inequality:
C3 ≥ 101
Therefore, the class needs to collect at least 101 more cans to meet or surpass the goal.
In conclusion, the inequality that represents the situation is C3 ≥ 101. The class needs to collect at least 101 more cans to meet or surpass the goal.
Your class hope to collect at least 325 cans of food for the annual food drive. There were 135 cans donated the first week and 89 more the second week. Write and inequality that describe the situation let's see represent the number of cancer food that must be collected by the end of the third week of your class to meet or surpass its goal. How many cans are needed to meet or surpass the goal? In every detail break down
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