A community needs to raise at least $5000 to build a new skateboarding park. They are selling backpacks for $25 each to raise the money. Write and solve an inequality to determine the minimum number of backpacks they need to sell in order to reach this goal.
25 x >/= 5000
x >/= 200
200
Divide 5000 with 25 get 200
So it will be
X < 200
I donβt know lolππππ
5,β00 divided by 25 then the answer is your answer lol
To determine the minimum number of backpacks the community needs to sell, we can set up an inequality. Let's assign a variable to represent the number of backpacks, so let's call it 'x'.
The cost of each backpack is $25, and the community needs to raise at least $5000. So, we can write the inequality as:
25x β₯ 5000
To solve this inequality, we will isolate the variable 'x'. We can do this by dividing both sides of the inequality by 25, like this:
25x Γ· 25 β₯ 5000 Γ· 25
Simplifying, we have:
x β₯ 200
Therefore, the minimum number of backpacks the community needs to sell to reach their fundraising goal is 200.