Think about how much time it will take you to create your product. You have
200 hours this summer to devote to creating your product. Write an
inequality that represents your time constraint.
500,000 dollars
Phones cases
It will cost $0.60 to make each phone case. And the price for each phone case is $25
- $300
Let x be the number of phone cases you can create.
The time it takes to create each phone case can be represented as a constant t (in hours) per phone case.
Therefore, the total time it takes to create x phone cases will be t*x hours.
Given that you have 200 hours in total to devote to creating your product, the inequality representing your time constraint is:
t*x ≤ 200
To write an inequality that represents your time constraint, we can use the equation:
Time (in hours) x Time needed per phone case (in hours) ≤ Total time available (in hours)
Let's assume it takes 1 hour to make each phone case. Therefore, the inequality can be written as:
1 x Number of phone cases ≤ 200
Since we want to find the maximum number of phone cases that can be made within 200 hours, we can let the number of phone cases be represented by the variable 'x'. Thus, the inequality can be written as:
1x ≤ 200
Simplifying, the final inequality is:
x ≤ 200
To represent the time constraint for creating the product, we can use an inequality. Let's assume "t" represents the number of hours it takes to create the product.
Given that you have 200 hours available this summer, the inequality would be:
t ≤ 200
This means that the number of hours it takes to create the product must be less than or equal to 200 hours in order to stay within the time constraint.