You want to have enough flour to divide into 5 piles. Each pile must measure more than 1.5 cups. The inequality you write is f5>1.5. Solve the inequality.
To solve the inequality, you need to isolate the variable "f" on one side of the equation.
f5 > 1.5
Divide both sides by 5:
f > 1.5/5
Simplify:
f > 0.3
Therefore, the amount of flour (f) needed to divide into 5 piles, each measuring more than 1.5 cups, is greater than 0.3 cups.
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To solve the inequality f5 > 1.5, we need to find the range of values for f5 that satisfies the condition.
Given that each pile must measure more than 1.5 cups, f5 must be greater than 1.5. Therefore, the solution to the inequality is:
f5 > 1.5
This means that any value of f5 that is greater than 1.5 would satisfy the condition of each pile measuring more than 1.5 cups.
To solve the inequality f5 > 1.5, we want to find the range of values for f5 that satisfy this condition.
If we want to divide the flour into 5 piles, each pile must measure more than 1.5 cups. Let's assume that f5 represents the amount of flour in cups in the fifth pile.
To solve the inequality, we need to isolate f5 on one side of the inequality sign.
f5 > 1.5
Since there are no other terms or variables on the other side of the inequality, we are done.
The solution to this inequality is all values of f5 that are greater than 1.5 cups.
Therefore, the answer is f5 > 1.5.