I don't know how to do a real-world problom for the inequality 0.1·x(<or=to)5.00?
0.1x <= 5.00
Suppose pencils cost 10 cents each. If you only have $5.00 to spend, how many pencils can you buy?
50 pencils
To solve the real-world problem for the inequality 0.1·x (≤ 5.00), we need to determine the possible values of x that satisfy the inequality.
To do this, we'll follow these steps:
Step 1: Rewrite the inequality:
0.1 · x ≤ 5.00
This inequality states that the product of 0.1 and x should be less than or equal to 5.00.
Step 2: Isolate x:
Divide both sides of the inequality by 0.1:
(0.1 · x) / 0.1 ≤ 5.00 / 0.1
x ≤ 50.00
This tells us that x should be less than or equal to 50.00 for the inequality to hold true.
Therefore, the real-world problem that this inequality represents is: "Find the values of x that are less than or equal to 50.00 when multiplied by 0.1."