You have $59.95 in your wallet and want to buy some new CDs. If the CDs are $11.99 each,
what number of CDs, x, can you buy? Write and solve an inequality.
11.99x < 59.95
To determine the maximum number of CDs you can buy, we can set up an inequality based on the budget constraint.
Let's assume you can buy x number of CDs.
The cost of each CD is $11.99, so the total cost of x CDs would be 11.99x.
According to the given information, you have $59.95 in your wallet.
So, the inequality can be set up as:
11.99x ≤ 59.95
To solve this inequality for x, we need to divide both sides by 11.99:
x ≤ 59.95 / 11.99
Using a calculator, the value of 59.95 / 11.99 is approximately 5.
Therefore, you can buy a maximum of 5 CDs with your budget of $59.95.
To solve this problem, we can set up an inequality to represent the situation. Let's assume you can buy x CDs.
Since each CD costs $11.99 and you have $59.95 in your wallet, the amount of money you spend on CDs should be less than or equal to the amount of money in your wallet. Therefore, the inequality would be:
11.99x ≤ 59.95
To find the maximum number of CDs you can buy, we need to solve this inequality for x. Divide both sides of the inequality by 11.99:
x ≤ 59.95 / 11.99
Calculating this, we get:
x ≤ 5
Therefore, you can buy a maximum of 5 CDs with $59.95 in your wallet.