The solution to the inequality 5j ≥ 15 is j ≥ 3.
To solve for j, we divide both sides of the inequality by 5:
5j/5 ≥ 15/5
j ≥ 3
Therefore, the solution to the inequality is j ≥ 3.
What is the solution of the inequality 5j ≥ 15?
9 answers
Is that really correct can I trust you?
Yes, you can trust me. The solution provided for the inequality 5j ≥ 15 is correct. If you have any further questions or need clarification, feel free to ask.
WHAT IS THE CORRECT ANSWER AND PROVE IT
I apologize for any confusion. Let's reevaluate the inequality 5j ≥ 15:
Given inequality: 5j ≥ 15
To solve for j, divide both sides by 5:
5j / 5 ≥ 15 / 5
j ≥ 3
Therefore, the correct solution to the inequality 5j ≥ 15 is j ≥ 3.
You can verify this solution by substituting a value of j such that j ≥ 3 into the original inequality and checking if it holds true. For example, let's choose j = 4:
5(4) ≥ 15
20 ≥ 15
Since 20 is indeed greater than or equal to 15, the inequality holds true. This confirms that the solution j ≥ 3 is correct.
Given inequality: 5j ≥ 15
To solve for j, divide both sides by 5:
5j / 5 ≥ 15 / 5
j ≥ 3
Therefore, the correct solution to the inequality 5j ≥ 15 is j ≥ 3.
You can verify this solution by substituting a value of j such that j ≥ 3 into the original inequality and checking if it holds true. For example, let's choose j = 4:
5(4) ≥ 15
20 ≥ 15
Since 20 is indeed greater than or equal to 15, the inequality holds true. This confirms that the solution j ≥ 3 is correct.
Ok it better be correct
I understand your concern. If you have any more questions or need further clarification on inequalities or any other topic, please feel free to ask. I'm here to help.
Actually prove that the answer j ≥ 3 is correct show your work
Of course, let's prove that the solution j ≥ 3 is correct for the inequality 5j ≥ 15:
Given inequality: 5j ≥ 15
We'll solve this inequality step by step:
1. Divide both sides by 5 to isolate j:
5j / 5 ≥ 15 / 5
j ≥ 3
Therefore, j ≥ 3 is the solution to the inequality 5j ≥ 15.
Now, let's substitute j = 3 into the original inequality 5j ≥ 15 and check if it holds true:
5(3) ≥ 15
15 ≥ 15
Since 15 is equal to 15, the inequality holds true for j = 3.
This proves that the solution j ≥ 3 is correct for the inequality 5j ≥ 15. If you have any more questions or need further clarification, feel free to ask.
Given inequality: 5j ≥ 15
We'll solve this inequality step by step:
1. Divide both sides by 5 to isolate j:
5j / 5 ≥ 15 / 5
j ≥ 3
Therefore, j ≥ 3 is the solution to the inequality 5j ≥ 15.
Now, let's substitute j = 3 into the original inequality 5j ≥ 15 and check if it holds true:
5(3) ≥ 15
15 ≥ 15
Since 15 is equal to 15, the inequality holds true for j = 3.
This proves that the solution j ≥ 3 is correct for the inequality 5j ≥ 15. If you have any more questions or need further clarification, feel free to ask.