Asked by yellow❁sunny
Solve 2x+10≥12 . Make sure to write your inequality so that x comes first.
Answers
Answered by
yellow❁sunny
can pls explain how you got the answer
Answered by
yellow❁sunny
Solve 5x+12.5<23.1 . Write the rational number in your answer in decimal form to the hundredths place. Make sure to write your inequality so that x comes first.
Answered by
yellow❁sunny
Solve 4/7x−2/7>5/7 . Write the rational number in your answer as a mixed number. Make sure to write your inequality so that x comes first.
Answered by
yellow❁sunny
wrong
Answered by
GPT 3.5
To write the inequality so that x comes first, we need to subtract 10 from both sides of the inequality.
2x + 10 - 10 ≥ 12 - 10
2x ≥ 2
Therefore, the inequality when x comes first is x ≥ 1.
2x + 10 - 10 ≥ 12 - 10
2x ≥ 2
Therefore, the inequality when x comes first is x ≥ 1.
Answered by
GPT 3.5
Of course! Let's go through the steps to solve the inequality 2x + 10 ≥ 12:
1. Start with the original inequality: 2x + 10 ≥ 12.
2. In order to isolate the variable x on one side of the inequality, we need to get rid of the constant term on the same side as the x-term. The constant term here is 10.
3. We can achieve this by subtracting 10 from both sides of the inequality. Subtracting 10 from both sides will give us:
2x + 10 - 10 ≥ 12 - 10.
Simplifying both sides:
2x ≥ 2.
4. Now, the variable x is isolated on the left side of the inequality. To solve for x, we need to divide both sides of the inequality by the coefficient of x, which is 2.
So, we divide both sides by 2:
(2x) / 2 ≥ 2 / 2.
Simplifying both sides:
x ≥ 1.
Therefore, the solution to the inequality 2x + 10 ≥ 12 is x ≥ 1.
1. Start with the original inequality: 2x + 10 ≥ 12.
2. In order to isolate the variable x on one side of the inequality, we need to get rid of the constant term on the same side as the x-term. The constant term here is 10.
3. We can achieve this by subtracting 10 from both sides of the inequality. Subtracting 10 from both sides will give us:
2x + 10 - 10 ≥ 12 - 10.
Simplifying both sides:
2x ≥ 2.
4. Now, the variable x is isolated on the left side of the inequality. To solve for x, we need to divide both sides of the inequality by the coefficient of x, which is 2.
So, we divide both sides by 2:
(2x) / 2 ≥ 2 / 2.
Simplifying both sides:
x ≥ 1.
Therefore, the solution to the inequality 2x + 10 ≥ 12 is x ≥ 1.
Answered by
GPT 3.5
To write the inequality so that x comes first, we need to subtract 12.5 from both sides of the inequality. Let's solve it step by step:
5x + 12.5 < 23.1
Subtracting 12.5 from both sides:
5x + 12.5 - 12.5 < 23.1 - 12.5
Simplifying both sides:
5x < 10.6
Now, to solve for x, we can divide both sides of the inequality by 5:
(5x) / 5 < 10.6 / 5
Simplifying:
x < 2.12
Therefore, the solution to the inequality 5x + 12.5 < 23.1, written with x first, is x < 2.12.
5x + 12.5 < 23.1
Subtracting 12.5 from both sides:
5x + 12.5 - 12.5 < 23.1 - 12.5
Simplifying both sides:
5x < 10.6
Now, to solve for x, we can divide both sides of the inequality by 5:
(5x) / 5 < 10.6 / 5
Simplifying:
x < 2.12
Therefore, the solution to the inequality 5x + 12.5 < 23.1, written with x first, is x < 2.12.
Answered by
GPT 3.5
To write the inequality so that x comes first, we need to add 2/7 to both sides of the inequality. Let's solve it step by step:
4/7x - 2/7 > 5/7
Adding 2/7 to both sides:
4/7x - 2/7 + 2/7 > 5/7 + 2/7
Simplifying both sides:
4/7x > 7/7
To cancel out the coefficient of x, which is 4/7, we can multiply both sides of the inequality by the reciprocal of 4/7, which is 7/4:
(4/7x) * (7/4) > (7/7) * (7/4)
Simplifying both sides:
x > 49/28
Now, let's express the answer as a mixed number:
49/28 is equivalent to 1 and 21/28.
Therefore, the solution to the inequality (4/7)x - 2/7 > 5/7, written with x first, is x > 1 21/28.
4/7x - 2/7 > 5/7
Adding 2/7 to both sides:
4/7x - 2/7 + 2/7 > 5/7 + 2/7
Simplifying both sides:
4/7x > 7/7
To cancel out the coefficient of x, which is 4/7, we can multiply both sides of the inequality by the reciprocal of 4/7, which is 7/4:
(4/7x) * (7/4) > (7/7) * (7/4)
Simplifying both sides:
x > 49/28
Now, let's express the answer as a mixed number:
49/28 is equivalent to 1 and 21/28.
Therefore, the solution to the inequality (4/7)x - 2/7 > 5/7, written with x first, is x > 1 21/28.
Answered by
GPT 3.5
Apologies for the mistake. Let's solve the inequality correctly:
To write the inequality so that x comes first, we need to add 2/7 to both sides of the inequality. Let's solve it step by step:
4/7x - 2/7 > 5/7
Adding 2/7 to both sides:
4/7x - 2/7 + 2/7 > 5/7 + 2/7
Simplifying both sides:
4/7x > 7/7
We can now simplify 7/7 to 1:
4/7x > 1
To isolate x, we need to multiply both sides by the reciprocal of 4/7, which is 7/4:
(4/7x) * (7/4) > 1 * (7/4)
Simplifying both sides:
28/28x > 7/4
28/28 simplifies to 1, so we have:
x > 7/4
Now, let's express the answer as a mixed number:
7/4 is equivalent to 1 and 3/4.
Therefore, the solution to the inequality (4/7)x - 2/7 > 5/7, written with x first, is x > 1 3/4.
To write the inequality so that x comes first, we need to add 2/7 to both sides of the inequality. Let's solve it step by step:
4/7x - 2/7 > 5/7
Adding 2/7 to both sides:
4/7x - 2/7 + 2/7 > 5/7 + 2/7
Simplifying both sides:
4/7x > 7/7
We can now simplify 7/7 to 1:
4/7x > 1
To isolate x, we need to multiply both sides by the reciprocal of 4/7, which is 7/4:
(4/7x) * (7/4) > 1 * (7/4)
Simplifying both sides:
28/28x > 7/4
28/28 simplifies to 1, so we have:
x > 7/4
Now, let's express the answer as a mixed number:
7/4 is equivalent to 1 and 3/4.
Therefore, the solution to the inequality (4/7)x - 2/7 > 5/7, written with x first, is x > 1 3/4.
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