Asked by shhh
Which inequalities are true? Select the three correct answers.
(3 points)
Responses
0<8–√
0<8–√
8–√<2
8–√<2
8–√<3
8–√<3
8–√>7–√
square root of 8 is greater than square root of 7
8–√>8
(3 points)
Responses
0<8–√
0<8–√
8–√<2
8–√<2
8–√<3
8–√<3
8–√>7–√
square root of 8 is greater than square root of 7
8–√>8
Answers
Answered by
GPT-4o mini
To determine which inequalities are true, let's first calculate the values involved:
1. **Calculate \(\sqrt{8}\)** and compare it to the other values.
- \(\sqrt{8} \approx 2.828\)
2. **Calculate \(\sqrt{7}\)**.
- \(\sqrt{7} \approx 2.646\)
Now we can evaluate the inequalities:
1. **\(0 < \sqrt{8}\)**
- This is true, as \(\sqrt{8} \approx 2.828\), which is greater than 0.
2. **\(\sqrt{8} < 2\)**
- False, since \(\sqrt{8} \approx 2.828\), which is not less than 2.
3. **\(\sqrt{8} < 3\)**
- True, since \(\sqrt{8} \approx 2.828\), which is less than 3.
4. **\(\sqrt{8} > \sqrt{7}\)**
- True, since \(\sqrt{8} \approx 2.828\) and \(\sqrt{7} \approx 2.646\), meaning \(\sqrt{8}\) is greater than \(\sqrt{7}\).
5. **\(\sqrt{8} > 8\)**
- False, since \(\sqrt{8} \approx 2.828\), which is not greater than 8.
Now we can summarize the valid inequalities:
- True: \(0 < \sqrt{8}\)
- True: \(\sqrt{8} < 3\)
- True: \(\sqrt{8} > \sqrt{7}\)
### The three correct answers are:
1. \(0 < \sqrt{8}\)
2. \(\sqrt{8} < 3\)
3. \(\sqrt{8} > \sqrt{7}\)
1. **Calculate \(\sqrt{8}\)** and compare it to the other values.
- \(\sqrt{8} \approx 2.828\)
2. **Calculate \(\sqrt{7}\)**.
- \(\sqrt{7} \approx 2.646\)
Now we can evaluate the inequalities:
1. **\(0 < \sqrt{8}\)**
- This is true, as \(\sqrt{8} \approx 2.828\), which is greater than 0.
2. **\(\sqrt{8} < 2\)**
- False, since \(\sqrt{8} \approx 2.828\), which is not less than 2.
3. **\(\sqrt{8} < 3\)**
- True, since \(\sqrt{8} \approx 2.828\), which is less than 3.
4. **\(\sqrt{8} > \sqrt{7}\)**
- True, since \(\sqrt{8} \approx 2.828\) and \(\sqrt{7} \approx 2.646\), meaning \(\sqrt{8}\) is greater than \(\sqrt{7}\).
5. **\(\sqrt{8} > 8\)**
- False, since \(\sqrt{8} \approx 2.828\), which is not greater than 8.
Now we can summarize the valid inequalities:
- True: \(0 < \sqrt{8}\)
- True: \(\sqrt{8} < 3\)
- True: \(\sqrt{8} > \sqrt{7}\)
### The three correct answers are:
1. \(0 < \sqrt{8}\)
2. \(\sqrt{8} < 3\)
3. \(\sqrt{8} > \sqrt{7}\)
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