Answer :
Step-by-Step Solution:
1. Calculating the Total Sum of the Given Numbers:
Let's sum up the given values: [tex]\(5.3, 0.5, 5.5, 0.3, 5.6, 0.6\)[/tex].
Total sum = [tex]\(5.3 + 0.5 + 5.5 + 0.3 + 5.6 + 0.6 = 17.8\)[/tex].
Therefore, the minimum amount of money to buy all items is 17.8.
2. Analyzing the Given Inequality Statements:
- The statement "0.2 > ?" is a contradiction because 0.2 is not greater than any positive number greater than 0, particularly the smallest value in our list (0.3). Hence, we conclude it is not possible to find a number that satisfies this inequality from the given set of numbers.
- "0.55 < value < [tex]\( \sqrt{4} \)[/tex]" can be interpreted correctly. The value of [tex]\(\sqrt{4}\)[/tex] is 2.
Therefore, the value should lie in the range [tex]\(0.55 < value < 2\)[/tex]. Hence the valid range for this statement is [0.55, 2].
3. Constructing Sentences with Different Fronted Adverbials:
- When I was a child, I used to play in the park.
- How often do you visit your grandparents?
- Happily, she danced throughout the evening.
These sentences begin with different fronted adverbials, as requested.
Summary:
1. The total sum of the given numbers is 17.8.
2. The value [tex]\(0.2 > ?\)[/tex] is impossible.
3. The valid range for the inequality [tex]\(0.55 < value < \sqrt{4}\)[/tex] is [0.55, 2].
4. Sentences:
- When I was a child, I used to play in the park.
- How often do you visit your grandparents?
- Happily, she danced throughout the evening.
1. Calculating the Total Sum of the Given Numbers:
Let's sum up the given values: [tex]\(5.3, 0.5, 5.5, 0.3, 5.6, 0.6\)[/tex].
Total sum = [tex]\(5.3 + 0.5 + 5.5 + 0.3 + 5.6 + 0.6 = 17.8\)[/tex].
Therefore, the minimum amount of money to buy all items is 17.8.
2. Analyzing the Given Inequality Statements:
- The statement "0.2 > ?" is a contradiction because 0.2 is not greater than any positive number greater than 0, particularly the smallest value in our list (0.3). Hence, we conclude it is not possible to find a number that satisfies this inequality from the given set of numbers.
- "0.55 < value < [tex]\( \sqrt{4} \)[/tex]" can be interpreted correctly. The value of [tex]\(\sqrt{4}\)[/tex] is 2.
Therefore, the value should lie in the range [tex]\(0.55 < value < 2\)[/tex]. Hence the valid range for this statement is [0.55, 2].
3. Constructing Sentences with Different Fronted Adverbials:
- When I was a child, I used to play in the park.
- How often do you visit your grandparents?
- Happily, she danced throughout the evening.
These sentences begin with different fronted adverbials, as requested.
Summary:
1. The total sum of the given numbers is 17.8.
2. The value [tex]\(0.2 > ?\)[/tex] is impossible.
3. The valid range for the inequality [tex]\(0.55 < value < \sqrt{4}\)[/tex] is [0.55, 2].
4. Sentences:
- When I was a child, I used to play in the park.
- How often do you visit your grandparents?
- Happily, she danced throughout the evening.
