Final answer:
To find the fraction that is greater than 3/4 but less than 100% and is also a multiple of 0.3, we can consider fractions that meet each condition individually, such as fractions greater than 3/4, fractions less than 100%, and fractions that are multiples of 0.3. By combining these conditions, a possible fraction that satisfies all the given conditions is 9/10.
Step-by-step explanation:
To find the fraction that is greater than 3/4 but less than 100%, and is also a multiple of 0.3, we need to consider the given conditions:
The fraction is greater than 3/4
The fraction is less than 100%
The fraction is a multiple of 0.3
Let's break down each condition:
The fraction is greater than 3/4: The fraction that is greater than 3/4 can be 4/5, 5/6, 6/7, and so on.
The fraction is less than 100%: A fraction less than 100% is any fraction with a numerator less than its denominator. For example, 5/6 is less than 100%.
The fraction is a multiple of 0.3: A fraction that is a multiple of 0.3 can be 3/10, 6/10, 9/10, and so on.
Combining these conditions, a possible fraction that satisfies all the given conditions is 9/10.