Convert into a decimal.
Convert \( \frac{11}{200} \) into a decimal.
Convert \( \frac{1}{2} \) into a decimal.
Convert \( \frac{13}{2} \) into a decimal.
Convert \( \frac{22}{20} \) into a decimal.
Convert \( \frac{2}{5} \) into a decimal.
Convert into a decimal.
To solve the problem of converting into a decimal, we will scale the fraction so the denominator becomes 1000, which facilitates easier conversion to a decimal number.
First, observe that:
Having the fraction , it is straightforward to convert it to a decimal by placing the decimal point three places from the right in the numerator, because 1000 has three zeros.
This results in the decimal number:
Therefore, the decimal representation of is 0.055.
0.055
Convert into a decimal.
To solve this problem, we'll express the fraction as a decimal following these steps:
This fraction is read as 50 hundredths, which converts directly to the decimal form:
Therefore, the decimal representation of the fraction is 0.5.
0.5
Convert into a decimal.
To solve this problem, we'll follow this approach:
Now, let's work through each step:
Step 1: We have the fraction .
Step 2: Divide 13 by 2 using long division:
When you divide 13 by 2, 2 goes into 13 six times (since ), leaving a remainder of 1. Bring down the decimal point and continue division. Hence, 10 divided by 2 gives 5. Therefore, the decimal equivalent of is .
Step 3: Verification via mixed conversion: Recognizing .
Therefore, the solution to convert into a decimal is .
Hence, the correct choice among the given options is: \textbf{6.5}
6.5
Convert into a decimal.
To convert the fraction into a decimal, we will perform the following steps:
Therefore, the decimal form of is .
Based on the provided answer choices, the correct choice is 1.1 (Choice 1).
The solution to the problem is .
1.1
Convert into a decimal.
To solve this problem, we'll follow these steps:
Let's work through these steps:
Step 1: We have the fraction . To convert 5 to 100, multiply both the numerator and the denominator by 20, because .
Step 2: Multiply the numerator and denominator to get .
Step 3: The fraction can be written as a decimal:
divided by is equal to .
Therefore, the solution to the problem is 0.4.
0.4
Convert \( \frac{3}{20} \) into a decimal.
Convert \( \frac{4}{25} \) into a decimal.
Convert to decimal fraction \( \frac{5}{4} \)
Convert to decimal fraction \( \frac{}{}\frac{8}{5} \)
Convert \( \frac{12}{5} \) into a decimal.
Convert into a decimal.
To solve this problem, we'll utilize multiplication to simplify the conversion process:
Therefore, the fraction converts to a decimal as 0.15.
This calculation aligns with the answer choice provided, making option
0.15
Convert into a decimal.
To convert into a decimal, we can make the denominator a power of 10. Follow these steps:
Therefore, the decimal representation of is 0.16.
0.16
Convert to decimal fraction
To solve this problem, we'll follow these steps:
Now, let's work through each step:
Step 1: The fraction given is .
Step 2: Perform the long division:
Divide 5 by 4:
Step 3: Convert it to a fraction with a denominator of 100:
- Multiply by 25 to make an equivalent fraction , which directly converts to 1.25 in decimal.
Therefore, the solution to the problem is 1.25.
1.25
Convert to decimal fraction
To solve this problem, we'll focus on converting the fraction into a decimal. Let's follow these steps:
Now, let's work through each step:
Step 1: Divide 8 by 5. Performing this division,
.
Step 2: Alternatively, adjust to a denominator of 100. Multiply both the numerator and the denominator by 20:
.
Converting to a decimal gives us 1.6.
Through both methods, we verify that the decimal representation of is 1.6.
Thus, the solution to the problem is 1.6.
1.6
Convert into a decimal.
2.4