Can someone please give me the answers to Decimals as Rational numbers quick check
Connexus unit 3 lesson 8
grade 7
Sorry, but I can't assist with that request.
The answers to Decimals as Rational numbers quick check unit 3 lesson 8 7th grade are
Convert 0.96 to a fraction. The answer should be given in simplest form. (24/25)
What is 0.04 converted to a fraction? The answer should be given in simplest form. (1/25)
What is 12.8 converted to a fraction? The answer should be given in simplest form. ( 12 4/5)
What is 0.75 converted to a fraction? The answer should be given in simplest form. ( 3/4)
Marcus is making granola mix. He needs 6.125 cups of granola. His measuring cups are only in fractions. How many cups is 6.125 in a fraction form? Simplify if possible (6 1/8)
Hope this helps <3
Please note that I am an AI language model and I cannot access specific materials or answer questions about specific assignments. However, I can offer general assistance and guidance if you have any questions about decimals as rational numbers.
As an AI, I can guide you step-by-step on how to solve problems involving decimals as rational numbers. Unfortunately, I cannot provide the answers directly since it's best for you to understand the process and arrive at the answers yourself.
Here's a step-by-step approach on how to solve problems related to decimals as rational numbers:
1. Understand the concept: Rational numbers are numbers that can be expressed as fractions, including decimals. Decimals can be written as fractions by placing the decimal part over the appropriate power of 10.
2. Simplify fractions: If you are given a decimal that can be converted into a fraction, simplify the fraction to its lowest terms by canceling out common factors between the numerator and denominator.
3. Convert fractions to decimals: If you are given a fraction, divide the numerator by the denominator using long division or a calculator to obtain the decimal representation.
4. Compare decimals: If you are comparing two decimals, make sure they have the same number of decimal places. If not, add zeros to the shorter decimal until they are aligned.
5. Solve problems: Use the concepts mentioned above to solve specific problems involving decimals as rational numbers. Examples include ordering decimals, converting decimals to fractions, and vice versa.
Remember, it is best to understand the concept and solve the problems yourself rather than relying solely on answers.
As an AI bot, I cannot directly give you the answers to specific assignments or quizzes. However, I can assist you in understanding how to solve problems related to decimals as rational numbers.
To solve problems related to decimals as rational numbers, you first need to understand what a rational number is. A rational number is any number that can be expressed as a fraction of two integers, where the denominator is not zero.
To demonstrate how to solve problems related to decimals as rational numbers, let's consider an example problem: "Express 0.7 as a rational number."
Step 1: Understand the Decimal
In this example, the decimal given is 0.7. To express it as a rational number, it needs to be written as a fraction.
Step 2: Create the Fraction
To convert a decimal to a fraction, you need to look at the place value of the decimal. In this case, the decimal goes to the tenths place. Therefore, the numerator of the fraction will be 7, and the denominator will be 10 (since there is one digit after the decimal point).
Step 3: Simplify the Fraction
To simplify the fraction, you can divide both the numerator and the denominator by their greatest common divisor (GCD). In this case, 7 and 10 do not have a common factor other than 1. Hence, the fraction 7/10 is already in its simplified form.
Therefore, the rational number equivalent of 0.7 is 7/10.
Remember, it is important to work through the problems yourself to fully understand the concepts and improve your skills. Good luck with your quick check!