To calculate the division of 1 3 divided by 7 in fraction form, we need to express 1 3 as a fraction. Since the numerator is not divisible by 7, we can simply write it as a fraction with the same numerator and denominator: 1/3.
Now, to divide 1/3 by 7, we can multiply the numerator by the reciprocal of the denominator. The reciprocal of 7 is 1/7, so we have:
(1/3) ÷ 7 = (1/3) × (1/7)
Multiplying the numerators and denominators gives us:
(1 × 1) / (3 × 7) = 1/21
Therefore, 1 3 divided by 7 in fraction form is equal to 1/21.
In mathematics, when we want to express a division problem as a fraction, we need to represent it as a numerator (top number) divided by a denominator (bottom number).
So, what is the answer to 3 divided by 7 as a fraction? The answer is 3/7. In this fraction, 3 is the numerator and 7 is the denominator.
Dividing 3 by 7 means splitting 3 into 7 equal parts. However, since we cannot divide 3 equally into 7 parts, we leave it as a fraction.
This fraction, 3/7, is called a proper fraction. A proper fraction is where the numerator is smaller than the denominator. In this case, 3 is smaller than 7.
It's important to note that the fraction 3/7 cannot be simplified further because 3 and 7 do not have any common factors other than 1. So, 3/7 is said to be in its simplest or lowest form.
To recap, when we want to express 3 divided by 7 as a fraction, the answer is 3/7. This fraction represents the division of 3 into 7 equal parts.
As one of the fundamental mathematical operations, division plays a crucial role in solving problems involving quantities, measurements, and ratios.
So, what is 7 divided by 3 as a fraction? Let's break it down!
We can start by determining how many times the number 3 can evenly go into 7. In this case, it goes in twice (3 * 2 = 6). But what about the remaining 1?
To express this remainder in fraction form, we place it over the divisor, which is 3. Hence, the fraction 1/3 is derived. This means that 7 divided by 3 as a fraction is equal to 2 and 1/3.
Understanding division in terms of fractions allows us to precisely represent a value that falls between two whole numbers.
When we convert 7 divided by 3 into a fraction as 2 and 1/3, we can easily visualize it on a number line. The whole numbers are represented by points, and fractions are represented by segments placed between these points.
Using fractions provides a more detailed way to interpret division results compared to simply expressing them as decimal numbers. Fractions give us a better understanding of the relationship between the dividend and the divisor.
So, the next time you encounter a division problem like "What is 7 divided by 3 as a fraction?", you know that you can represent the answer as 2 and 1/3. This fraction serves as a precise and comprehensive representation of the result. Dividing numbers and expressing the answer as a fraction allows us to delve deeper into mathematical concepts and explore the world of proportions and ratios.
What is 7 times 1 3 in fraction form?
When we multiply 7 and 1 3, we can express the result in fraction form as follows.
7 times 1 3 is equal to 7/1 x 3/3.
By multiplying the numerators and denominators separately, we can simplify the expression.
So, 7 times 1 3 is equal to 21/3.
The fraction 21/3 can be further simplified by dividing both the numerator and denominator by their greatest common divisor, which is 3.
Therefore, 7 times 1 3 is equal to 7/1.
In conclusion, when multiplied together, the expression 7 times 1 3 simplifies to the fraction 7/1.
To find out what 1 3 divided by 2 is as a fraction, we need to perform the division operation.
Dividing 1 3 by 2 can be written as a fraction as follows: 1 3 / 2.
To divide a whole number by a fraction, we can convert the whole number into a fraction with a denominator of 1. Therefore, we can rewrite 1 as 1/1 to make the division calculation easier.
Now, we can rewrite the division problem as: (1/1) 3 / 2.
When we divide a fraction by another fraction, we multiply the first fraction by the reciprocal of the second fraction. In this case, the reciprocal of 2 is 1/2.
So, we can change the division problem to multiplication: (1/1) 3 * (1/2).
Multiplying the fractions, we get: (1 * 3) / (1 * 2).
The numerator becomes 3 and the denominator becomes 2.
Therefore, 1 3 divided by 2 as a fraction is 3/2.