How can you describe a rational number as a quotient when the divisor is not zero
To write 14 programming errors for every 56 programmers as a simplified rational number, we can simplify the fraction 14/56.
Dividing both the numerator and denominator by their greatest common divisor (which is 14), we get:
14 ÷ 14 / 56 ÷ 14 = 1/4
Therefore, the simplified rational number that represents this scenario is 1/4.
A rational number can be described as a quotient when the divisor is not zero because every rational number can be expressed as the ratio of two integers, where the denominator is not zero.
For example, let's consider the rational number 2/3. This can be expressed as the quotient of 2 divided by 3. The numerator, 2, is an integer, and the denominator, 3, is also an integer that is not zero. So, we can describe 2/3 as the quotient of 2 divided by 3.
Similarly, any other rational number can be expressed as the quotient of two integers, as long as the denominator is not zero. It is the fundamental property of rational numbers to be able to be written as a ratio or quotient of integers.
Which of the following is a rational number
7.8
√7
π
The rational number among the options given is 7.8.
How do you write 14 programming errors for every 56 programmers as a rational number select the simplify rational numbers that represent this scenario
14/56
1/4
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13-x=6
To solve the equation 13 - x = 6, we can isolate the variable x by performing inverse operations.
First, we can subtract 13 from both sides of the equation:
(13 - x) - 13 = 6 - 13
Simplifying:
-x = -7
Next, to solve for x, we multiply both sides of the equation by -1 to eliminate the negative sign:
(-1)(-x) = (-1)(-7)
Simplifying:
x = 7
Therefore, the solution to the equation 13 - x = 6 is x = 7.