How do you write 14 programming errors for every 56 programmers as a rational number? Select the rational number that represents this scenario. A: 14 B: 4 C: 56 D: 14/56
To find the rational number that represents the scenario of 14 programming errors for every 56 programmers, we can express it as a fraction by placing the number of errors (14) in the numerator and the number of programmers (56) in the denominator.
Therefore, the rational number that represents this scenario is D: 14/56.
The number line has the following numbers: 1 3/4, -1.5, -1.1, 1.03. Put the numbers in the correct order, A-D.
-1.5, -1.1, 1.03, 1 3/4
1 3/4, -1.5, -1.1, 1.03
-1.1, -1.5, 1.03, 1 3/4
1.03, -1.1, -1.5, 1 3/4
The correct order of the numbers on the number line is:
C: -1.1, -1.5, 1.03, 1 3/4
The following numbers are shown on the number line: 1.8, 0.8, 3.1, -1.2, 2 3/4. Which number is represented by point B? A: 2 3/4 B: -1.2 C: -1.8 D: 0.8
Number B is represented by -1.2.
To write the ratio of 14 programming errors for every 56 programmers as a rational number, we need to express it as a fraction.
The given ratio is 14 errors for every 56 programmers. We can simplify this by dividing both the numerator and denominator by the greatest common divisor (GCD), which in this case is 14.
14 / 14 = 1
56 / 14 = 4
Therefore, the simplified rational number representing the given scenario is:
D: 14/56
To determine the rational number that represents the scenario of writing 14 programming errors for every 56 programmers, we need to express the ratio of errors to programmers as a fraction.
The number of programming errors (14) would be the numerator of the fraction, while the number of programmers (56) would be the denominator.
So, the answer would be D: 14/56.