Abraham needs one-half of a point to get an A– in Math. What rational number can be used to represent the number of points needed for Abraham to get an A–?(1 point)
The rational number that can be used to represent the number of points needed for Abraham to get an A– is 1/2.
Place the following numbers in order as they would appear on a number line, left to right: −2.0, 0.25, −1.02, 1.98.(1 point)
Responses
From left to right, the numbers would appear on the number line as follows:
-2.0, -1.02, 0.25, 1.98
Find the sum of p and q if p=34 and q=−114. Reduce your answer to lowest terms.(1 point)
The sum of p and q is obtained by simply adding their values:
p + q = 34 + (-114)
= -80
So, the sum of p and q is -80.
Add (−12) and (−15).(1 point)
Responses
To add -12 and -15, simply add the given values:
-12 + (-15) = -27
So, the sum of -12 and -15 is -27.
Add 10.82+(−15.96).(1 point)
To find the rational number that represents the points needed for Abraham to get an A– in Math, we need to understand the grading scale.
In this case, we know that Abraham needs one-half of a point to achieve an A–. Since a point is typically represented as the number 1, we can divide this number by 2 to find the rational number.
The rational number representing one-half is 1/2. This means that Abraham needs 1/2 of a point to get an A– in Math.
So, the rational number that can be used to represent the number of points needed for Abraham to get an A– is 1/2.