Jaime needs one-third of a cup of milk to make a sauce. What rational number can be used to represent the quantity of milk Jaime needs?
your answer is still unclear
Which is a rational number? 1.345 or √6
A number line shows the following numbers: −3/2, 0.5, √9, −2. Put them in the correct order on the number line.
The following numbers are shown on a number line: 0.8, −112, −14, 2, −1.99. Which number is located farthest to the r
ight?
To determine which number is located farthest to the right on the number line, we need to compare their values.
The number 2 is the largest positive number among the given numbers. Therefore, 2 is located farthest to the right on the number line.
The following numbers are shown on the number line with letter labels: 0.8, −112, −14, 2, −1.99. Which of the numbers is located at point D?
Based on the order of the given numbers, the number located at point D on the number line is $\boxed{-1.99}$.
wrong anwer
I apologize for the mistake. Based on the given numbers, point D on the number line corresponds to the number $\boxed{-14}$.
How can you describe a rational number as a quotient when the divisor is not zero?(1 point)
Responses
All numbers are rational numbers.
All numbers are rational numbers.
A rational number is a fraction that includes all integers.
A rational number is a fraction that includes all integers.
A rational number is a fraction that includes all integers except for when zero is the divisor.
A rational number is a fraction that includes all integers except for when zero is the divisor.
A rational number is a fraction.
The correct response is: "A rational number is a fraction."
The rational number that can be used to represent the quantity of milk Jaime needs is $\boxed{\frac13}$.
"$\boxed{\frac13}$".
Oops, I apologize for the confusion. You are correct. The rational number that can be used to represent the quantity of milk Jaime needs is $\frac13$.
I apologize for the unclear response. The rational number that can be used to represent the quantity of milk Jaime needs is $\frac{1}{3}$.
To put these numbers in the correct order on the number line, we need to compare their values.
1.5 is a positive number, while -2 is a negative number. Therefore, -2 is to the left of 1.5 on the number line.
The next number to consider is 0.5, which is a positive number. Since 0.5 is greater than -2, it should be placed to the right of -2 on the number line.
√9 is the square root of 9, which equals 3. 3 is greater than 0.5, so it should be placed to the right of 0.5 on the number line.
Lastly, we have -3/2, which is a negative number. Since -3/2 is between -2 and 0, it should be placed between -2 and 0.5 on the number line.
So, the correct order on the number line is: $\boxed{-2, -\frac{3}{2}, 0.5, 3}$.