What is the absolute value of subtracting these rational numbers on a vertical number line diagram? -22-1 1/2
To find the absolute value of a subtraction, we need to subtract the numbers first.
-22 - 1 1/2 = -22 - 1.5 = -23.5
Since we are looking for the absolute value, we disregard the negative sign and take the opposite value: 23.5
Therefore, the absolute value of subtracting -22 and 1 1/2 on a vertical number line diagram is 23.5.
bot your wrong
Apologies for the confusion. Let's find the correct absolute value using a vertical number line diagram for clarity.
First, we have -22 as the starting point on the number line. To subtract 1 1/2 (or 3/2), we move downwards by 3/2 units.
Starting at -22, we move downward 1 unit to reach -23. Then, we move another 1/2 unit down.
So, the final result on the number line is -23 1/2.
To find the absolute value, we ignore the negative sign and take the opposite value: |-23 1/2| = 23 1/2.
Therefore, the correct absolute value of subtracting -22 and 1 1/2 on a vertical number line diagram is 23 1/2.
To find the absolute value of subtracting these rational numbers on a vertical number line diagram, follow these steps:
Step 1: Start by plotting the first number, -22, on the number line. Position a point on the line to represent this number.
Step 2: Now, we will subtract the second number, which is -1 1/2, from -22. To do this, begin at -22 on the number line and move 1 1/2 units in the positive direction (upwards).
Step 3: After moving 1 1/2 units from -22, mark the new position on the number line.
Step 4: Measure the distance between the initial point (-22) and the final point you marked. This distance represents the absolute value of subtracting these rational numbers.
Step 5: The measured distance will give you the absolute value. In this case, the distance is 20 1/2 units. So, the absolute value of subtracting -22 and -1 1/2 on a vertical number line diagram is 20 1/2.
Therefore, the absolute value of subtracting -22 and -1 1/2 on a vertical number line diagram is 20 1/2.
To find the absolute value of subtracting these rational numbers on a vertical number line diagram, you would follow these steps:
1. Draw a vertical number line.
2. Label the numbers on the number line.
3. Plot the starting point, which is -22.
4. To subtract 1 1/2, you need to convert it to a rational number. Multiply the whole number, 1, by the denominator, 2, to get 2. Then add the numerator, 1, to get 3. So, 1 1/2 can be written as a fraction, 3/2.
5. To subtract 3/2 from -22, move 3/2 units downward (since it is a negative value) from -22 on the number line.
6. Mark the new point where the subtraction ends.
To determine the distance between the two points, you can either count the number of units or use the absolute value function. In this case, we would need to find the absolute value of the result:
Absolute value is denoted by two vertical lines surrounding the number. For example, absolute value of -x can be written as |-x|.
The absolute value of the result would be |-22 - 3/2|. Now, simply calculate the absolute value of the subtraction:
|-22 - 3/2| = |-22 - 1.5| = |-23.5|
So, the absolute value of subtracting -22 and 1 1/2 on a vertical number line diagram is 23.5.