Use the additive inverse to find 8.76−26.54.

To find the additive inverse of a number, we change its sign.

The additive inverse of 26.54 is -26.54.

Therefore, 8.76 - 26.54 can be written as 8.76 + (-26.54).

Adding these two numbers, we get -17.78.

So, 8.76 - 26.54 = -17.78.

Use the additive inverse to find −1223−(−856). Write the answer as a mixed number.

To find the additive inverse of a number, we change its sign.

The additive inverse of -856 is 856.

Therefore, -1223 - (-856) can be written as -1223 + 856.

Subtracting these two numbers, we get -367.

So, -1223 - (-856) = -367.

As a mixed number, -367 is -366 and 1.

Use the additive inverse to find −12 2/3 − (−8 5/6). Write the answer as a mixed number.

To find the additive inverse of a number, we change its sign.

The additive inverse of -8 5/6 is 8 5/6.

Therefore, -12 2/3 - (-8 5/6) can be written as -12 2/3 + 8 5/6.

Converting both mixed numbers to improper fractions, we have -38/3 + 53/6.

We need to find a common denominator for 3 and 6, which is 6.

-38/3 can be rewritten as -76/6.

-76/6 + 53/6 = -23/6.

The answer, as a mixed number, is -3 5/6.

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 subtracting -22 and -1 1/2, we need to find the difference between the two numbers and then take the absolute value.

-22 - 1 1/2 can be rewritten as -22 - 3/2.

Finding a common denominator for the subtraction, we have -22 - 3/2 = -44/2 - 3/2 = -47/2.

To take the absolute value, we disregard the negative sign, so the absolute value of -47/2 is 47/2.

However, on a vertical number line diagram, the absolute value can be represented as the distance between the numbers in question without considering the direction.

So, the distance between -22 and -1 1/2 is 47/2 units on the number line diagram.

−22 − 1 1/2

To subtract -1 1/2 from -22, we need to find a common denominator.

-1 1/2 can also be written as -3/2.

Now we can subtract:

-22 - 3/2 = -44/2 - 3/2 = -47/2.

Therefore, -22 - 1 1/2 is equal to -47/2.

Jason rides his bike home from school 2 miles. On his way back home from school, he passes his house to go to his friend's house, which is a mile farther. What is the total distance Jason traveled from school?

From the provided information, we can calculate the total distance Jason traveled.

Jason rides his bike home from school 2 miles, and then he passes his house to go to his friend's house, which is another mile farther.

Therefore, the total distance Jason traveled from school is 2 miles + 1 mile = 3 miles.

12 − (−8).

To subtract -8 from 12, we simply add 8 to 12.

12 - (-8) = 12 + 8 = 20.

What’s the distance between 18.25 and -7.4 on a number line

−1223−(−856). Write the answer as a mixed number.

−12 2/3−(−8 5/6). Write the answer as a mixed number.