# What Is the Distance between -6.75 and -71.25?

Author Dominic Townsend

Posted Jul 30, 2022

The distance between -6.75 and -71.25 can be found by subtracting -6.75 from -71.25. The answer is 64.5.

## What is the absolute value of the difference between -6.75 and -71.25?

The absolute value of the difference between -6.75 and -71.25 can be expressed as a positive number by subtracting the smaller number from the larger number. In this case, the absolute value would be 71.25 - (-6.75), which equals 71.25 + 6.75, or 77.

The absolute value of a number is the distance from zero on a number line, regardless of direction. Therefore, the absolute value of the difference between -6.75 and -71.25 would be 77.

## What is the distance between -6.75 and -71.25 on a number line?

When determining the distance between two numbers on a number line, we count the number of spaces between the numbers. In this case, there are 73.5 spaces between -6.75 and -71.25.

## What is the distance between -6.75 and -71.25 in terms of absolute value?

The absolute value of a number is the numerical value of the number without its sign. So the absolute value of -6.75 is 6.75, and the absolute value of -71.25 is 71.25. The distance between these two numbers in terms of absolute value is 64.5.

## How many units are there between -6.75 and -71.25?

There are 64 units between -6.75 and -71.25. To find the answer, begin by finding the unit value of each number. The unit value of -6.75 is 1, and the unit value of -71.25 is 10. Then, subtract the unit value of -6.75 from the unit value of -71.25. This yields 9. Finally, multiply 9 by the number of units in a decade, which is 10. The answer is therefore 9 * 10, or 90.

## What is the magnitude of the difference between -6.75 and -71.25?

The magnitude of the difference between -6.75 and -71.25 is 64.5.

## What is the difference between -6.75 and -71.25 in terms of magnitude?

The difference between -6.75 and -71.25 in terms of magnitude is quite significant. The former is only slightly negative, while the latter is quite negative. This difference in magnitude can be attributed to the fact that the former is closer to zero on the number line, while the latter is further away from zero.

## How many whole numbers are there between -6.75 and -71.25?

There are 66 whole numbers between -6.75 and -71.25.

-6.75, -6.25, -5.75, -5.25, -4.75, -4.25, -3.75, -3.25, -2.75, -2.25, -1.75, -1.25, -0.75, -0.25,

0.25, 0.75, 1.25, 1.75, 2.25, 2.75, 3.25, 3.75, 4.25, 4.75, 5.25, 5.75, 6.25, 6.75, 7.25,

7.75, 8.25, 8.75, 9.25, 9.75, 10.25, 10.75, 11.25, 11.75, 12.25, 12.75, 13.25, 13.75,

14.25, 14.75, 15.25, 15.75, 16.25, 16.75, 17.25, 17.75, 18.25, 18.75, 19.25, 19.75,

20.25, 20.75, 21.25, 21.75, 22.25, 22.75, 23.25, 23.75, 24.25, 24.75, 25.25, 25.75,

26.25, 26.75, 27.25, 27.75, 28.25, 28.75, 29.25, 29.75, 30.25, 30.75, 31.25, 31.75,

32.25, 32.75, 33.25, 33.75, 34.25, 34.75, 35.25, 35.75, 36.25, 36.75, 37.25, 37.75,

38.25, 38.75, 39.25, 39.75, 40.25, 40.75, 41.25, 41.75, 42.25, 42.75, 43.25, 43.75,

44.25, 44.75, 45.25, 45.75, 46.25, 46.75, 47.25, 47.75, 48.25, 48.75, 49.

## How many decimal numbers are there between -6.75 and -71.25?

There are an infinite number of decimal numbers between -6.75 and -71.25. This is because there are an infinite number of numbers between any two numbers on the number line.

## What is the distance between -6.75 and -71.25 in terms of units?

The distance between -6.75 and -71.25 can be measured in terms of units by using the absolute value function. The absolute value of a number is the distance from that number to zero on a number line. The absolute value of -6.75 is 6.75, and the absolute value of -71.25 is 71.25. The distance between -6.75 and -71.25 is therefore the absolute value of the difference between these two numbers, which is 64.5.

This answer can be verified by plotting -6.75 and -71.25 on a number line. The distance between these two numbers is the same as the distance between 0 and 64.5 on the number line.

### What are some examples of absolute values?

x + 3 | = -2 4x - 2 | + 4 = 12

### How do I solve an absolute value equation?

To solve an absolute value equation, start by simplifying the equation. If the left side of the equation has an absolute value function, then that will help you simplify the equation. If the right side of the equation is just equal to a value, you can solve for that value using standard algebraic methods.

### What is the definition of absolute distance?

The absolute distance of an object from the origin (0,0) is the actual distance of the object from zero on a coordinate plane.

### What is an absolute value?

The absolute value is a mathematical concept which refers to the distance of a number on the number line from 0 without taking into consideration which direction from zero the number lies. The absolute value of a number can never have negative values.

### How do you solve an absolute value problem?

To solve an absolute value problem, you must first rewrite the equation as two separate equations. The positive equation will represent the magnitude of the absolute value, and the negative equation will represent the direction of the absolute value. Next, you must solve each equation separately. When solving an absolute value equation, you need to remember that the magnitude always refers to a positive number and the direction always refers to a negative number. After solving each equation, you can substitute your answers back into the original equation to verify that your solutions are valid. Finally, you can write out the final solution or graph it as needed.

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