Contents

- 1 How do you find the absolute value on a graph?
- 2 How do you do absolute value inequalities?
- 3 What is the range of the absolute value parent function?
- 4 Can two numbers have the same absolute value?
- 5 What is the absolute value of 8?
- 6 What is the absolute value of 3?
- 7 How do you solve an absolute value algebraic expression?
- 8 What are the rules of absolute value?
- 9 How do you simplify?

## How do you find the absolute value on a graph?

f (x) = – | x + 2| + 3 In general, the graph of the absolute value function f (x) = a| x – h| + k is a “V” with vertex (h, k), slope m = a on the right side of the vertex (x > h) and slope m = – a on the left side of the vertex (x < h).

## How do you do absolute value inequalities?

Isolate the absolute value expression on the left side of the inequality. If the number on the other side of the inequality sign is negative, your equation either has no solution or all real numbers as solutions. Use the sign of each side of your inequality to decide which of these cases holds.

## What is the range of the absolute value parent function?

The vertex of y = |x| is found at the origin as well. Since it extends on both ends of the x-axis, y= |x| has a domain at (-∞, ∞). Absolute values can never be negative, so the parent function has a range of [0, ∞).

## Can two numbers have the same absolute value?

Hence if domain is real number for each absolute value there are two different numbers one can have with same absolute value. However, if domain is Complex numbers, absolute value of a number a+bi is √a2+b2 and for each absolute value there could be infinite different numbers with same absolute value.

## What is the absolute value of 8?

Absolute value is always nonnegative, since distance is always nonnegative. For example, the absolute value of 8 is 8, since 8 is 8 units from 0 on the number line. The absolute value of − 8 is also 8, since − 8 is also 8 units from 0 on the number line.

## What is the absolute value of 3?

For example, the absolute value of 3 is 3, and the absolute value of − 3 is also 3. The absolute value of a number may be thought of as its distance from zero.

## How do you solve an absolute value algebraic expression?

SOLVING EQUATIONS CONTAINING ABSOLUTE VALUE (S)

- Step 1: Isolate the absolute value expression.
- Step2: Set the quantity inside the absolute value notation equal to + and – the quantity on the other side of the equation.
- Step 3: Solve for the unknown in both equations.
- Step 4: Check your answer analytically or graphically.

## What are the rules of absolute value?

Absolute value equations are equations where the variable is within an absolute value operator, like |x-5|=9. The challenge is that the absolute value of a number depends on the number’s sign: if it’s positive, it’s equal to the number: |9|=9. If the number is negative, then the absolute value is its opposite: |-9|=9.

## How do you simplify?

To simplify any algebraic expression, the following are the basic rules and steps:

- Remove any grouping symbol such as brackets and parentheses by multiplying factors.
- Use the exponent rule to remove grouping if the terms are containing exponents.
- Combine the like terms by addition or subtraction.
- Combine the constants.