Problem 51
Question
Rewrite each expression without absolute value bars. $$|300|$$
Step-by-Step Solution
Verified Answer
The expression \(|300|\) without absolute value bars is 300.
1Step 1: Understand the absolute value notation
Absolute value is simply the distance of a number from the zero point on a number line, irrespective of the direction. For any positive number \(a\), the absolute value is \(a\). For any negative number \(-a\), the absolute value is also \(a\). You can also say that the absolute value of \(a\) is always non-negative.
2Step 2: Evaluate the absolute value of the given number
The given expression is the absolute value of 300, denoted as \(|300|\). Since 300 is a positive number, the absolute value of 300 is simply 300.
Other exercises in this chapter
Problem 51
In Exercises 15–58, find each product. $$ (x+1)^{3} $$
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Simplify each exponential expression. $$ \frac{25 a^{13} b^{4}}{-5 a^{2} b^{3}} $$
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add or subtract as indicated. $$ \frac{3}{5 x+2}+\frac{5 x}{25 x^{2}-4} $$
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Factor each perfect square trinomial. $$x^{2}-10 x+25$$
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