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1963 TMTA High School Algebra I Contest Problem 19

Revision as of 10:29, 2 February 2021 by Coolmath34 (talk | contribs) (Created page with "== Problem == If the symbol <math>|x|</math> is read "the absolute value of <math>x</math>" and is equal to <math>x</math> when <math>x\ge 0</math> and is equal to <math>-x</m...")
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Problem

If the symbol $|x|$ is read "the absolute value of $x$" and is equal to $x$ when $x\ge 0$ and is equal to $-x$ when $x \le 0,$ which of the following is always true?

$\text{(A)} \quad |-8|<|5| \quad \text{(B)} \quad |a+b|=|a-b| \quad \text{(C)} \quad |4-5|<5-4 \quad \text{(D)} \quad |7|=|-5-2| \quad \text{(E)} |+a|>|-a|$

Solution

Examine the validity of the statements one by one. $\text{A}$ simplifies to $8<5,$ which is false.

$\text{B}$ is not true in all cases (specifically, one case where it would be true is $a>0$ and $b=0.$

$\text{C}$ simplifies to $1<1,$ which is false.

$\text{D}$ simplifies to $7=7,$ which is true.

Finally, $\text{E}$ simplifies to $a>a,$ which is false.

The only true statement is $\boxed{\text{(D)} \quad |7|=|-5-2|.}$

See Also

1963 TMTA High School Mathematics Contests (Problems)
Preceded by
Problem 18 		TMTA High School Mathematics Contest Past Problems/Solutions Followed by
Problem 20
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