2010010003 Level: AChoose the true statement.\( |3-4| \leq |4-3|\)\( |3-6| > |6-3|\)\( |2-7| < |7-2|\)\( |3-8| = |8+3|\)
2010010004 Level: AChoose the true statement.\( |3-7| \leq |7-3|\)\( |4-6| > |6-4|\)\( |1-7| < |7-1|\)\( |2-8| = |8+2|\)
2010010005 Level: AEvaluate the following expression. \[ ||3-4|-2\cdot |1-5||\]\( 7\)\( 9\)\(6\)\( 8\)
2010010006 Level: AEvaluate the following expression. \[ ||2-4|-2\cdot |1-3||\]\( 2\)\( 7\)\(6\)\( 8\)
9000078509 Level: AEvaluate the following expression. \[ |3 - 7|-|2(-4)| + |(-5)(-2)| \]\(6\)\(14\)\(22\)\(- 2\)
1003124201 Level: BWhich equation describes real numbers \( x \) that are equidistant from the numbers \( 6 \) and \( -3 \) on the number line?\( |x-6|=|x+3| \)\( |x+6|=|x+3| \)\( |x-6|=|x-3| \)\( |x+6|=|x-3| \)
1003124203 Level: BAssuming \( x < 0 \), the expression \( \bigl| |x|+2 \bigr| \) is equal to:\( -x+2 \)\( x+2 \)\( -x-2 \)\( x-2 \)
1003124204 Level: BLet \( x\neq0 \). Complete the following sentence to get a true statement. The solution set of the inequality \( \frac{|x|}x>2 \)does not contain any integer.contains \( 2 \) integers.contains only natural numbers.contains infinitely many integers.
1003124205 Level: BAssuming \( x\in(4;7) \), the expression \( |x-4|-|x-7| \) can be written in the form:\( 2x-11 \)\( -2x+11 \)\( 3 \)\( -11 \)
1003124207 Level: BOn the real number line, the distance of a number \( x \) from the number \( -4 \) is given by:\( |x+4| \)\( |x-4| \)\( |4x| \)\( |x|+4 \)