Linear equations and inequalities

1003037501

Level: 
B
The difference of one-fifth of the unknown number and one-half of the number is greater than the difference of the number and thirteen. How many natural numbers do satisfy the given condition? (Note: Natural numbers are corresponding to positive integers.)
\( 9 \)
\( 10 \)
infinity
\( 18 \)

1003037502

Level: 
B
Five more than one-third of the unknown number is smaller than three times the difference of this number and five. Which numbers do satisfy the given condition?
greater than \( \frac{15}2 \)
greater than \( \frac{15}4 \)
greater than \( \frac{25}4 \)
greater than \( \frac52 \)

1003046901

Level: 
B
We are given the inequality \( -2x-\frac52 > 5-\frac x3 \). Decide which of the following inequalities is equivalent to the given inequality, i.e. which of the following inequalities was obtained from the given inequality by equivalent transformations.
\( 12x+15 < 2x-30 \)
\( 12x+15 > 2x-30 \)
\( 12x-15 > 2x-30 \)
\( 12x-15 < 2x+30 \)

1003046902

Level: 
B
We are given the inequality \( 5-\frac{x+2}3 \leq \frac{2-x}6 \). Decide which of the following inequalities is equivalent to the given inequality, i.e. which of the following inequalities was obtained from the given inequality by equivalent transformations.
\( 26-2x \leq 2-x \)
\( 34-2x \leq 2-x \)
\( 26-2x \geq 2-x \)
\( 28-2x \leq 2-x \)

1003046903

Level: 
B
We are given the inequality \( 3x+\frac{5-6x}2 > -2 \). Decide which of the following inequalities is equivalent to the given inequality, i.e. which of the following inequalities was obtained from the given inequality by equivalent transformations.
\( 0\cdot x > -9 \)
\( 0\cdot x > 9 \)
\( 0\cdot x < -9 \)
\( 3\cdot x > -9 \)

1003046904

Level: 
B
We are given the inequality \( \frac1x+1 > \frac3{2x} \). Decide which of the following inequalities has the different solution set than the given inequality has, i.e. choose the inequality which is not equivalent to the given inequality.
\( 1+x > \frac32 \)
\( \frac2x+2>\frac3x \)
\( 1>\frac3{2x}-\frac1x \)
\( \frac1x-\frac3{2x}>-1 \)