# Multiple choice practice test

 1. (38 p.) Let $$A_0=(0,0)$$. Points $$A_1$$, $$A_2$$, $$\dots$$ lie on the $$x$$ axis and points $$B_1$$, $$B_2$$, $$\dots$$ lie on the graph of $$y=\sqrt x$$. Assume that for each $$k$$ the triangle $$A_{k-1}B_kA_k$$ is equilateral. Find the minimal $$n$$ such that $$A_0A_n\geq 100$$.    A    13    B    15    C    17    D    19    E    21    N

 2. (39 p.) Let $$ABCD$$ be a trapezoid with $$AB\|CD$$, $$AB=11$$, $$BC=5$$, $$CD=19$$, and $$DA=7$$. The bisectors of $$\angle A$$ and $$\angle D$$ meet at $$P$$, and bisectors of $$\angle B$$ and $$\angle C$$ meet at $$Q$$. Find the area of the hexagon $$ABQCDP$$.    A    $$28\sqrt 3$$    B    $$30\sqrt3$$    C    $$32\sqrt 3$$    D    $$35\sqrt 3$$    E    $$36\sqrt 3$$    N

 3. (3 p.) The table $$4\times 4$$ is filled with numbers as follows: $\begin{array}{|c|c|c|c|} \hline 1&2&3&4 \\ \hline 8&9&10&11\\ \hline 15&16&17&18\\ \hline 22&23&24&25\\ \hline \end{array}$ First reverse the order of numbers in the second row. Then reverse the order of numbers fourth row. Then sum the numbers on each of the diagonals. What is the positive difference between the two diagonal sums?    A    2    B    4    C    6    D    8    E    9    N

 4. (12 p.) Two points $$B$$ and $$C$$ are located on the segment $$AD$$. The length of $$AB$$ is 4 times the length of $$BD$$, and the length of $$AC$$ is 9 times the length of $$CD$$. Determine $$\frac{BC}{AD}$$.    A    $$\frac1{36}$$    B    $$\frac1{13}$$    C    $$\frac1{10}$$    D    $$\frac5{36}$$    E    $$\frac15$$    N

 5. (6 p.) Points $$C$$ and $$D$$ are on the same side of diameter $$AB$$ of circle $$k$$. Assume that $$\angle AOC=30^{\circ}$$ and $$\angle DOB=45^{\circ}$$. Let $$\alpha_1$$ denote the area of the smaller sector $$COD$$ of the circle, and let $$\alpha$$ denote the area of the entire circle. Calculate the ratio $$\frac{\alpha_1}{\alpha}$$.    A    $$\frac29$$    B    $$\frac14$$    C    $$\frac5{18}$$    D    $$\frac7{24}$$    E    $$\frac3{10}$$    N

2005-2018 IMOmath.com | imomath"at"gmail.com | Math rendered by MathJax