Page 1 of 1

### BdMO National Junior 2015 Problemset

Posted: Tue Feb 19, 2019 10:59 am
Problem 1.
A small country has a very simple language. People there have only two letters and all their words have exactly seven letters. Calculate the number maximum of words people use in that country?

Problem 2
In the following figures, the larger circles are identical and so are the smaller ones. In \$(i)\$ the circles have a common center and the lines \$AD\$ and \$BC\$ divide both the circles in four equal halves. The larger circle has an area of \$100\$ square meters. Find the area of the shaded region in figure\$(ii)\$.
Screenshot_2019-02-19-10-53-00-1.png (15.12 KiB) Viewed 1591 times
Problem 3.
A circus party has the same number of lions as tigers. You asked to the owner of the circus the number of lions and tigers. He gave you the following information:
(i) An elephant is enough to feed all the tigers and lions in the circus.
(ii) Eighteen deers produce the same amount of meat as an elephant does.
(iii) A lion eats twice as much as a tiger.
(iv) One buffalo is enough to feed a lion and a tiger.
(v) A tiger will eat exactly the same amount of meat a deer has.
Find the number of tigers and lions in that circus party.

Problem 4
In the following figure \$BKLGNM\$, \$CMNHPO\$ and \$DOPIRQ\$ are regular hexagons (all six sides of each hexagon are equal and so are the angles). \$ BKLGNM\$ has an area of \$24\$ square units. What is the area of the rectangle \$AFJE\$?
Screenshot_2019-02-19-10-22-39-1.png (13.09 KiB) Viewed 1591 times
Problem 5

In a party, boys shake hands with girls but each girl shake hands with everyone else .If there are \$40\$ handshakes , find out the number of boys and girls in the party ?

Problem 6.
\$ABCD\$ is a parallelogram where \$\angle{ACB}=80^{\circ} \$ \$\angle{ACD}=20^{\circ} \$ ,\$P\$
is a point on \$AC\$ such that,\$\angle{ABP}=20^{\circ} \$ and \$Q\$ is a point on \$AB\$ such that \$\angle{ACQ}=30^{\circ} \$ .Find the magnitude of the angle determined by the lines \$CD\$ and \$PQ\$.