Problem Kangur_2005_0506_1 (3 pts) http://www.mathkangaroo.org

A butterfly sat down on a correctly solved problem. What number did it cover up?
2005 + 205 = 3500 -

Problem Kangur_2005_0506_2 (3 pts) http://www.mathkangaroo.org

Together, Anna and Olla have ten pieces of candy. Olla has two more pieces of candy than Anna. How many pieces of candy does Olla have?

Problem Kangur_2005_0506_3 (3 pts) http://www.mathkangaroo.org

There are eight kangaroos in the diagram (see the picture). What is the least number of kangaroos that have to be moved to the empty boxes in order to have two kangaroos in each row and each column?

Problem Kangur_2005_0506_4 (3 pts) http://www.mathkangaroo.org

Eva lives with her parents, a brother, a dog, two cats, two parrots, and four gold fish. How many legs do they have altogether?

Problem Kangur_2005_0506_5 (3 pts) http://www.mathkangaroo.org

2005 x 100 + 2005 =

Problem Kangur_2005_0506_6 (3 pts) http://www.mathkangaroo.org

An ant is walking from point A to point B on a cube along the indicated path. The edge of the cube is 12 cm long. How far does the ant need to travel?

Problem Kangur_2005_0506_7 (3 pts) http://www.mathkangaroo.org

On a shelf, there are 24 balls in three colors: white, red and brown. 1/8 of them are white, and 2/3 of the rest of the balls are red. How many of them are brown?

Problem Kangur_2005_0506_8 (3 pts) http://www.mathkangaroo.org

There are five cards on the table, labeled with numbers 1 to 5 as shown in the top row. One move consists of switching two cards. How many moves do you need to make so that the cards are arranged in the way shown in the bottom row?

Problem Kangur_2005_0506_9 (3 pts) http://www.mathkangaroo.org

Tom picked a natural number and multiplied it by 3. Which number CANNOT be the result of this multiplication?

A) 987
B) 444
C) 204
D) 105
E) 103

Problem Kangur_2005_0506_10 (3 pts) http://www.mathkangaroo.org

How many hours is half of a third part of a quarter of 24 hours?

Problem Kangur_2005_0506_11 (4 pts) http://www.mathkangaroo.org

Eva cut a paper napkin into 10 pieces. She then also cut one of the pieces into 10 pieces. She repeated this process two more times. Into how many pieces did she cut the napkin?

Problem Kangur_2005_0506_12 (4 pts) http://www.mathkangaroo.org

Mowgli usually walks from home to the beach, and returns on an elephant. It takes him 40 minutes altogether. One day he traveled on the elephant from home to the beach and back, which took him 32 minutes. How much time would he need to travel the same distance on foot?

Problem Kangur_2005_0506_13 (4 pts) http://www.mathkangaroo.org

A rectangular garden with an area of 30 m² was divided into three rectangular sections of flowers, vegetables, and strawberries (some of the dimensions are shown in the diagram). What is the area of the vegetable section, if the flower part has an area of 10 m²?

Problem Kangur_2005_0506_14 (4 pts) http://www.mathkangaroo.org

Grandpa suggested dividing all peanuts between the family members in the following way: one person would get 5 kilos, two people would get 4 kilos each, four people would get 2 kilos each, two people would get 1.5 kilo each, and one person would not get any nuts. Grandma suggested dividing the peanuts equally among all of the family members. For how many people would the division suggested by Grandma be better than the one suggested by Grandpa?

Problem Kangur_2005_0506_15 (4 pts) http://www.mathkangaroo.org

How many two digit numbers are there, which can be expressed only by using different odd digits?

Problem Kangur_2005_0506_16 (4 pts) http://www.mathkangaroo.org

Which of the cubes below represents the plan of the cube shown to the right?

Problem Kangur_2005_0506_17 (4 pts) http://www.mathkangaroo.org

Sum of five consecutive natural numbers is equal to 2005. What is the greatest number among them?

Problem Kangur_2005_0506_18 (4 pts) http://www.mathkangaroo.org

What is the number of all divisors of number 100?

Problem Kangur_2005_0506_19 (4 pts) http://www.mathkangaroo.org

The frame of a rectangular painting was made out of wooden pieces of the same width. What is the width of those pieces if the outer perimeter of the frame is 8 decimeters longer than the inner perimeter?

Problem Kangur_2005_0506_20 (4 pts) http://www.mathkangaroo.org

How many more triangles than squares are shown in the picture?

Problem Kangur_2005_0506_21 (5 pts) http://www.mathkangaroo.org

There are five containers in a treasure chest, in each container there are three boxes and in each box there are 10 golden coins. The treasure chest, the containers, and the boxes are all locked. How many locks do you need to open to get 50 coins?

Problem Kangur_2005_0506_22 (5 pts) http://www.mathkangaroo.org

What number should replace x, if we know that the number in the circle in the upper row is the sum of the numbers from the two circles right below it.

Problem Kangur_2005_0506_23 (5 pts) http://www.mathkangaroo.org

In a two-digit number, a is the tens digit and b is the ones digit. Which of the conditions below ensures that the number will be divisible by 6?

A) a + b = 6
B) b = 6 a
C) b = 5 a
D) b = 2 a
E) a = 2 b

Problem Kangur_2005_0506_24 (5 pts) http://www.mathkangaroo.org

A wooden cube with the length of its side equal to 3 dm was painted with 0.25 kg of paint. The cube was then cut up into unit cubes (side length of 1 dm). How much paint is needed to paint the unpainted sides of the little cubes?

Problem Kangur_2005_0506_25 (5 pts) http://www.mathkangaroo.org

Five circles have radii of the same length (see the picture). Four of them are touching the fifth circle, and their centers are the vertices of a square. The ratio of the area of the shaded region of the circles to the area of unshaded regions of the circles is:

Problem Kangur_2005_0506_26 (5 pts) http://www.mathkangaroo.org

From noon until midnight, Wise Cat sleeps under a chestnut tree. From midnight until noon he is awake telling stories. There is a note on that tree which says: "Two hours ago, Wise Cat was doing the same thing that he will be doing in an hour". How many hours, out of 24 hours, is the note true?

Problem Kangur_2005_0506_27 (5 pts) http://www.mathkangaroo.org

Mark has 42 cubes with side length of 1 cm. He used them to construct a prism, the base of which has a perimeter of 18 cm. What is the height of that prism?

Problem Kangur_2005_0506_28 (5 pts) http://www.mathkangaroo.org

On the board Peter wrote all the three-digit numbers that have the following properties: the digits in each of the numbers are different, the first digit is the square of the quotient of the second digit and the third digit. How many numbers did Peter write?

Problem Kangur_2005_0506_29 (5 pts) http://www.mathkangaroo.org

Equilateral triangle ABC (all sides congruent) has an area equal to 1. A bigger triangle was constructed out of 49 of these triangles (see the picture). The area of the shaded region is equal to:

Problem Kangur_2005_0506_30 (5 pts) http://www.mathkangaroo.org

Mary, Dorothy, Sylvia, Ella, and Kathy are sitting on a bench in the park. Mary is not sitting on the farthest right side; Dorothy is not sitting the farthest to the left. Sylvia is not sitting the farthest to the left nor the farthest to the right. Kathy is not sitting next to Sylvia, and Sylvia is not sitting next to Dorothy. Ella is sitting to the right of Dorothy, but not necessarily next to her. Which girl is sitting the farthest to the right?