UNIVERSITY OF NORTHERN COLORADO

MATHEMATICS CONTEST

First Round

For all Colorado Students Grades 7-12

November 6, 2010

You have 90 minutes – no calculators allowed

• An arithmetic sequence with common difference d _{and first term} a _is:

!,!+!,!+₂!,!+3!,_…

• The perfect squares are 1, 4, 9, 16, 25, 36, 49, 64, 81, 100, 121, …

1. There are five “lines” of three circles each

in the diagram. Insert the numbers 1, 2, 3, 4, 5, 6, 7, one in each circle, so

that the sum of the three numbers in each line is the same. Which

number must be in the top most circle?

2. Five of the ten discs are dark and five are light;

and they alternate as shown in the pattern. If you are only allowed to interchange the positions of the two neighboring discs in a single move, what is the least number of moves required to get all the dark discs together at the right hand side?

3. ABCD is a square with side length 8.

E and F are midpoints of sides. ED and FC are radii of quarter circles centered at D and

C respectively. EF is the diameter of the upper semicircle. What is the area of the

shaded, ice cream cone, area?

4. The four numbers !₋3_,!₋₁,!+₁,!+3 _{are in arithmetic progression with common difference} ! _{=2. Show that their product plus 16 is a perfect square. Specifically, find} A _{(in terms of} a_{) so}

5. An isosceles trapezoid has sides 15, 28, 15, and 52 as shown. Find the

length of a diagonal.

6. A sequence of numbers is generated by the following initial condition and recursion:

      !

! = 3 !!!_! =

!!

!!!_!

(a) Find !

! (b) Find !_!"#

7. Consider the arrangement (to the right) of the integers greater than 1.

(a) In which column will 100 fall? (b) In which column will 1000 fall?

(c) In which column will 2011 fall?

8. Determine the 2010th term of the following sequence: 1, 2, 3, 6, 7, 14, 15, 30, 31, 62, 63, …

where a term in an even numbered spot is twice the previous term, and a term in an odd numbered spot is one more than the previous term.

9. Five positive integers a_, b_, c_, d_{, and} e _{are written on the blackboard. When you add them four at}

time the sums are 89, 99, 106, 110 and 112. What is the value of the smallest of the integers a_, b_, c_, d_, e_?

10.Let !(!_{) be the number of ways of selecting three distinct integers from 1},₂,3,_…,! _{so that they} are the lengths of the sides of a triangle. For example, ! 5 ₌ 3_{; the only possibilities are}

2-3-4, 2-4-5, and 3-4-5. Find ! 7 _and ! 8 _.

A B C D E

2 3 4 5

9 8 7 6

10 11 12 13 17 16 15 14

Brief Solutions – First Round November 8, 2010

1. 4; Since the top number is used three times and the other six are used twice, the top number must be 4, the

middle number of the entries 1, 2, 3, 4, 5, 6, 7.

2. 15; Interchanging one at a time starting at the right requires 1+₂+3+₄+5₌15  _swaps.

3. 32; From the picture the shaded area is 2!+₂!

or half the area of the 8x8 square.

University of Northern Colorado

MATHEMATICS CONTEST FINAL ROUND January 29, 2011 For Colorado Students Grades 7-12

• !_{!, read as n factorial, is computed as} !_{!= 1∙2∙}3_{∙4∙∙∙}!

• The factorials are 1, 2, 6, 24, 120, 720, …

• The square integers are 1, 4, 9, 16, 25, 36, 49, 64, 81, …

1. The largest integer n _{so that} 3!

evenly divides 9_{!= 1∙2∙}3_∙4∙5_∙6_∙7_∙8_∙9 _is ! _{=4. Determine}

the largest integer n _{so that} 3! _{evenly divides} 85_{!= 1∙2∙}3_∙4⋯84_∙85_.

2. Let m _and n _{be positive integers. List all the integers in the set}

20 ,₂₁,₂₂,23,₂₄,25,26,27,28,29,30,31 _{that cannot be written in the form} !+!+!"_.

As an example, 20 can be so expressed since 20_{= 2}+6+_2∙6_.

3. The two congruent rectangles shown have

dimensions 5 in. by 25 in. What is the area

of the shaded overlap region?

4. Let ! = 2,5,10,17,_⋯,!! +₁,_⋯ be the set of all positive squares plus 1 and

!= 101,104,109,116,_⋯,!!+100,_⋯ be the set of all positive squares plus 100.

(a) What is the smallest number in both A _and B_?

(b) Find all numbers that are in both A _and B_.

5. Determine the area of the square ABCD,

with the given lengths along a zigzag

line connecting B and D.

6. What is the remainder when 1!+_2!+3_!+_⋯+2011_{! is divided by 18?}

7. What is the sum of the first 999 terms of the sequence 1, 2, 3, 6, 7, 14, 15, 30, 31, 62, 63, ⋯ that appeared

on the First Round? Recall that a term in an even numbered position is twice the previous term, while a

term in an odd numbered position is one more that the previous term.

8. The integer 45 can be expressed as a sum of two squares as 45₌3!+6!_.

(a) Express 74 as the sum of two squares.

(b) Express the product 45_∙74 _{as the sum of two squares.}

(c) Prove that the product of two sums of two squares, !!+!! !!+!! _{, can be represented}

as the sum of two squares.

9. Let _!(!_{) be the number of ways of selecting three distinct numbers from 1},₂,3_,⋯,! _{so that they are}

the lengths of the sides of a triangle. As an example, ! 5 ₌3_{; the only possibilities are 2-3-4, 2-4-5,}

and 3-4-5.

(a) Determine a recursion for _!(!_).

(b) Determine a closed formula for _!(!_).

10.The integers 1,₂,3_,⋯,50 _{are written on the blackboard. Select any two, call them} m _and n _{and replace}

these two with the one number !+!+!"_{. Continue doing this until only one number remains and}

explain, with proof, what happens. Also explain with proof what happens in general as you replace 50

with n_{. As an example, if you select 3 and 17 you replace them with} 3+17+51₌ 71_{. If you select 5}

and 7, replace them with 47. You now have two 47’s in this case but that’s OK.

11.Tie breaker – Generalize problem #2, and prove your statement.

Brief Solutions Final Round January 29, 2011

1. n=41; Look at 1∙2∙3_∙4∙5_∙6_⋯81_∙82_∙83_∙84_∙85 _{closely. Every 3}rd _{one is divisible by 3 (there are 28 of}

these); every 9th one has an extra 3 (there are 9 of these) and every 27th one has another extra 3 (there are 3 of

these, namely 27, 54, and 81); and then add 1 for 81.

2. 22, 28 and 30; One way is to test them starting with ₂+6+₁₂₌20_{.  Alternatively, notice that}

!+!+!"₌ !+₁ !+_{1 −1. Call this number Q. Then !}+_{1 is not a prime since each of} !+₁,!+₁

are greater than 2. So those that do not work are one less than a prime. The only primes in the given set are 23, 29

and 31.

3. 65; !!₌25+ 25₋! !₌650₋50!+!!; 

650₌50!;!₌13_{. Area=}5_x13=65

4. (a) 101

(b) 101, 325, 2501; !!+₁₌!!+100 _implies !₋! !+! ₌3_∙3_{∙11. Match up factors:}

!₋!₌₁ !"# !+!₌99 _gives !₌50, !₌49 and !!+₁₌2501_; !₋!₌3, !+!₌33 

gives !₌18,!₌15 and !!+₁₌325_; !₋!₌9, !+!_=11 gives ! ₌10, !₌₁ and !!+₁₌101_.

5. 160; ! ! =

!"

!_!! gives 

!₌3_{. Then} !

!!=45,!!! =125, 

d1+d2=8 5. If y is the side length, !!+!!= 8 5

!  

and !!=160_{, the area.}    

 

 

       

Alternate solution to #5. Extend drawing as shown.  

Then compute the diagonal of the square to be 8 5 _. 

 

6. 9; 6_!+7_!+_⋯+2011_{! is divisible by 18. The remainder when 1!}+_2!+3_!+_4!+5_!=153 _{is divided}

by 18 is 9.

7. ₂!"#

−1504_{; Split the sequence into two sequences: 1}+3+7+15+_⋯+ ₂!""_{−1 and}

2+6+₁₄+30+_⋯+ ₂!""_{−2 .}Then  ₂!₋₁ + ₂!₋₁ +_⋯+ ₂!""_{−1 =2}!"#₋502 _and

2!−2 + ₂!₋₂ +_⋯+ ₂!""_{−2 =2}!"#₋1002_{. Now add to get}

2!"#−502+₂!"#₋1002_=2∙2!"#₋1504₌₂!"#

8. (a) 74₌5!+7!

(b) 45_∙74₌ 3!+6! 5!+7! ₌ 3_∙5+6_∙7 !+ 6_∙5₋3_∙7 !₌57!+9!_{. Another correct answer;}

51!+27!_.

(c) !!+!! !!+!! ₌ !"+!" !+ !"₋!" !

9. (a) First collect data, carefully, and make a table:

n 3 4 5 6 7 8 9 10 11

The use of generating functions will also show this.