Ritangle - an A Level Maths Competition 2016

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Ritangle - an A Level Maths Competition 2016 Questions and Answers - 12-12-16 A. The Taster Questions Answer: this sequence cycles. The first eight terms are, r, i, t, a, n, g, l, e, 1 while the ninth is. The tenth goes back to r, and so every nine ritangle terms, the sequence repeats itself. Thus after 99 terms, the next must be r. B. Take the four numbers from the bag below and put them into the circles in some order (no repeats!) How many different equations can you make? What are the solutions? Write down the possible positive integer solutions in descending order. This 1

is the second part of your key. Answer: we can write down four numbers in 24 different orders, but ax + b = cx + d is the same equation as cx + d = ax + b, so we in fact get 12 different equations here with twelve different solutions. Only three of these are positive whole numbers (7, 5 and 3), so the second part of our key is 753. C. A triangle has angles in degrees that are all integers. One is a square, another is a cube and the third is a fourth power. Write down the sizes of the three angles in descending order. This is the third part of your key. Answer: We can see with a spreadsheet that 10 2 + 4 3 + 2 4 = 180 is the only possibility that works. The angles are therefore 100, 64 and 16, and the third part of our key is 1006416. D. Given a positive integer n, we say s(n) is the sum of all the factors of n not including n itself. Thus s(6) = 1 + 2 + 3 = 6, s(7) = 1, s(8) = 1 + 2 + 4 = 7, s(9) = 1 + 3 = 4. It is easy to find even numbers n so that s(n) > n, for example s(12) = 1 + 2 + 3 + 4 + 6 = 16. It s harder to find odd numbers where s(n) > n, but it is possible; for example, s(1575) = 1649 > 1575. 2

There is one odd number smaller than 1575 so that s(n) > n; this number is the third part of your key. Answer: the secret to having a large value for s(n) is for n to have lots of small prime factors. So if we factorise 1575, we get 1575 = 3 2 5 2 7. So we can try values for p and q in 3 p 5 q 7 perhaps. It transpires that 945 = 3 3 5 7, and s(945) = 975. So 945 is the fourth part of your key. 3

E. Replace the question marks truthfully below using the whole numbers from 5 to 29 inclusive (no repeats!). Then write down the three red questionmark numbers in descending order. This is the fifth part of your key. Answer: It s easy to look up that there are 13 Archimedean solids, which deals with 13 and 26. The number 27 is the only odd cube here. The numbers 9 and 14 are the only possible answers for the Fibonacci/Triangle numbers clue. The number 73370 factorises into 2 5 11 23 29. So this gives us 10, 11, 23 and 29, or 5, 22, 23 and 29. The numbers 22 and 28 are the only 4

possibilities left for the top clue. The third clue must use 5 and 25. Thus 5, 22, 23 and 29 is impossible, and we have 10, 11, 23 and 29. The numbers 19 and 17 are now the prime pair, and the only possible answers to the last three clues are 15, 20, 6 and 8, 12, 24, and 16, 18. The three red question marks are 6, 5 and 9, so 965 is the fifth and last part of our key. Thus we have that our key is r7531006416945965 = 187531006416945965, which unlocks the helpful clue on the website. The clue is: 1-6-3-1-5-4+3-1-4-1+3-1-4-3-1+3-1-5-5-1+3-6-2-10+3-6-5+3-7-3-5-7+3-7-3-6-3+3-8-5-7-3-6-4+4-1-4-3-1-4-3-1+5+5-7-3-5-7+6-4-7+6-5-10+6-7-3-6-3+6-8-3-7-3-6-4+7-5-8+8-2-2+8-8-4-7-3-6+8-9+9+10-7 This gives the first 22 answers crossword-style (so yequalstwoxminusfour is 1-6-3-1-5-4). The Main Puzzle Questions with Answers (in bold) The key to solving the puzzle is to realise that the answer to each question needs to be spelt out in text, so the answer 123 would read onehundredandtwentythree. 1. The equation of the perpendicular bisector of the line AB, where A = (2, 5) and B = (6, 3) is what? Answer: the midpoint of AB is (4, 4). The gradient of AB is 1 2, so a line perpendicular to this has gradient 2. So the perpendicular bisector of AB is of the form y = 2x + k, and since (4, 4) is on this line, k is 4. Thus the answer is yequalstwoxminusfour. 2. Take a positive integer x, cube each of its its digits and add the results together to get a positive integer y. Now do the same to y, to get a positive integer z. If x = 1, then z = x. What the next value for x so that z = x? Note: this value is less than 1000. 5

Answer: we can use a spreadsheet here, and programming is not needed. We take a three-digit number (including 0 as a digit), split it into its digits, cube and add them, then do the same again and compare. Finding the first digit of a three digit is easy using the command rounddown, which rounds down to the nearest integer. So if we have the number A1 = 123, rounddown(a1/100, 0) gives us 1 = A2 (the 0 means, to 0 decimal places ). Writing rounddown((a1 100 A2)/10, 0) gives 2 = A3. Then A1 100 A2 10 A3 gives us 3 = A4. We can now check in when the final two columns first match after 1. The answer is at 136, so our answer is onehundredandthirtysix. 3. A right-angled triangle has integer sides length x, y and z where x < y < z. Adding the three side lengths gives 810, while multiplying the three side lengths gives 13284 times this. What s the area of the triangle? Answer: we have xyz = 10760040, x + y + z = 810, and x 2 + y 2 = z 2. Let A be the area we seek, and so 2A = xy. We have z = 810 x y, and x 2 +y 2 = (810 x y) 2, which on multiplying out, cancelling and rearranging gives x + y = 8102 + 4A. We also have 2A(810 (x + y)) = 810 13284. 2 810 Substituting in for x + y gives us a quadratic in A; 6

4A 2 810 2 A + 810 2 13284. Solving this gives A = 149445 (which leads to complex values for x and y) or A = 14580. This happens for x=81 or 360, which means x = 81, y = 360, and z = 369. So our answer is fourteenthousandfivehundredandeighty. An alternative is to draw the graphs of xy(810 x y) = 10760040 and x 2 + y 2 = (810 x y) 2 and see where they cross. Note; it is also possible to use Excel on this problem. 4. The line y = mx + k touches the parabola y = ax 2 + bx + c (where a 0) at the point (p, q). If m = 8a 2 + 4ab + 12ac + b, what is p (in terms of a, b and c)? Answer: The line touches the parabola only if the gradient of the curve and the line are equal. Thus on differentiating, 2ap+b = 8a 2 +b(4a+1)+12ac, and so p = 4a + 2b + 6c, or fouraplustwobplussixc. If we don t want to differentiate, we can ask, where does the line meet the curve? Where mx + k = ax 2 + bx + c, or ax 2 + x(b m) + (c k) = 0. We know that the line touches the curve, so the discriminant must be zero, giving (b m) 2 = 4a(c k). We know q = mp+k, and q = ap 2 +bp+c, so k = ap 2 +bp+c mp. Substituting in, we get (b m) 2 = 4a(c (ap 2 +bp+c mp)), and if we multiply out and factorise, we get (2ap + b m) 2 = 0. Now substituting in for m, we get our result. Note; using a CAS facility (like the one in Geogebra) is a real help here. 5. An arithmetic progression has third term 32j + 19k and tenth term 18j + 12k. What, in terms of j and k, is the sixteenth term? Answer: if a is the first term of the arithmetic sequence, then a + 2d = 32j+19k, and a+9d = 18j+12k, so subtracting these we have 7d = 14j+7k, or d = 2j k. This means that a = 36j + 21k, and so the sixteenth term = a + 15d = 36j + 21k 30j 15k = 6j + 6k, or sixjplussixk. 7

6. How many solutions (to three significant figures) does the equation (in radians) sin(10 9 x) = 0.1 have in the interval 0 x 325? Answer: We have sin(10 9 x) = 0.1 = 10 9 x = 0.1001... + 2nπ OR π 0.1001... + 2nπ. This tells that arcsin 0.1 x = + 2nπ π arcsin 0.1 OR + 2nπ 10 9 10 9 10 9 10. 9 Thus we have two solutions for every 2π, so we have approximately 109 325 10 9 solutions, which is 1.03 10 11. Thus our answer is onehundredandthreebillion. π 7. If x5 y5 = 98304, and y2 x = 6561, then what is x? Multiply this answer 2 64 by a million. Answer: x and y must both be positive. We have x5 = 98304 = y = y2 ( ) 5 x 5 x 5 98304. Thus 98304 = 6561 = x 25/2 2 98304 5/2 = 6561 = x 2 64 64 x 10.5 6561 983042.5 = = x = 24. So our answer is twentyfourmillion. 64 Alternatively we can multiply our two equations to get (xy) 3 = 10077696, and so xy = 216. Now substituting y = 216 into our first equation gives x x = 24. Alternatively we can draw the curves x5 y5 = 98304, and y2 x = 6561 2 64, and see where they cross. 8. We can say cos x + sin x is is one of these, while cos x + sin(πx) is not one of these, but cos 2 x + sin 2 x is one of these, although cos(x 2 ) + sin(x 2 ) is not one of these, however, cos x sin x is one of these... 8

Answer: We could try drawing the graphs of these functions. It is noticeable that the curves that are one of these each repeat in a regular fashion, while the others don t. We say that such graphs represent periodicfunctions. 9. The polynomial ax 3 + bx 2 + cx 68000 gives a remainder of 6000 when divided by x 1, a remainder of 5000 when divided by x 2, and a remainder of 4000 when divided by x 3. What s the remainder when we divide by x 4? Answer: Using the remainder theorem, we find that a + b + c 68000 = 6000, 8a+4b+2c 68000 = 5000, 27a+9b+3c 68000 = 4000. We can solve these (a computer algebra system is a big help here) to find a = 12500, b = 75000, c = 136500. Now we need the value of 12500x 3 75000x 2 +136500x 68000 when x = 4, which is 78000, and so our answer is seventyeightthousand. 10. Make a hat charm? I may, I may not (anagram). When did I die? Answer: this is Omar Khayyam, mathematician. He died in 1131, so our answer is elevenhundredandthirtyone. 11. The Indian mathematician Ramanujan famously pointed out that the number 1729 was special, since 1729 = 1 3 + 12 3 = 9 3 + 10 3. The value 1729 is in fact the smallest that can be written as the sum of two positive cubes in two different ways. What s the smallest number that can be written as the sum of a positive cube and a fourth power in two different ways? The answer is 4097 = 1 3 + 8 4 = 16 3 + 1 4. We can debate as to how different these ways actually are! What s the next smallest such number? Answer: we need computer help here. We can create a spreadsheet, with values of x running horizontally and values of y vertically, and with x 3 + y 4 in the cells; can we find repeats? Or else we could run a program like this in Excel: If we choose n = 25 (choosing n too big means the program cannot cope), 9

it gives us what we need; 9 3 + 10 4 = 22 3 + 3 4 = 10729. So our answer is tenthousandsevenhundredandtwentynine. then b a 12. If a regular pentagon has sides of length a and diagonals of length b, is what? Answer: We have b a = 1 = 1.618..., which googling tells us is a 2 cos 72 famous number called φ. Like the numbers π and e, φ has a long history in 10

mathematics. It is also known as thegoldenratio. 13. What s (6a2 + 9ab + 3b 2 )(6a 2 8ab + 2b 2 ) (a 2 b 2 )(18a 6b) when simplified? Answer: The top factorises to 6(a + b)(a b)(2a + b)(3a b), while the bottom factorises to 6(a + b)(a b)(3a b), so after cancelling we get 2a + b, or twoaplusb. 14. In a triangle ABC, A, P, Q and B are collinear. A is the point (1, 2), P = (4, 0.25) is the foot of the altitude from C to AB, and Q = (5, 1) is the foot of the median from C to AB. The length P C is the same as AB. The point C is in the first quadrant. Find the coordinates of C, multiply them together and then multiply this by 150. Answer: the points A and Q tell us B is at (9, 4). Thus AB is 10 = P C. We can see we have two 3 4 5 triangles in the diagram, in particular P RC. This gives us that C = (10, 7.75), and so our answer is 10 7.75 150 = 11625, or eleventhousandsixhundredandtwentyfive. 15. A triangle has two sides of length 380 and 2 + 95. The angle between them is 60. What s the length of the third side? 11

Answer: we can use the cos rule here. If the missing side is x, then x 2 = (2 + 95) 2 + 380 2(2 + 95) 380 cos(60 ). Using the fact that 380 = 4 95, multiplying out gives us that x = 17. Thus our answer is seventeen. 16. If a = 0.25631, what s the largest coefficient of any power of x (to three significant figures) in the expansion of (x + a) 100? Answer: this is a question where we need computing power, like that offered by Derive. This can expand (x+0.25631) 100 for us instantaneously. If we check along, the highest coefficient of any power of x here is 8.025319435 10 8 (the coefficient of x 8 0). Thus our answer is eighthundredandthreemillion. We can alternatively use Excel here to accomplish much the same thing. We need to find out how to write the binomial coefficients in Excel; once we ve done that, the problem is straightforward. 17. What s number 47 in this sequence? 1. Given a line segment AB, it s possible to construct an equilateral triangle with AB as one of the sides. 2. Given a line segment AB and a point C, its possible to construct a line segment CD so that the lengths of AB and CD are equal. 3.... Answer; 1. and 2. are the first two of Euclid s theorems in his seminal collection of thirteen books, The Elements. Number 47 on his list is Pythagoras Theorem, so our answer is pythagorastheorem. Note: The Pythagorean Theorem, Pythagoras s Theorem and Pythagoras Theorem can all be found on the net. We went for the last of these, discarding the apostrophe. 18. The expression (((3x 3 +7x+1) 2 +(1 x) 5 ) 5 +((3x 2 12) 3 +(9x 3 x) 5 ) 2 ) 2 is a what? Answer: this must be a polynomial in x. Multiplying out shows that 60 is the highest power, so this is a degreesixtypolynomial. 12

19. If A is the point (1 1 + 1 1 +..., 1 + 1 + 1 + 1 +...) and B 4 16 64 4 16 64 is the point (1 1 + 1 1 +..., 1+ 1 + 1 + 1 +...), then 5 represents the what? 2 4 8 2 4 8 Answer: we have here four geometric progressions each with r < 1, and a so they have a sum to infinity, which in each case is. So A is the point ( 1 r 4 5, 4 ) ( ) 2, while B is the point 3 3, 2. So the gradient of AB is 5, and our answer is the gradientofab. 20. Over the interval 0 < x < 2π, what do these three curves all have? 1.y = (x π) 4 (x π) 2, 2.y = 3x ( ) 3x 2 + sin, 2 3.y = cos x. Answer: we are looking for the fact that they all have two points of inflection. A point of inflection happens when the gradient function has a turning point. We can spot a point of inflection since it s where the tangent to the curve moves from one side of the curve to the other. The points of inflexion are marked in below. Thus our answer is twopointsofinflection. 21. As x varies, what s the minimum value of y = 2x 2 12ax 16bx + 18a 2 + 48ab + 2a + 32b 2 3b? Answer; we could differentiate and put the gradient equal to zero. Or we could complete the square: 13

2x 2 12ax 16bx+18a 2 +48ab+2a+32b 2 3b = 2(x (3a+4b)) 2 +2a 3b, so the minimum possible value for y is 2a 3b, or twoaminusthreeb. 22. Did he use his mathematical these to solve an age-old puzzle? Answer: the age-old problem that was Fermat s Last Theorem succumbed in 1997 to Andrew Wiles, the English mathematician then based in Princeton. The story of how Professor Wiles found a way through the proof is extraordinary; a beautiful account appears in Simon Singh s book Fermat s Last Theorem. So our answer here is wiles. The key with question 23 is to realise that it gives you the right ordering for the answers to the questions. The answers to this question give you the numbers 1, 2, 3..., 22 in some order to be determined. 23. a) The numbers a, b and c are positive. Answer: this is an example of what is called an arithmagon. We have ab = 4462409, bc = 2845565, ac = 3139885. Dividing the first equation by the second, and then multiplying by the third, gives a 2 = 4923961 and so a = 2219, which gives b = 2011 and c = 1415. So our answer is 221920111415. 14

b) In the figure above, α = arccos 11 ( 13, β = arccos 1 ), γ = 2 arcsin 1 7 7. What is AB? What is AC? What is AD? The length AD is two digits; what are they? Answer: BC = 2 7 sin γ = 2. Let s say AB = x and AD = y. by 2 the cos rule, we have (from triangle ABD)49 = x 2 + y 2 2xy 11 13, and (from triangle ACD)49 = (x + 2) 2 + y 2 2(x + 2)y 11. Subtracting these 13 two equations and rearranging gives x = 11 y 1. Substituting this into 13 49 = x 2 + y 2 2xy 11 and solving for y gives y = 13, x = 10. Thus 13 AB = 10, AC = 12 and AD = 13, and this splits into 1 and 3, so our answer is 1012131 3. c) what are x 1 < x 2 < x 3 < x 4 if 4 x r = 41, r=1 4 x 2 r = 579, r=1 4 x 3 r = 10241, r=1 4 x 4 r = 201603? r=1 Answer: we can run a program here; 15

Choosing n > 20 (but not too big) gives us the four numbers as 5, 7, 8, 21. So our answer is 57821. d) Both x and y, where 1 < x < y, are less than 20000. The proper factors of x add to y, the proper factors of y add to x. (The proper factors of a number n do not include n itself.) Which pair of such numbers x and y am I thinking of? Answer; such pairs are known as amicable numbers. The smallest example is (220, 284). You should have worked out now that the answers to question 23 are running through the numbers from 1 to 22. The missing numbers are 2, 4, 6, 9, 16, 17 and 18. Now (17296, 18416) is an amicable pair, as the internet will tell you, and this covers the missing questions. So our answer is 1729618416. You could use coding to find amicable pairs; the (Excel) program is below on the left, and the output is on the right. 16

Putting these answers together we get 2219201114151012131 3578211729618416 = 22, 19, 20, 11, 14, 15, 10, 12, 13, 1, 3, 5, 7, 8, 21, 17, 2, 9, 6, 18, 4, 16. This is the order in which we must write our answers to the questions. 17

18

And so the answer is LeonardoPisanoFibonacci (as given in the MacTutor History of Mathematics Archive). 19