Mental arithmetic

Nelek

Elegant way to do it. :thumbsup:

M.D.V. ;) If something has a solution... Why do we have to worry about?. If it has no solution... For what reason do we have to worry about? Help me to understand what I'm saying, and I'll explain it better to you Rating helpful answers is nice, but saying thanks can be even nicer.

Joop Eggen

(12-2)²+(12-1)²+12²+(12+1)²+(12+2)² using (a+b)² = a²+2ab+b² will cancel those 2ab. Hence remains 5*12² + 2*4 + 2*1 = 5*146 = 10*73 = 730. Divided by 365 = 2. So the exercise is indeed for the application of (a+b)²+(a-b)² = 2a²+2b².

Jorgen Andersson

Yeah! This was my solution as well.

Wrong is evil and must be defeated. - Jeff Ello Never stop dreaming - Freddie Kruger

Caslen

1. Each square is approximately 20 more than the previous, so 5x100+20+40+60+80=700, estimating a correction for the approximation and assuming a whole number solution as it's a mental arithmetic problem then the total is 730 and the answer is 2. 2. What everyone else said.

aserrano

1^2 + 2^2 + ... + n^2 = n(n+1)(2n+1)/6 => (14*15*29 - 9*10*19)/6*365 => 30*(7*29 - 3*19)/6*365 => (7*29 - 3*19)/73 => 146/73 => 2 ;-)

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Jorgen Andersson

I even forgot this formula existed. I also wouldn't have done it in my head. :)

Wrong is evil and must be defeated. - Jeff Ello Never stop dreaming - Freddie Kruger

Joop Eggen

Though one mistake, (a+b)² + (a-b)² = 2a² + 2b². Good we are still as intelligent as then (?). Probably the same trick the teacher would demonstrate. It would be interesting if some mathematician historian would check whether such tricks were indeed collected for instruction - of numerical math.

Member 12207222

Use squares of binomials: 10^2 = (12 - 2)^2 = 12^2 - 4*12 + 4 14^2 = (12 + 2)^2 = 12^2 + 4*12 + 4 11^2 = (12 - 1)^2 = 12^2 - 2*12 + 1 13^2 = (12 + 1)^2 = 12^2 + 2*12 + 1 12^2 = 12^2 Add them up, sum = 5*(12^2) + 5*2 = 5 * 146 Denominator = 365 = 5 * 73 Hence ratio = 146/73 = 2 The difference of squares is quicker: (14^2 - 12^2) + (10^2 -12^2) = 26*2 - 22*2 = 4*2 (13^2 - 12^2) + (11^2 -12^2) = 25*1 - 23*1 = 2*1 Hence 10^2 + 11^2 + 12^2 + 13^2 + 14^2 = 5*12^2 + 5*2 = 5 * 146 But this year is a leap year!

Frank Malcolm

Exactly the same thought process, and I also know the squares in my head - up to 16 anyway. Above that there's a bit of mental arithmetic required.

Davyd McColl

I was about to "guess" 2 based on the same premise: first three and a "feeling" about the last two (:

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Menuki

We know that (a+b)²=a²+b²+2ab So: 11² = (10 + 1)² = 10² + 1² + 2x10x1 12² = (10 + 2)² = 10² + 2² + 2x10x2 13² = (10 + 3)² = 10² + 3² + 2x10x3 14² = (10 + 4)² = 10² + 4² + 2x10x4 So: 10² + 11² + 12² + 13² + 14² = 5x10² + (1² + 2² + 3² + 4²) + 2x10x(1 + 2 + 3 + 4) 1 + 2 + 3 + 4 = 10 1² + 2² + 3² + 4² = 1 + 4 + 9 + 16 So: 10² + 11² + 12² + 13² + 14² = 5x100 + 30 + 2x10x10 = 500 + 30 + 200 = 730 730/365 = 2

Stuart Dootson

Noticed that 10^2 + 11^2 + 12^2 = 365. Then 13^2 = 169, 14^2 = 196 - and those two summed are 365. So dividing 2 lots of 365 by 365 gives 2 as the answer. If you don't know your squares, use the identity (n+1)^2 = n^2 + n + (n+1) 10^2 = 100 (that's easy enough to remember!) For the next, add 21 (10+11). Then add 23, then 25, then 27 for the other squares. However - for the first three squares, we're adding 300 to 2*21 and 23 - 2*21=42, add 23 and you have 65, a total of 365. The last two, we have 200 + (23+25+25+27) + 2*21+23. The last bit we know is 65. The middle bit is clearly 100, so the last two squares sum to 365 too.

Java, Basic, who cares - it's all a bunch of tree-hugging hippy cr*p

Menuki

We know that (a - b)² = a² + b² - 2ab So: 10² + 14² = 10² + 14² - 2x10x14 + 2x10x14 = (10-14)² + 2x140 = 4² + 2x140 11² + 13² = 11² + 13² - 2x11x13 + 2x11x13 = (11-13)² + 2x143 = 2² + 2x(140+3) = 2² + 2x140 + 2x3 12² = 144 = 140 + 4 So: 10² + 11² + 12² + 13² + 14² = 4² + 2² + 2x140 + 2x140 + 2x3 + 140 + 4 = 16 + 4 + 5x140 + 6 + 4 = 20 + 700 + 10 = 730 And 730/365 = 2

Martin ISDN

10^2 + 11^2 + 12^2 + 13^2 + 14^2 = 10^2 + (10 + 1)^2 + (10 + 2)^2 + (10 + 3)^2 + (10 + 4)^2 = 5 x 10^2 + some junk... i.e. 500 + junk in that junk there is 2x10x1 + 2x10x2 + 2x10x3 + 2x10x4 = 2x10(1 + 2 + 3 + 4) = 2 x 10^2 = 200 that's 700 + what's left of the junk at this point it became obvious that either the result is 2 or it's best to use a calculator.

Member 4317199 Paddy

use ((12-2)**2 + (12-1)**2 + 12**2 + (12+1)**2 + (12+2)**2) the -2ab from the first two cancel the +2ab from the second two. so 5 * 12**2 + 4 + 1 + 0 + 1 + 4 5 * 144 + 10 divide top and bottom by 5 146/73 (which is essentially what Joop said. But I scrupulously didn't cheat by looking at previous. The hardest part was not picking up a pencil!)

jsc42

Everyone should know the squares - at least for 1 to 20. After that, you just need to know that multiples of ten are (x * 10)^2 = x^2 * 100. You can then do the halfways [numbers ending in 5] (x * 10 + 5)^2 = ((2x + 1) * 10)^2 / 4 [looks a lot more complicated than it is]; thereafter, for numbers ending in 1, 2, 6, 7 you apply (x + 1)^2 = x^2 + 2x + 1 (or x^2 + (x + 1) + x) [do it twice for 2 and 7] and for numbers ending in 3, 4, 8, 9 you apply (x - 1)^2 = x^2 - 2x -=1 or x^2 - (x + 1) - x = x^2 - x - x - 1 [do it twice for 3 and 8] At least, that's what I use! And I assure you, once you've got the hang of them that are simple. Edit: It is also useful to memories powers of two and squares of prime numbers

bjongejan

I did it almost the same way, but decided not to multiply 144 by 5, since I knew I was going to divide by 5, since 365 is dividable by 5. So:

((12-2)²+(12-1)²+12²+(12+1)²+(12+2)²)/365 = (144+(2*(2²+1²))/5)/(365/5) = (144+10/5)/73=146/73 = 2

W Balboos GHB

For those I don't know I use a binomial expansion in my head to make it easier. Not as quick as memorization (look up tables are always rather fast - even for computers). So, if given 27 * 82 it would become (30-3)*(80+2) Numbers to juggle mentally: +2400, -6, -240, +60 Corresponding to the outer two terms and the cross terms. If you do it now and then it remains pretty efficient - but if you've not done it for a year or two it take some cobweb sweeping to set one's storage back to efficient levels. 2214

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User 11542641

OK... I failed to do it in my head, but worked it out in text below then checked it in Excel ... and still was wrong so made I the needed corrections (2 errors compounded) to my text So... I'm dumber than a 19th century schoolboy, but it was a fun exercise any way. I used to do all my math in my head before we had pocket calculators (yes I'm an old fart) I need to do more of this kind of thing to get that back. 0 times 10 is 0 plus 100 is 100 1 times 11 is 11 plus 110 is 121 plus 100 is 221 2 times 12 is 24 plus 120 is 144 plus 221 is 365 3 times 13 is 39 plus 130 is 169 plus 365 is 4 carry the 1 and 2 plus 1 for 3 carry the 1 and 3 plus 1 plus 1 is 534 4 times 14 is 56 plus 140 is 196 plus 534 is 0 carry the one and 2 plus 1 for 3 carry the one and 5 plus 1 plus 1 is 7 for 730

Joop Eggen

(I want MathML.)