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'Flashing Lights' printed from https://nrich.maths.org/
(Thank you to Norrie McKay and the lights over Tokyo Bay for
this problem)
There were many correct answers sent in
for this problem. As Primary Maths Club (International School of Toulouse) pointed out, it
helps if you start counting seconds from the first time the two
lights flashed together (at zero seconds).
Some people thought about a number line,
others looked for a number that both of the numbers of seconds (4
and 5) would divide into (common multiple). Here are two very well
explained solutions.
Holly,
Harriette, Caroline, Florence and
Rebecca from The Mount School, York:
1st light 0 - 4 - 8 - 12 - 16 - 20 - 24 - ......
2nd light 0 - 5 - 10 - 15 - 20 - 25 - ........
They flash at the same time every 20 seconds 0 - 20 - 40 - 60
That's four times in all.
For two lights the pattern was every 20 seconds and 4 x 5 =
20
For the three lights it is going to be 4 x 5 x 7 = 140 seconds or 2
minutes 20 seconds
Christina from Marlborough Primary
School :
To work this out you need to find a multiple of both 5 and 4 which
is 20. So the lights flash together every 20 seconds and to find
out how many times they flash in one minute you need to do 60/20 =
3 which means that they flash together 3 times a minute.
You need to find a multiple of 20 and seven to work out how many
minutes before all of the lights flash together. 20 x 7 = 140 sec =
2 mins 20 sec
Well done to all of the following people:
Jesse, Edward, Daniel and Thomas from Tattingstone School who did
some very good work with finding the multiples. Lily from
Sotogrande International School, Daniel from Anglo-Chinese School,
Singapore, Abigail, Charles and David from Moorgate Primary School,
Staffordshire, Jason from Priory School, Thomas from St Francis
School, Maldon and Ashley.