Pow the Egg

A rancher is taking her eggs to the market in a truck, yet she hits a Pothole, which thumps over all the compartments of eggs. At the point when she put the eggs in gatherings of two, three, four, five, and six there was one egg left finished, yet when she put them in gatherings of seven they wound up in complete gatherings without any eggs left finished. Presently she has to know what number of eggs she had and is there more than one chance. The principal thing I did was to peruse the pow maturing all alone. I out when she put her eggs in gatherings of two there is one remaining over.The number can't be a various of two. Likewise three four five and six can’t be a numerous of this number. In the event that there were no eggs left over when placed into gatherings of seven there more likely than not been a different of 7 eggs. Presently need to discover products of seven. 7,14,21,28,35,42,49,56,63,70,77, 84,91,98, 105,112,119,126,133,140,147 ,154,161,168,175,1 82 ,189,196 ,203 ,210, 217, 224, 231 ,238, 245, 252 ,259, 266, 273, 280,287,294,301 Then you cross out all the numbers that are separable by 2,3,4,5, and 6.So I got161 and 301 as the numbers that can't be products 2, 3,4,5,6. | 3 * 4 * 7 = 8449 + 84 = 133. Nothing worth mentioning. 133 isn't acceptable in light of the fact that it's anything but a different of 7133 + 84 = 217. Nothing more than a bad memory. 217 on the grounds that it's anything but a different of 7217 + 84 = 301. Good| | I got 301 on the grounds that you get a rest of 1 for the numbers: 2,3,4,5 and 6. So the most modest number of eggs is 301. Be that as it may, there is other arrangement. Be that as it may, as a rule what you're searching for is the littlest arrangement, so 301 is most likely the appropriate response you want.One day a kid was heading off to the b-ball court he had six arrangements of balls. At the point when he was arriving he stumble on a stone letting all the ball dropping out the net. Presently he needs to esta blish out what number of balls were in the nets. He know when he put the balls in bunches two, three, four, five and six three was one ball left finished, however when she put them in gathering of seven they end up a total gatherings without any eggs left finished. This issue was alright however sort of hard. In the event that I got more assistance on it perhaps I would have an all the more comprehension of the issue