Get Started with ixamBee
Start learning 50% faster. Sign in now
E like Orange. I won 9 medals. F likes Pansy. K likes Daisy and Green and has won less than 5 medals. G like Lotus and he won 12 medals. D won 7 medals and likes Tulip and he likes Blue. C likes Jasmine and won 14 medals. B won second highest number of medals. A won 11 medals and likes Pink. 
Neither H nor J like Black. The one who likes Black won 8 medals. (only possibility is F likes Black). 
It is given that, H does not like Lily and The one who likes Lily won 6 medals. E won more than 8 medals. (only possibility is J likes Lily). The one who likes Orchid likes Red. And it is also given that neither H nor I like Orchid. (only possibility is B likes Orchid). H does not like Sunflower and one who likes sunflower likes White. (so, only possibility is I likes Sunflower). 
E has won more than 8 medals and it is also given that he neither likes Iris nor Rose. (so, only possibility is E won 10 medals and likes Marigold). One who has won more number of medals than B likes Yellow.(i.e. C must likes Yellow). Neither H nor J like either Black or Gray. (only possibility is G likes Gray). After filling the remaining data, we get: 
A five digit number 2A78B, is divisible by 55. What is the difference between the maximum and minimum possible value of (A+B)?
Sum of squares of three consecutive numbers is 1730. Find the sum of first and third number.
Find the average of first 24 whole numbers.
How many two-digit even numbers can be formed using the digits 3, 4, 5, 7, and 8, ensuring that no digit is repeated?
How many numbers in the range from 200 to 800 are divisible by 4, 8, and 16?
