You meet an alien called Charlie. He asks you “Are the wizard and I the same kind?"
Who is the wizard?
a) Mr Smith has seven children. He wants to send three of them to run some errands on a Saturday. We will send the first one at 1pm, second one at 2pm and the third one at 4 pm. In how many ways can he choose them?
b) The children decided to actually go run all the errands together at 1pm, instead of going separately. Knowing this, in how many ways can Mr Smith select three of them to run the errands?
Katie is making a bouquet. She has \(12\) different flowers available, but wants her bouquet to be composed of exactly \(5\) of them. The order of the flowers in the bouquet doesn’t matter. In how many ways can she do this?
We have \(6\) digits available: \(1,3,4,5,7\) and \(9\). How many \(3\)-digit numbers that use each of these digits only once are there? What if we want the digits within the number to be arranged in an ascending order - how many numbers are left?
David has \(15\) video games in boxes on his shelf. His family is visiting his aunt next week. He was asked to pick only \(4\) games to be able to play on his cousin’s computer. In how many ways can he do this?
Katie is making a bouquet again. She has \(12\) flowers, but this time she wants to use not \(5\), but \(7\) flowers for a bouquet. In how many ways can she do this? How is this answer related to the answer to the previous question about Katie? Why?
Rithika is choosing songs for the party tonight. She has \(214\) songs in her library and wants to use \(50\) for the party. She wants to play each song only once. In how many ways can she compose her playlist? What if the songs have to play in order from the longest chosen to the shortest and each song in her library has a different duration, in how many ways can she choose her playlist then? (You can leave the answer as a formula).
What is the smallest possible number of locks that need to be used to lock the vault so that each group of \(6\) members of the \(11\)-person vault committee can open it together with the keys they have, but no group of just \(5\) members can ever do it?
Tommy has written 6 letters and addressed 6 envelopes. He then forgot which letter goes where and put them randomly such that no letter goes in the right envelope. In how many ways can he do this?
Annie and Hanna are preparing some Christmas baubles. They want to paint each bauble all in one colour. They have \(7\) different colours of paint and \(26\) baubles to paint. In how many ways can they do this? Two ways are considered the same if the numbers of baubles of each colour are the same. Each bauble has to be painted but not all the colours need to be used.