A nine-letter word, common as air, When each letter’s cut, a new word to pare, Take a letter each round and continue to one. Name the word and the path and then you’ll be done.
Surprisingly, there are several nine-letter words that can have one letter removed in each round to make a new word all the way to one letter, which must be ‘a’ or ‘i’. Startling is the most common answer, but I’ve included the other words I’m aware of. I don’t include plural words, like cleansers, drownings, splatters, starvings, trappings and wrappings because it’s kind of cheating.
startling Remove the l to make starting (or remove the t to make starling) Remove the t to make staring Remove the a to make string Remove the r to make sting Remove the t to make sing Remove the g to make sin Remove the s to make in Remove the n to make I
splitting Remove the l to make spitting Remove the p to make sitting Remove a t to make siting Remove the first i to make sting Remove the s to make ting Remove the g to make tin Remove the t to make in Remove the n to make I
stringier Remove the r to make stingier Remove the i to make stinger Remove the t to make singer Remove the r to make singe Remove the g to make sine Remove the e to make sin Remove the s to make in Remove the n to make I
strapping Remove the s to make trapping Remove the t to make rapping Remove the p to make raping Remove the r to make aping Remove the a to make ping Remove the g to make pin Remove the p to make in Remove the n to make I
A couple has two children. At least one of them is a boy. Assuming the probability of having a boy or girl is 50%, what is the probability that both children are boys?
If you answered 1/2, you’re not without comrades, but the generally accepted answer by statisticians (though not without debate) is 1/3. This is because there are four possible combinations: boy-boy, boy-girl, girl-boy and girl-girl. Since we are told one of the children is a boy (but we don’t know if it’s the first or second child), we can rule out the girl-girl combination, leaving three remaining options. Only one out of 3 is boy-boy, so we get a 1/3 chance.
Bill buys three items at the store for exactly $100. The second item costs half as much as the first item, and the third item is half as much as the second.
Maya’s mother asked her to buy some stamps. The available stamps were 3 cents, 9 cents, 11 cents, 17 cents and 21 cents. Her mother asked her to buy eight each of three stamps and nine of each of the remaining two stamps. Unfortunately, Maya forgot which stamps she was supposed to buy eight and nine of. Luckily, her mother had given her $5, the exact amount required to buy the stamps. Which stamps did she buy?
We are four against the masses. We are trying to find the one who is the whole package. We sigh, we laugh, we frown while we hope that the next one will be the one. Who are we?