A list of puns related to "People Power Party"
Qso there's a far-off place that consists of a perfectly triangular lake surrounded by land, with three kingdoms on the three sides of the lake, the first kingdom is rich and powerful, filled with wealthy. prosperous people, the second kingdom is more humble, but has its fair share of wealth and power, too. the third kingdom is struggling and poor, and barely has an army
the kingdoms eventually go to war over control of the lake, as it's a valuable resource to have, the first kingdom sends 100 of their finest knights, clad in the best armor and each with their own personal squire the second kingdom sends 50 of their knights, with fine leather armor and a few dozen squires of their own. the third kingdom sends their one and only knight, an elderly warrior who has long since passed his prime, with his own personal squire
the night before the big battle, the knights in the first kingdom drink and make merry, partying into the late hours of the night the knights in the second kingdom aren't as well off, but have their own supply of grog and also drink late into the night.
in the third camp, the faithful squire gets a rope and slings it over the branch of a tall tree, making a noose, and hangs a pot from it, he fills the pot with stew and has a humble dinner with the old knight.
the next morning the knights in the first two kingdoms are hung over and unable to fight, while the knight in the third kingdom is old and weary, unable to get up. in place of the knights, the squires from all three kingdoms go and fight the battle lasts long into the night, but by the time the dust settled, only one squire was left standing - the squire from the third kingdom.
and it just goes to show you that the squire of the high pot and noose is equal to the sum of the squires of the other two sides.
So once upon a time, there was a planet shaped like a cheerio. A small moon made of milk or tied the planet, going through the center of the donut shaped world. On this planet, lived an interesting species. They acted and lived similarly to us humans? But looked just like large Cheerios (with footings hands and feet like miis) Within this society there were levels of Cheerios: original, honey nut, and finally frosted. The originals were the backbone of the economy, doing the herd labor while the honey nuts ran the businesses and the frosted Cheerios (the top of the top) led the world. Our story today focuses on a single Cheerio. Born into an original Cheerio family, this lad learned the hard way how to work. From a young age, he was forced to get a job in the local milk refinery, where his dad worked. He grew up, and soon had a family of his own. His wife, son, and daughter all worked hard, but were happy. One day walking home from school, the kids found a runaway honey nut Cheerio pup, and decided to keep him. It wasn’t much, but it inspired our little Cheerio friend here. One day, he got fed up with taking orders, and demanded a raise. His entire family has worked in this one factory for three generations, and he wanted to move up in the world, not just for him but also his kids. His old boss however, did not have the power to promote this Cheerio, and he was forced to make a life changing decision: he would go to the refinery company and use every penny in the family savings account (under the bed) to try and get a higher position. After waiting on line for over a week, his appoint was finally here. After bickering and bargaining for hours, the refinery company boss saw a spark in this lad’s eye. He agreed to give this Cheerio a promotion to the honored honey nut glaze in exchange for everything this man owned, including the family’s prized honey nut dog. Was it worth it? Well pretty soon he owned his own milk refinery and was able to breed his own honey nut dogs, so yes, yes it was. Owning and operating the refinery went smoothly. Milk was transported from the moon to the planet using space busses, and the milk itself was funneled down to the refineries using large straws. After the milk was ready to drink, it was shipped off to be sold. He was happy working here, but eventually he realized it wasn’t enough. This Cheerio, once a simple original Cheerio wanted to follow the “American dream” and do the best he could. He wanted to become a frosted Ch
... keep reading on reddit ➡so there’s a far-off place that consists of a perfectly triangular lake surrounded by land, with three kingdoms on the three sides of the lake. the first kingdom is rich and powerful, filled with wealthy, prosperous people. the second kingdom is more humble, but has its fair share of wealth and power, too. the third kingdom is struggling and poor, and barely has an army.
the kingdoms eventually go to war over control of the lake, as it’s a valuable resource to have. the first kingdom sends 100 of their finest knights, clad in the best armor and each with their own personal squire. the second kingdom sends 50 of their knights, with fine leather armor and a few dozen squires of their own. the third kingdom sends their one and only knight, an elderly warrior who has long since passed his prime, with his own personal squire.
the night before the big battle, the knights in the first kingdom drink and make merry, partying into the late hours of the night. the knights in the second kingdom aren’t as well off, but have their own supply of grog and also drink late into the night.
in the third camp, the faithful squire gets a rope and slings it over the branch of a tall tree, making a noose, and hangs a pot from it. he fills the pot with stew and has a humble dinner with the old knight.
the next morning, the knights in the first two kingdoms are hung over and unable to fight, while the knight in the third kingdom is old and weary, unable to get up. in place of the knights, the squires from all three kingdoms go and fight. the battle lasts long into the night, but by the time the dust settled, only one squire was left standing - the squire from the third kingdom.
and it just goes to show you that the squire of the high pot and noose is equal to the sum of the squires of the other two sides
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