The number of dogs and chickens on a farm add up to 12. The number of legs between them is 28. How many dogs and how many chickens are on the farm if there are at least twice as many chickens as dogs?
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The number of dogs and chickens on a farm add up to 12. The number of legs between them is 28. How many dogs and how many chickens are on the farm if there are at least twice as many chickens as dogs?
There is an animal farm where chickens and cows live. All together, there are 85 heads and 212 legs. How many chickens and cows are there on the farm? chickens and COWS
You are breeding chickens and your friend gives you a grey chicken with yellow legs and a plain black rooster with orange legs. You cross these two and get a bunch of chickens, all of them are grey, and half of them have yellow legs while the other half have orange legs. You are curious about the leg allele so you take two of the grey yellow leg offspring and cross them together and you get 1/4 black yellow legs...
you were in a field counting chickens and rabbits and counted 7 heads and 20 legs. How many chickens were there? How many rabbits were there? Explain how you solved this.
How many chickens did she have in the beginnning?Mrs. Anderson had twice as many chickens as ducks. She sold 272 chickens and 16 ducks. She then had half as many chickens as ducks. How many chickens did she have in the beginning?
The 2000 chickens at Ronald's farm have a mean weight of 1000g with a standard deviation of 50g. Find the number of chickens weighing between 900g and 1500g.
Counting and Pigeonhole Principle (a). A set of four different integers is chosen at random between 1 and 200 (inclusive). How many different outcomes are possible? (b). How many different integers between 1 and 200 (inclusive) must be chosen to be sure that at least 3 of them are even? (c). How many different integers between 1 and 200 (inclusive) must be chosen to be sure that at least 2 of them add up to 20? (d). How many different...
Show your work, please 1. Counting and Pigeonhole Principle (a). A set of four different integers is chosen at random between 1 and 200 (inclusive). How many different outcomes are possible? (b). How many different integers between 1 and 200 (inclusive) must be chosen to be sure that at least 3 of them are even? (C). How many different integers between 1 and 200 (inclusive) mu be chosen to be sure that at least 2 of them add up to...
Petra's Flower Shoppe receives an order for a bouquet containing a mix of 20 flowers, but containing at least 18 roses. On hand, she has 27 roses, 28 tulips, 28 snapdragons and 31daisies. In order to find out how many possible bouquets she can make, what should Petra do? Choose the correct answer below. O A. Calculate the number of possible bouquets containing 20 flowers. O B. Calculate the number of possible bouquets containing 18, 19 and 20 roses separately...
Assume that scores on a math competition are normally distributed a mean of 12 points and a standard deviation of 2.5 points. Answer the following questions on these scores How many students scored less than 9 points? Round to the nearest percent. How many students scored at least 17 points? Round to the nearest percent. How many students have a score between 12 and 15 points? Round to the nearest percent. What is the cuttoff score for top 5% students....