Bob has 440 chickens on his farm. 79 are roosters and the rest are hens. 16 of his hens do not lay eggs. if each hen lays 11 eggs every day, how many eggs can uncle John get on one day?
Bob has a total of 440 - 79 = <<440-79=361>>361 hens.
So, 361 - 16 = <<361-16=345>>345 hens are laying eggs.
Therefore, Uncle John can get 345 x 11 = <<345*11=3795>>3795 eggs on one day. Answer: \boxed{3795}.
To find the number of hens on Bob's farm, we need to subtract the number of roosters from the total number of chickens:
440 - 79 = 361
Now, to find the number of hens that lay eggs, we subtract the non-egg-laying hens:
361 - 16 = 345
Finally, to calculate the total number of eggs Uncle John can get in one day, we multiply the number of laying hens by the number of eggs laid by each hen:
345 * 11 = 3795
Therefore, Uncle John can get 3795 eggs in one day.
To find out how many eggs Uncle John can get in one day, we need to calculate the number of laying hens on Bob's farm and then multiply it by the number of eggs each hen lays.
First, let's find the number of hens on Bob's farm. We know that he has a total of 440 chickens, with 79 of them being roosters. So, the rest, which are hens, can be calculated as:
Total chickens - Roosters = Hens
440 - 79 = 361 hens
Next, we need to account for the hens that do not lay eggs. It is given that 16 of the hens do not lay eggs. So, the number of laying hens will be:
Total hens - Hens not laying eggs = Laying hens
361 - 16 = 345 laying hens
Now that we have determined the number of laying hens, we can calculate the number of eggs Uncle John can get in one day:
Number of eggs per laying hen * Laying hens = Total number of eggs
11 eggs/hen * 345 hens = 3,795 eggs in one day
Therefore, Uncle John can get 3,795 eggs on one day from Bob's farm.