These pictures illustrate the triangular numbers. How many dots are in the 6th, 7th, and 8th...

Can someone explain how the receptive field of photoreceptors (dots of light) build to circles of...

Can someone explain how the receptive field of photoreceptors (dots of light) build to circles of light for ganglion cells and edges/lines for the visual cortex. I know the ganglion cells build their visual field by combining visual fields of many photoreceptors and that cortical cells build their visual fields by combining the fields of many ganglion cells but what causes this to happen? What is the process? Drawings/Pictures can be helpful too. Thank you in advance!

To illustrate the law of large numbers, which we mentioned in connection with the frequency interpretation...

To illustrate the law of large numbers, which we mentioned in connection with the frequency interpretation of probability, suppose that among all adults living in a large city w know that there are as many men as women. Using the normal-curve approximation, find the probabilities that in a random sample of adults living in this city the proportion of men will be any where from 0.49 to 0.51 when the number of persons in the sample is a) 100; b)...

How many 9-digit numbers (that is numbers between 100,000,000 and 999,999,999) a) Are even? (type a...

How many 9-digit numbers (that is numbers between 100,000,000 and 999,999,999) a) Are even? (type a whole number) b) Are divisible by 5? (type a whole number) c.) Are divisible by 25? ( type a whole number)

You’ve become an influencer and are obsessed with how many views your pictures get. On average,...

You’ve become an influencer and are obsessed with how many views your pictures get. On average, you get 3022 views per post and always post exactly one picture per day. You’d like to have a month with 100000 or more total views. Find the approximate probability of this occurring in January if we assume view counts from day-to-day are independent.

From the numbers between 1 to 30, find out how many of them are divisible by...

From the numbers between 1 to 30, find out how many of them are divisible by 2 and 4. When a number is divisible by 3, print "Three". When a number is divisible by 5, print "Five". When a number is divisible by both, print "ThreeFive". Otherwise, just print the number

You are obsessed with how many views your pictures get. On average, you get 3022 views...

You are obsessed with how many views your pictures get. On average, you get 3022 views per post and always post exactly one picture per day. You’d like to have a month with 100000 or more total views. Find the approximate probability of this occurring in January if we assume view counts from day-to-day are independent.

Use C++ Write a program that first reads in how many whole numbers the user wants...

Use C++ Write a program that first reads in how many whole numbers the user wants to sum, then reads in that many whole numbers, and finally outputs the sum of all the numbers greater than zero, the sum of all the numbers less than zero (which will be a negative number or zero), and the sum of all the numbers, whether positive, negative, or zero. The user enters the numbers just once each and the user can enter them...

can you explain how do I calculate or use significant numbers? ex like how many in...

can you explain how do I calculate or use significant numbers? ex like how many in 100 compare in 1.8970

Here are the basic rules of Club Keno: You choose how many numbers you will pick....

Here are the basic rules of Club Keno: You choose how many numbers you will pick. You can pick anywhere from 1 to 10 different numbers. Pick your numbers between 1 and 80. A drawing is held in which 20 numbers are picked. Depending on how many of your numbers come up in the drawing, you win various amounts of money. In a previous assignment we saw the number of ways to choose exactly x correct from a total of...

Problem 3 Countable and Uncountable Sets (a) Show that there are uncountably infinite many real numbers...

Problem 3 Countable and Uncountable Sets (a) Show that there are uncountably infinite many real numbers in the interval (0, 1). (Hint: Prove this by contradiction. Specifically, (i) assume that there are countably infinite real numbers in (0, 1) and denote them as x1, x2, x3, · · · ; (ii) express each real number x1 between 0 and 1 in decimal expansion; (iii) construct a number y whose digits are either 1 or 2. Can you find a way...