History
This person created the theorem we use to find the hypotenuse of a right triangle.
Who is Pythagoras?
25+5
30
5*10
50
limit of (sin(x)-x+x3/6)/(x5) as x approaches 0
Find x if 2x+3=9.
what is 3?
This person created a method to find binomial coefficients.
Who is Pascal?
Bonus question: what was his first name and what is the method called?
326+247
573
30*20
600
d/dx [((x2+1)sin(x)ex)/((lnx)2)]
((x2+1)sin(x)ex)/(ln2(x))*(cos(x)ln(x2+1)+(2xsin(x)/(x2+1))+1-(2/(xln(x))))
find the non-trivial zeros of x2+9x+30.
what is -4.5+/-(sqrt(39)*i)/2
Who are the ancient Babylonians and the ancient Egyptians?
1265+349
1614
27*19
513
integral of x*cos(sqrt(1+x2)) with respect to x
(sqrt(1+x2))*sin(sqrt(1+x2))+cos(sqrt(1+x2)+C
create a function that has a horizontal asymptote at 5, a vertical asymptote at 0, a removable discontinuity at 3, and a y-intercept of 2
impossible.
Bonus question: if you didn't have to make a y-intercept of 2, what would the function be then?
This person created the prime counting function at the ripe age of 15.
Who is Carl Friedrich Gauss?
1978+3423+5496
10897
342*27
9234
Sand is poured on a beach creating a cone whose radius is always equal to twice its height. If the sand is poured
at the rate of 20 in3/sec, how fast is the height of the conical pile changing at the time the height is 2 inches?
5/(4pi)
Bonus question (100): what are the units?
This is the largest integer of the sum of the three consecutive integers that add up to 63.
What is 22?
This number, later named the “taxicab number”, was called by Ramanujan “the smallest number expressible as the sum of two cubes in two different ways,” after he mentioned it while ill in a London hospital.
what is 1729?
ei*pi+1
0
The product, taken over all prime numbers, of one divided by (1 minus p to the negative 2)
pi2/6
integral of e-x^2 from negative infinity to positive infinity with respect to x.
sqrt(pi)
if 2x-3y=6 and 4x+ky=10, find the value of k that makes the system have infinitely many solutions.
What is -6?