Algebra
Puzzles
Calculus
Mathematics History
Geometry
100

Solve for x: 

log⁡3(x)=2

x = 9

100

A curve has the equation y=x^2. If the curve is translated by 2 units to the right, what is the new equation?

y=(x−2)2

100

Find the derivative of f(x) = 5x^3 + 2x

15x^2 + 2

100

Who introduced the concept of a function in mathematics?

Leonhard Euler

100

Find the area of a sector of a circle with radius 6 cm and angle 60

6pi square cm

200

Solve for x and y: 

3x+4y=12 and x−2y=1

x = 4, y = 0

200

Find two consecutive integers such that the sum of their cubes is 189.

4 and 5

200

Integrate ∫4x^3 dx

x^4 + C

200

In what century did Isaac Newton and Gottfried Wilhelm Leibniz develop calculus?

17th Century

200

Find the angle between two lines with slopes m1=2 and m2=−1/2

90

300

Find the roots of the quadratic equation: 

3x2−2x−1=0

x = 1, x = -1/3

300

Soduko:

|_|_|_|4|

|_|_|_|_|

|2|_|_|3|

|4|_|1|2|

|1|2|3|4|

|3|4|2|1|

|2|1|4|3|

|4|3|1|2|

300

Find the turning points of f(x)=x^3−3x^2+2

Turning points at x=0 and x=2

300

Who introduced the polar coordinate system?

Isaac Newton

300

What is the volume of a cone with radius 3 cm and height 4 cm?

(1/3)(pi)(r2)(h)=12pi cubic cm

400

Simplify (x3+2x2−x−2x+2)/(x+2)

x2−1

400

Countdown:

Result to be obtained --> 253

Given Numbers --> 75, 7, 2, 5, 4, 6


75*4 - 6*2 - 5*7 (Possible Answer)

400

Evaluate ∫2(3x^2−2x) dx

4

400

Who was the first woman to receive a PhD in mathematics?

Sofia Kovalevskaya

400

Find the equation of the circle with center (1,2) and radius 5

(x−1)+ (y−2)= 25

500

Solve for x in the equation:

2x3−5x2−8x+12=0

x=2, x=3, x=−3/2

500

 A 3 digit number is such that its tens digit is equal to the product of the other two digits which are prime. Also, the difference between its reverse and itself is 99. What is the sum of the three digits?

 11

500

Solve the differential equation dy/dx=2x with y(1)=3

y = x^2 + 2

500

Which mathematical conjecture, proposed in the 1950s, established a deep connection between elliptic curves and modular forms, and played a crucial role in Andrew Wiles' proof of Fermat’s Last Theorem?

The "Taniyama-Shimura" conjecture (also known as the Modularity Theorem)

500

Given a triangle with vertices A(1,2), B(4,6), C(6,1), find the equation of the perpendicular bisector of side AB

y−4=(−3/2)(x−2.5)