What is the hardest math problem calculus?

1. Navier-Stokes Existence and Smoothness Equation.

Can P vs NP be solved?

Informally, they are the “hardest” of the NP problems. Thus if any one NP-Complete problem can be solved in polynomial time, then every NP-Complete problem can be solved in polynomial time, and every problem in NP can be solved in polynomial time (i.e. P=NP).

What happens if P NP?

If P equals NP, every NP problem would contain a hidden shortcut, allowing computers to quickly find perfect solutions to them. But if P does not equal NP, then no such shortcuts exist, and computers’ problem-solving powers will remain fundamentally and permanently limited.

What is the hardest math in the world?

5 of the world’s toughest unsolved maths problems

1. Separatrix Separation. A pendulum in motion can either swing from side to side or turn in a continuous circle.
2. Navier–Stokes.
3. Exponents and dimensions.
4. Impossibility theorems.
5. Spin glass.

Are there any problems in math that are still unsolved?

Download Grammarly now. There are many unsolved problems in mathematics that involve calculus, however the mechanics and concepts of calculus itself are well cemented and put on a completely rigorous foundation. There are a great many nonlinear partial differential equations that remain unsolved.

What are the 5 most difficult problems in calculus?

These 5 unsolved problems are among the hardest in the world that fall into the realm of Calculus. 1. Navier-Stokes Existence And Smoothness Equation 2. Riemann Hypothesis 3. Euler Equations (Fluid Dynamics) 4. Vlasov Equations

How to find the derivative of a function for problems 1-12?

For problems 1 – 12 find the derivative of the given function. Determine where, if anywhere, the function f (x) = x3 +9×2−48x+2 f ( x) = x 3 + 9 x 2 − 48 x + 2 is not changing. Solution Determine where, if anywhere, the function y =2z4 −z3−3z2 y = 2 z 4 − z 3 − 3 z 2 is not changing.

Are there any nonlinear partial differential equations that are still unsolved?

There are a great many nonlinear partial differential equations that remain unsolved. These problems are expressed using the mechanics of calculus. A specific example would be the Navier-Stokes existence and smoothness Millennium Prize problem: