## 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

- Separatrix Separation. A pendulum in motion can either swing from side to side or turn in a continuous circle.
- Navier–Stokes.
- Exponents and dimensions.
- Impossibility theorems.
- 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:

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